BSc https://statacts.knust.edu.gh/ en BSc. Actuarial Science (Regular) https://statacts.knust.edu.gh/undergraduate/bsc/bsc-actuarial-science-regular <span>BSc. Actuarial Science (Regular)</span> <span><span lang="" about="/user/6" typeof="schema:Person" property="schema:name" datatype="">enaidoo</span></span> <span>Fri, 09/11/2020 - 20:13</span> <div> <div>Overview</div> <div><p><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>The BSc. degree programme in Actuarial Science seeks to develop individuals with a balance between mathematical, statistical, financial, and economic theories, and their applications to practical problems. The programme is designed to provide theoretical as well as applicable education in quantitative aspects of Risk Modelling and Management, Finance and Statistics. Graduates will be capable of abstracting mathematical models for real-world problems and applying appropriate computer-based solutions to them. The graduates will also have the mathematical, statistical, and business skills needed to determine the expected costs and risks in any situation where there is financial uncertainty and data for creating a model for those unpredictable and unexpected contingencies (risks).</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>Content of Courses for each Semester</span></span></span></strong></span></span></span></p> <p><span><span><span><strong><span><span><span>Year 1: Semester 1</span></span></span></strong></span></span></span></p> <p><span><span><span><strong><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>MATH 173: Logic and Set Theory (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>Overview of the natural numbers, integers, real numbers, rational and irrational numbers, algebraic and transcendental numbers. Brief discussion of complex numbers; statement of the Fundamental Theorem of Algebra. Ideas of axiomatic systems and proof within mathematics; the need for proof; the role of counter- examples in mathematics. Elementary logic; implication and negation; examples of negation of compound statements. Proof by contradiction. Union, intersection and equality of sets. Indicator (characteristic) functions; their use in establishing set identities. Functions; injections, surjections and bijections. Relations, and equivalence relations. Counting the combinations or permutations of a set. The Inclusion-Exclusion Principle. The natural numbers: mathematical induction and the well-ordering principle. Examples, including the Binomial Theorem. Prime numbers: existence and uniqueness of prime factorisation into primes; highest common factors and least common multiples. Euclid’s proof of the infinity of primes. Euclid’s algorithm. Solution in integers of ax+by = c. Modular arithmetic (congruences). Units modulo n. Chinese Remainder Theorem. Wilson’s Theorem; the Fermat-Euler Theorem. Public key cryptography and the RSA algorithm.</span></span></span></span></span></span></p> <p><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>Least upper bounds; simple examples. Least upper bound axiom. Sequences and series; convergence of bounded monotonic sequences. Irrationality of </span></span></span><em><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>2</span></span></span></em><em><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span> a</span></span></span></em><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span><span><span><img height="16" src="/core/misc/icons/e32700/error.svg" width="16" alt="Image removed." title="This image has been removed. For security reasons, only images from the local domain are allowed." class="filter-image-invalid" /></span></span></span></span></span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>nd e. Decimal expansions. Construction of a transcendental number.</span></span></span></span></span></span></p> <p><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>Definitions of finite, infinite, countable and uncountable sets. A countable union of countable sets is countable. Uncountability of R. Non-existence of a bijection from a set to its power set. Indirect proof of existence of transcendental numbers.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>MATH 175: Vectors and Mechanics (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>Vectors in Euclidean Spaces, especially in dimensions 1,2 and 3. Position Vector. Dot (Scalar) Product, Cross (Vector) Product of Vectors. Composition and Resolution of Vectors. Application of Vectors to Geometry: Vector equations of lines and planes. Vector-valued functions Differentiation of vector-valued functions. Application of vectors to Mechanics: Kinematics, Statics and Dynamics in euclidean space.</span></span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>MATH 177: Computing for Mathematics I (2, 1, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>General overview of the principles of Computing; Data &amp; Programs or Algorithms. The role of Algorithms, the origins of computing machines and its social repercussions.  Data storage (bits and their storage). Main memory and mass storage. Representation of information as bit patterns.  The binary system- (storing of integers and fractions).  Data manipulation, Computer architecture, machine language and program execution. Operating Systems: The history of Operating Systems, its architecture, coordinating the Machine’s Activities and Handling competition among processes. Algorithms -The concept of an algorithm (representation, discovery, iterative and recursive structures). The efficiency and correctness of algorithms.  Introduction to Data Abstractions:  Basic data structures, related concepts and implementation of some Data structures. Computer Graphics Overview and modeling, spreadsheets.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>ECON 151: Elements of Economics (2, 0, 2)</span></span></span></strong></span></span></span></p> <p><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>Concept of Utility. Demand and Supply, Elasticity of Demand and Supply, Equilibrium Market Prices. Pricing Strategies Used by Firms. Short-term and Long-term Investment and Production. Operation of Competitive Markets. Profitability in Markets with Imperfect Competition.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>ACTS 161: Fundamentals of Accounting (2, 0, 2)</span></span></span></strong></span></span></span></p> <p><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>This course covers basic Financial Accounting Principles for a Business Enterprise. Topics will include the Accounting Cycle. Merchandising Accounts, Asset Valuation, Income Measurement, Partnership Accounting and Corporation Accounting. Development of managerial decision- making skills is stressed through the coverage of the following topics: Cost behaviour, job-order and activity-based production costing, Cost-Volume-Profit analysis, profit planning and budgeting, standard costs and variance analysis, segment reporting and transfer pricing, relevant costs, capital budgeting.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>ENGL 157: Communication Skills I (2, 0, 2)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Oral and written Communication skills ability to express ideas in good English.  Correction of common deficiencies in English grammar.  Comprehension and critical reading skills.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>Year 1: Semester 2</span></span></span></strong></span></span></span></p> <p><span><span><span><strong><span><span><span>MATH 172: Calculus II (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Integration: Indefinite Integral and Definite Integral.  Application of Integration to Areas and Volumes.  Integration by Substitution, Integration by Parts, Integration by Resolution to Partial Fractions.  Approximate Integration. Co-ordinate Geometry: Equations of Lines and Circles, Conic Sections, Parabola, Ellipse and Hyperbola. Parametric Representation of Curves.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>MATH 174: Discrete Mathematics I (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Multinomial coefficients.  Complex Numbers. Demoivre’s Theorem. Finite Difference Equations.  The Z-transform approach to solution. Duality, Consistency. Difference Equations with Characteristics Polynomials, which have complex roots.  Boolean Algebra. Basic Boolean Functions. Digital Logic Gates Minterm and Maxterm Expansions.  Elements of proof Theory.  Relations in a Set. Partial Ordering.  Zorn’s Lemma.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>MATH 176: Linear Algebra I (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Matrices and Determinants.  Systems of Linear Equations.  Vector Spaces and Subspaces, Basis Dimension and Co-ordinates. Algebra of Linear Transformations and Representation by Matrices. Eigenvalues and Eigen-vectors; Similar Matrices, Change of Basis. Cayley-Hamilton Theorem</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>MATH 178: Computing for Mathematics II (2, 1, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Conditional and Logical functions, Counting and Totalling cells conditionally, And, Or, Not, and Lookup functions. Excel lists, Listing terminologies, Sorting data, Subtotals, Filtering a list, Advanced filtering, Criteria tips, Multiple criteria, Calculated criteria, Data consolidation, Pivottables, Modifying a pivottables, Managing pivottables, Formating a pivottable, Banding, and Slicers. Introduction to charting, Creating charts, Formating charts, Changing the chart layout, and Sparklines. Introduction to templates, and Create custom templates. Inserting, Formating, and Deleting Objects. Reviewing, Auditing, and Proofing tools.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>STAT 166: Probability and Statistics I (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>General Introduction, including the Uses and Applications of Statistics, Types of Data and their Collection Methods, Stages of Statistical Investigation; Descriptive Analysis of Data including Exploratory Data Analysis; Introductory Study of Probability Theory: Sets and sample space, Random Experiments and Outcomes, Measure of Probability of Events, Mutually exclusive and Independent Events, Conditional Probability and Bayes‘ theorem, Some Basic Rules/Theorems of Probability; Counting Techniques and Application to Problems; Random Variables and Probability Distributions; Moments</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>ECON 152: Elements of Economics II (2, 0, 2)</span></span></span></strong></span></span></span></p> <p><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>A survey of national income-its measurement and determinants, fluctuations in economic activity and trends in Ghana’s national income, index number, international trade and national economy, the role of Government. Structure of Public Finances. Fiscal and Monetary Policies. Effects of Macroeconomic Policies.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>ENGL 158: Communication Skills II (2, 0, 2)</span></span></span></strong></span></span></span></p> <p><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>Communication Skills Oral presentation, formal speech making, conducting Interviews and meetings. Communication process, skill in communication, channels in communication in an organisation, preparation of official documents such as letters memos, reports minutes and proposals.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>Year 2: Semester 1</span></span></span></strong></span></span></span></p> <p><span><span><span><strong><span><span><span>MATH 265: Mathematical Methods I (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Partial Differentiation of Function of Several Variables. Differentiation of Implicit Functions, Theorem and Applications. Jacobians. Differentiation of a Vector Function of Several Variables. Total Differential, Tangent Plane to Surface. The Tangent Vector. Curvilinear Co-ordinates. Plane Polar, Cylindrical and Spherical Co-ordinates. Multiple Integrals. Line Integrals, Multiple Surface and Volume Integral. Gradient, Divergence and Curl. The Theorems of Green, Gauss, and Stokes.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>MATH 275: Linear Algebra II (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Characteristics Polynomials. Linear Functionals, Dual Spaces, Multilinear Forms. Determinant by Multilinear Form, Uniqueness Properties. Inner Product Spaces. Orthogonalization Process. Best Approximation. Adjoints, and Hermitian Unitary and Normal Transformations. Hermitian, Bilinear and Quadratic Forms, Reduction to a Canonical Form.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>MATH 277: Real Analysis I (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>Sequences and series in R and C. Sums, products and quotients. Absolute convergence; absolute convergence implies convergence. The Bolzano-Weierstrass theorem and applications (the General Principle of Convergence). Comparison and ratio tests, alternating series test. Continuity of real- and complex-valued functions defined on subsets of R and C. The intermediate value theorem. A continuous function on a closed bounded interval is bounded and attains its bounds.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><span><span><span>Differentiability of functions from R to R. Derivative of sums and products. The chain rule. Derivative of the inverse function. Rolle’s theorem; the mean value theorem. One-dimensional version of the inverse function theorem. Taylor’s theorem from R to R; Lagrange’s form of the remainder. Complex differentiation. Complex power series and radius of convergence. Exponential, trigonometric and hyperbolic functions, and relations between them. *Direct proof of the differentiability of a power series within its circle of convergence*. Definition and basic properties of the Riemann integral. A non-integrable function. Integrability of monotonic functions. Integrability of piecewise-continuous functions. The fundamental theorem of calculus. Differentiation of indefinite integrals. Integration by parts. The integral form of the remainder in Taylor’s theorem. Improper integrals.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>MATH 279: Mathematical Programming (2, 1, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Quick review of Computer Organization; Arithmetic of the Computer: Floating - Point Format, Representation and Operations in the Computer; Algorithmic Design and Development; Introduction to Computer Programming Techniques: Coding in a High Level Language using MATLAB and if possible one symbolic mathematical application like MATHEMATICA, MAPLE, DERIVE or any other package designed for scientific computing.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>ACTS 261: Mathematics of Finance I (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>This course will provide students with the mathematical ability to calculate the present and future values of investment projects, annuities and be able to compute outstanding principal as well as interest using loan schedules. Students will also be equipped with the tools used in the valuation of financial instruments, determination of the viability of alternative investments projects as well and intuitive structure of interest rate modelling. Topics to be covered include Rates of interest and discount, Present values, equations of values and yields, Annuities, Loan schedules, Project appraisal, The yield on a fund, Fixed interest securities, Index-linked securities, Forward contracts.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>STAT 265: Probability and Statistics II (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Review of Probability Spaces and Measure, Properties and Concept of Random Variables and Probability Distributions; Some useful Discrete and Continuous Probability Distribution Functions, Moment-generating Functions, Probability generating function , Characteristics Functions  and Limit Theorems; Joint Probability Distributions; Random Walks and Poisson Processes; Basic Concepts of Statistical Inference, Introduction to Sampling Techniques and Sampling Distributions of Sample Means, Proportions and Variances.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>ENGL 263: Literature in English I (1, 0, 1)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Literature as Poetry: What is a poem, and its characteristics? Difference between a poem and song. The figure of speech and the literary device. Practical Appreciation. Texts to be studied: selected African and English poems. Literature as Drama:  What is a play, and its characteristics: Drama and theatre. Shakespeare. The Modern Play. Texts to be studied: One Shakespeare play and one modern African Play</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>Year 2: Semester 2</span></span></span></strong></span></span></span></p> <p><span><span><span><strong><span><span><span>MATH 266: Mathematical Methods II (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Improper integrals. Integrals depending on a parameter. Differentiation and Integration under the integral sign. Gamma and Beta Functions; Stirling’s Formula. Basic Properties and use of the Laplace Transform. Fourier Series. Fourier Transforms.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>MATH 276: Numerical Analysis I (2, 1, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>Round-off Errors and Computer Arithmetic, Algorithms and Convergence. The Bisection Method, Fixed-Point Iteration, Newton’s Method and Its Extensions, Error Analysis for Iterative Methods, Accelerating Convergence, Zeros of Polynomials and Müller’s Method. Linear Systems equations by Direct Methods, Pivoting Strategies, Matrix Inversion and Determinant of a Matrix, Matrix Factorization, Special Types of Matrices (symmetric, positive definite, diagonal matrices, diagonally dominant), Iterative methods (Jacobi, Gauss-Seidal), Relaxation Techniques for Solving Linear Systems</span></span></span></span></span></span></p> <p><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>Interpolation and the Lagrange Polynomial, Data Approximation and Neville’s Method, Divided Differences, Hermite Interpolation, Cubic Spline Interpolation, Parametric Curves</span></span></span></span></span></span></p> <p><span><span><span><span><span><span>Numerical Differentiation, Richardson’s Extrapolation, Elements of Numerical Integration, Composite Numerical Integration, Romberg Integration, Adaptive Quadrature Methods, Gaussian Quadrature, Multiple Integrals, Improper Integrals</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>MATH 278: Real Analysis II (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>The general principle of uniform convergence. A uniform limit of continuous functions is continuous. Uniform convergence and term-wise integration and differentiation of series of real-valued functions. Local uniform convergence of power series. Continuous functions on closed bounded intervals are uniformly continuous. Review of basic facts on</span></span></span></span></span></span></p> <p><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>Riemann integration (from Analysis I). Informal discussion of integration of complex-valued and Rn-valued functions of one variable; Definition of a normed space. Examples, including the Euclidean norm on R n and the uniform norm on C[a, b]. Lipschitz mappings and Lipschitz equivalence of norms. The Bolzano-Weierstrass theorem in Rn. Definition of derivative as a linear map; elementary properties, the chain rule. Partial derivatives; continuous partial derivatives imply differentiability. Higher-order derivatives; symmetry of mixed partial derivatives (assumed continuous). Taylor’s theorem. The mean value inequality. Path-connectedness for subsets of Rn; a function having zero derivatives on a path-connected open subset is constant. Definition and examples. *Metrics used in Geometry*. Limits, continuity, balls, neighbourhoods, open and closed sets. The contraction mapping theorem. Applications including the inverse function theorem (proof of continuity of inverse function, statement of differentiability). Picard’s solution of differential equations.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>MATH 286: Differential Equations I (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Introduction: Methods of deriving Differential Equations. Ordinary Differential Equations of first order.  Separable, Homogeneous, Linear, Exact, Integrating factors and methods of isoclines.  Linear differential equations of the second order with constant coefficients. Systems of first order equations. Solution of ordinary equations of first order using methods of variation of parameters.  Reduction of nth order equation to a system of first order equations</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>ACTS 262: Mathematics of Finance II (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Stochastic interest rate models, Pricing of bonds, shares and property. Duration analysis and immunization. Interest rate derivative securities and their application in asset-liability management. Term Structure: Yield to maturity, Spot rate, Forward rate, Par yield, Factors affecting Term structure. Stochastic approaches to risk management</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>ENGL 264: Literature in English II (1, 0, 1)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Literature as Poetry: What is a poem, and its characteristics? Difference between a poem and song. The figure of speech and the literary device. Practical Appreciation. Texts to be studied: selected African and English poems. Literature as Drama:  What is a play, and its characteristics: Drama and theatre. Shakespeare. The Modern Play. Texts to be studied: One Shakespeare play and one modern African Play</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>Year 3: Semester 1</span></span></span></strong></span></span></span></p> <p><span><span><span><strong><span><span><span>MATH 365: Differential Equations II (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Existence and Uniqueness of Solution of Differential Equations. Solution of Linear Differential Equations in Series: Legendre’s Equation and Bessel’s Equation. Special Functions: Legendre Polynomials, Bessel Functions, Hermite and Chebychev Polynomials, Laguerre and Hypergeometric functions. Orthogonality.  Asymptotic Expansions.  The method of Steepest Descent. The method of Stationary Phase. Recurrence Relations.  Watson’s Lemma.  The Error Function.  The Exponential Integral.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>MATH 379: Numerical Analysis II (2, 1, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>Fixed Points for Functions of Several Variables, Newton’s Method, Quasi-Newton Methods, Steepest Descent Techniques, Homotopy and Continuation Methods, The Conjugate Gradient Method</span></span></span></span></span></span></p> <p><span><span><span><span><span><span>Euler’s Method, Higher-Order Taylor Methods, Runge-Kutta Methods, Error Control and the Runge-Kutta-Fehlberg Method, Multistep Methods, Variable Step-Size Multistep Methods, Extrapolation Methods, Higher-Order Equations and Systems of Differential Equations, Stability, Stiff Differential Equations</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>ACTS 361: Stochastic Processes I (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Element of Probability theory: Random Experiment, Sample Space and Events. Definition of Stochastic Process, The Classification of States. The simplest example of Stochastic Process: Random walks with and without reflecting/absorbing barriers. Markov Chains: Definition, The Transition Matrix and the Chapman-Kolmogorov Equations;; The Existence and Uniqueness of a Stationary Distribution; Applications, in particular to Bonus Malus Systems, Simulation of Markov Chains.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>ACTS 363: Life Contingencies I (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Survival models: Lifetime and future lifetime random variables (discrete and continuous), force of mortality,  Life Tables: Select, Ultimate and Select Ultimate. Insurance models (discrete and continuous cases).</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>ACTS 367: Mathematical Corporate Finance I (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Utility Theory, Stochastic Dominance, Measures of Investment Risk, Portfolio Theory, Models of Asset Returns, Asset Liability Modelling, Capital Asset Pricing Model, Equilibrium Models, Efficient Market Hypothesis, Introduction to Valuation Options. Modigliani-Miller Theorems and Practical Deviations</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>STAT 371: Regression Analysis (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Basic Concepts of Regression  and  Correlation Analysis; Correlation Coefficient  and  Scatter Diagram; Estimation of Parameters of Regression Models by the Least Squares Method, Inferential Analyses on Regression Parameters; Concept of Multi-colinearity and the Use of Qualitative Variables in Regression Models; Residual Analysis for Testing Model Assumptions; Correlation Analysis of Response and Predictor Variables; Use of Statistical Computer Packages (eg. R) for Regression and Correlation Analyses, Interpretation of Results from Statistical Packages.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>ACTS 371: Application Development for Actuarial Science (2, 1, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Introduction to the general concept of Graphical User Interface (GUI). Introduction to the concept of Objects, Object Oriented Design (OOD) and Object Oriented Programming (OOP). Unified Modeling Language (UML) Diagrams. Coding of Windows – Based Applications using a language of choice of the instructor. Mini Project. The instructor may use Visual Basic 2005, Visual C#, Visual C++, Java, Python or Delph.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>CSM 351: Programming Using C++ (2, 1, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>Types and declarations. Pointers, Arrays and Structures. Expressions and Statements. Functions. Namespaces and Exceptions. Source Files and Programs. Classes. Operator Overloading. Derived Class.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>Year 3: Semester 2</span></span></span></strong></span></span></span></p> <p><span><span><span><strong><span><span><span>MATH 366: Partial Differential Equations (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>The concept of a Partial Differential Equation (PDE). Equation of the First Order, Cauchy Problem, Methods of Characteristics and Lagrange.  Classification of Second Order Equations. Laplace and Poisson Equations. Boundary Value Problems, the Sturm-Liouville Problem, Separation of Variables, Properties of Harmonic Functions, Fundamental Solution of Potentials and their Properties, Gauss’ mean value theorem, Green’s Function, Uniqueness Theorems. The Wave and Heat Equations, Method of Eigen functions, Expansions.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>ACTS 362: Stochastic Processes II (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Review of Poisson and Exponential Distributions. Counting Process, Poisson Process, Markov Jump Processes: Time Homogeneous Markov Jump Process, Time In – Homogeneous Markov Jump Process. Conditional Expectation: Filtration and Adaptedness, Martingales and Martingales Convergence Theorem. Brownian Motion, Diffusion Processes. Ito’s Lemma Stochastic Differential Equations and the Radon-Nikodym Theorem. Levy Process.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>ACTS 364: Life Contingencies II (3, 0 , 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>With Profits insurance Policies, Net Premiums and Net Premium Reserves of insurance policies, Insurance policies with expenses and bonuses introduced, Gross Premiums and Gross Premium Reserves of insurance policies. Multiple-life random variables and their actuarial functions, Policy values and reserves.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>ACTS 368: Mathematical Corporate Finance II (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Capital Markets, Efficient Capital Markets and Capital Market Structure. Corporate Debt Instruments and Dividend Policy. Mergers and Acquisitions. Introduction to International Corporate Finance.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>ACTS 372: Data Analysis (2, 0, 2)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Introduction to R. Summarizing data. Discrete and Continuous Distributions. One-Sample Confidence Intervals and Hypothesis Tests. Two-Sample Inferences. Checking Assumptions. One-Way Analysis of Variance with Multiple Comparisons. Nonparametric Methods. Analysing Categorical Data. Two- Way Contingency Tables. Simple Linear Regression- Transformations, Diagnostics, Influence. Introduction to Multiple Regression.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>ACTS 374: Demographic Statistics (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Basic fundamental properties of actuarial techniques; International statistical classification of diseases, Injuries and cause of death and birth statistics; Prediction of birth and death rates; Standardization of vital statistics; Measures of fertility and mortality; Define differential mortality; Identify measures of morbidity; Gross and net reproduction rates. Life tables, their importance and interpretation using case study approach. Demographic and health surveys and interrelation of inherent trends; Compare and contrast Age, period and cohort models; Population projection, and discuss their effects upon education and manpower planning; Use of microcomputer to interpret demographic data. Relationship of social security and welfare statistics to those for education, health, employment and housing.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>STAT 368: Time Series Analysis (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Concepts and components of stochastic time series processes including stationarity and autocorrelation. Time series models including random walk, exponential smoothing, autoregressive, and autoregressive conditionally heteroskedastic. Uses of time series models.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>Year 4: Semester 1 </span></span></span></strong></span></span></span></p> <p><span><span><span><strong><span><span><span>ACTS 461: Analysis of Survival Data (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>The mathematics of survival models. Some examples of parametric survival models. Tabular survival models, estimates from complete and incomplete data samples. Parametric survival models, determining optimal parameters. Maximum likelihood estimators, derivation and properties. Product limit estimators, KaplanMeier and Nelson Aalen. Practical aspects. Statistical models for transfers between multiple states (e.g., alive, ill, dead), the multi-state Markov model, relationship between probabilities of transfer and transition intensities, estimation for the parameters in these models. The binomial and Poisson models of mortality.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>ACTS 471: Insurance Law (2, 0, 2)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Definition of insurance; Parties to the contract; Classification of contract of insurance; Nature of the contract of insurance; Insurable interest; Marking of the contract; Offer; Cover note; Acceptance; Principle of good faith; Now-disclosure; Misrepresentation and premium.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>ACTS 475: Loss Models (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Models for loss severity, Insurance claim number models: the Poisson distribution, the Negative Binomial distribution; parametric models, the effect of policy modifications and tail behaviour. Aggregate claims model, Panjer recursion model, (a, b,0), (a,b,1) and mixed Poisson models; compound Poisson models: the compound Poisson distribution, the individual risk model. Classical ruin theory, Lundberg’s inequality, the adjustment coefficient, reinsurance and ruin.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>ACTS 477: Financial Time Series (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Introduction to basic statistical methods, visual descriptors, numerical descriptors, simple and multiple regression, and diagnostic checks. Introduction to data analysis using R. Financial returns and their empirical properties. Linear time series models (AR, MA, ARMA, ARIMA). Conditional heteroscedastic models for volatility and modelling (ARCH, GARCH, EGARCH). High frequency data analysis and market microstructure. Value at Risk (VaR), expected shortfall and extreme value theory. Multivariate time series models (Vector AR, Vector ARMA, Multivariate GARCH). Multivariate analysis of financial returns, including pair trading</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>ACTS 479: Financial Derivatives (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Background on financial derivatives; forwards, futures and simple options, swaps; Valuation of derivatives under the binary tree model; Review of Brownian motion; the geometric Brownian motion asset model; Itô's Lemma; change of measure; the martingale representation theorem; The Black-Scholes model; formulae for simple European options; the Black-Scholes PDE; allowing for dividends/currencies; Simple models of the term structure; the Vasicek model, the Cox-Ingersoll-Ross model; Introduction to multi-period asset models and market data: the log-normal model; the Wilkie model.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>MATH 473: Mathematical Economics I (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Treatment of Microeconomic Theory with a mathematical approach: Theory of Consumer Behaviour, Constrained Optimising Behaviour, The Slutsky Equation, Construction of Utility Number. Theory of the Firm. Constrained Optimising Behaviour. Constant Elasticity of Substitution (CES) production function. Market Equilibrium with Lagged Adjustment and Continuous Adjustment. Multi Market Equilibrium. Pareto Optimality. General Economic Optimization Over Time. Linear Models. Input-Output (I-O) models. Concepts of Linear Programming and Applications.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>STAT 451: Sample Survey Theory (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>Basic Concepts of Sampling; Sampling Techniques: Types of Sampling, Description of Techniques, Mathematical Properties of Estimates and some other Concepts; Ratio and Regression Estimations; Collection of Data: Design of Questionnaire and Data Collection Methods; Errors in Surveys; Students would be required to conduct Surveys on some Socio-economic issues using Sampling Techniques and submit report for assessment.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span><span><span>MAS 261: Principles of Management I (2, 0, 2)</span></span></span></strong></span></span></span></p> <p><span><span><span><span><span><span>It covers nature and scope of management, managerial functions, organizational theories, goals of business organizations – economic and social responsibilities of management, decision making techniques and influence, the nature and types of organization and their implications for organizational administration.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>Year 4: Semester 2</span></span></span></strong></span></span></span></p> <p><span><span><span><strong><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>ACTS 470: Project (0, 4, 4)</span></span></span></strong></span></span></span></p> <p><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span><span><span>Students will choose research topics from various areas in Actuarial Science to write on and submit reports as their project works.</span></span></span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>ACTS 472: Insurance Law II (2, 0, 2)</span></span></span></strong></span></span></span></p> <p><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>Policy: Classification; Form and Contents; Effect of other documents; Parole evidence; Commencement and duration; Cancellation; Alteration; Rectification; Renewal; Lapse and revival; Perils insured against; Exceptions; Conduct of the assured; Assignment of the subject-matter insured; Time loss; Doctrine of Proximate Cause. The Claim: Making a claim; Burden of proof; Settlement of the claim; Payment of the loss. Application of the Proceeds. Assignment of the proceeds reinstatement. Subrogation. Indemnification Allude, Contribution.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>ACTS 476: Credibility Theory (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>Models for future claim amounts for claims that have occurred but are not settled. Estimation of premiums using both claims experience and general information, credibility theory, limited fluctuation, greatest accuracy credibility theory and empirical Bayes method. Bulhman and Bulhman-Straub models. No claims discount (NCD) insurance models. Assessing the effectiveness of NCD schemes. Stable distributions. The use of generalized linear models in life and non-life insurance.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>ACTS 478: Accounting and Finance (2, 0, 2)</span></span></span></strong></span></span></span></p> <p><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>Personal and corporate taxation, taxation of investments, annual reports and accounts of companies. Structure of company and group accounts, financial and accounting ratios. Forms of equity and debt. Weighted-average cost of capital. Capital budgeting. Investment return on a project.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>ACTS 466: Basic Pension Mathematics (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>The theory and practice of pension plan funding. Assumptions, basic actuarial functions and population theory applied to private pensions. Concepts of normal cost, supplemental liability, unfunded liability arising from individual accrued benefit and projected benefit cost methods</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>ACTS 474: Operations Research (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>Mathematical Model building for Management; Linear programming and its application to Transportation and Assignment Problems; Network Analysis; Inventory Control; Queuing Theory Decision Analysis, Game Theory; Non-Linear Optimisation Technique: Methods of Forecasting; Simulation as an Operation Research tool.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>ACTS 482: Advanced Models in Inventory (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>Supply Chain Management including inventory models and management, EOQ models, with constant demand and stochastic demand rates. Quantity discount model and incremental discount model.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>MATH 464: Functional Analysis (4, 0, 4)</span></span></span></strong></span></span></span></p> <p><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>Topological Vector Spaces.  Factor Spaces.  Frechet Spaces.  Banach Spaces. Hilbert Spaces. Bounded Linear Mappings. Decomposition Theorem. Projections. Dual Space. Baire Category, Banach-Steinhans Theorem. Open Mapping Theorem. Riesz Representation Theorem. Bounded Linear Operators. Adjoint Operators. Closed Graph Theorem.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>MATH 474: Mathematical Economics II (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>Mathematical Treatment of Macro-Economic Theory:  Simple model of Income Determination, Consumption and Investment, the Investment Savings(IS) Curve. Monetary Equilibrium, the Liquidity Preference/ Money Profit (LM) Curve. Labour Wages and Price (Inflation) models.  Full employment equilibrium models of Income Determination.  Aggregate demand and Supply analysis.  Balance of Trade (Payments), Model of Income Determination.  Dynamic Models of Income Determination. Stabilisation Policy, Comparative Statistics Analysis of Monetary Fiscal Policy, the Harold Domar Growth model, the Neo-classical growth model.  Interest Theory.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>STAT 452: Design of Experiments (3, 0, 3)</span></span></span></strong></span></span></span></p> <p><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>Basic Concepts: Objective, Definitions and Role of Randomisation and Replication; Experiments involving Paired Data. Fixed Effects, Random Effects and Mixed Effects Models. Analysis of Variance (ANOVA). Special Designs: Completely Randomised design (CRD); Assumptions, Randomisation, Multiple comparisons, Estimations of Parameters, Unequal Sample Size; Randomised Complete Block Design (RCBD), Estimation and Effects of Missing Observation, Relative Efficiency; Latin Square and Pair-Wise Orthogonal Latin Square Design.  Split-plot Design; Analysis of covariance (ANCOVA); Factorial Experiments, Rules of Calculation of Mean Square and Expected Mean Square and Tests of Significance; Confounding; Fractional Replication; Use of Statistical Computer Packages for Data Analysis.</span></span></span></span></span></span></p> <p> </p> <p><span><span><span><strong><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>MAS 262: Principles of Management II (2, 0, 2)</span></span></span></strong></span></span></span></p> <p><span><span><span><span lang="EN-US" xml:lang="EN-US" xml:lang="EN-US"><span><span>Organizational behaviour/human relations – interpersonal and group processes, the application of concepts, like leadership, motivation, communication, morale, to the management of people and organizations, time management, analysis of causes, of change, managing change, innovation, management control.</span></span></span></span></span></span></p> <p> </p> <p> </p> <p> </p> <p> </p> <p> </p> <p> </p> <p> </p></div> </div> <div> <div>Programme Type</div> <div><a href="/taxonomy/term/29" hreflang="en">BSc</a></div> </div> Fri, 11 Sep 2020 20:13:02 +0000 enaidoo 37 at https://statacts.knust.edu.gh BSc. Statistics (Part-Time) https://statacts.knust.edu.gh/undergraduate/bsc/bsc-statistics-part-time <span>BSc. Statistics (Part-Time)</span> <span><span lang="" about="/user/6" typeof="schema:Person" property="schema:name" datatype="">enaidoo</span></span> <span>Fri, 09/11/2020 - 19:58</span> <div> <div>Programme Type</div> <div><a href="/taxonomy/term/29" hreflang="en">BSc</a></div> </div> Fri, 11 Sep 2020 19:58:24 +0000 enaidoo 33 at https://statacts.knust.edu.gh BSc. Statistics (Regular) https://statacts.knust.edu.gh/undergraduate/bsc/bsc-statistics-regular <span>BSc. Statistics (Regular)</span> <span><span lang="" about="/user/6" typeof="schema:Person" property="schema:name" datatype="">enaidoo</span></span> <span>Fri, 09/11/2020 - 13:05</span> <div> <div>Overview</div> <div><p><span><span><span><span><span><span>The programme provides instruction in statistical theory and methods, and their application to the collection, collation, presentation, analysis and dissemination of data. It is designed to provide practical training and to enhance the knowledge and skills of a statistician. In addition, the course seeks to meet the need of those who have developed an interest in the subject from several years of relevant working experience and who are desirous of acquiring further knowledge in the field. More specially, the programme seeks to equip students with the knowledge and skills to perform professional duties as statisticians, and to work more effectively with other specialists on statistical activities and programmes such as censuses, surveys, quality control and other statistically related projects and activities. The programme emphasizes the acquisition of practical and problem solving skills to enable students to relate what they learn to what is done in practice so as to enable them to ply more meaningful roles in solving current developmental problems at local, national and international levels.</span></span></span></span></span></span></p> <p> </p> <p><strong>Content of Courses for each Semester</strong></p> <p><strong>Year 1 Semester 1</strong></p> <p style="text-align:justify"><span style="font-size:12pt"><span style="font-family:&quot;Times New Roman&quot;,serif"><b>MATH 171: Calculus I (3, 0, 3)</b></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Real Numbers; Ordering Real Numbers, Absolute value and distance, Algebraic Expressions Exponents(Indices), Radicals(Surds) Logarithms, and Complex Numbers: Algebra of complex Numbers, Exponents of i. <b>Functions:</b> Definition and Types. Basic Types; Polynomials, Rational, Exponential and Trigonometry. Properties of Functions; Zeros, Even and Odd, Periodicity, Inverse and Fixed Points. Sequence and Finite Series.  The Binomial Theorem: Positive integer exponents, Integer and Rational exponents. <b>Limits of functions</b>. Differentiation of Functions.  Integration of Polynomials, Trigonometric (cosine and sine only) and Exponential. Applications of Derivatives:  Maxima and Minima, Linear approximations and Related rates</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:12pt"><span style="font-family:&quot;Times New Roman&quot;,serif"><b>MATH 173: Logic and Set Theory (3, 0, 3)</b></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Introduction to number systems and logic: </span></span></b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Overview of the natural numbers, integers, real numbers, rational and irrational numbers, algebraic and transcendental numbers. Brief discussion of complex numbers; statement of the Fundamental Theorem of Algebra. Ideas of axiomatic systems and proof within mathematics; the need for proof; the role of counter- examples in mathematics. Elementary logic; implication and negation; examples of negation of compound statements. Proof by contradiction. <b>Sets, relations and functions: </b>Union, intersection and equality of sets. Indicator (characteristic) functions; their use in establishing set identities. Functions; injections, surjections and bijections. Relations, and equivalence relations. Counting the combinations or permutations of a set. The Inclusion-Exclusion Principle. <b>The integers: </b>The natural numbers: mathematical induction and the well-ordering principle. Examples, including the Binomial Theorem. <b>Elementary number theory: </b>Prime numbers: existence and uniqueness of prime factorisation into primes; highest common factors and least common multiples. Euclid’s proof of the infinity of primes. Euclid’s algorithm. Solution in integers of ax+by = c. Modular arithmetic (congruences). Units modulo n. Chinese Remainder Theorem. Wilson’s Theorem; the Fermat-Euler Theorem. Public key cryptography and the RSA algorithm. <b>The real numbers: </b>Least upper bounds; simple examples. Least upper bound axiom. Sequences and series; convergence of bounded monotonic sequences. Irrationality, Decimal expansions. Construction of a transcendental number. <b>Countability and Uncountability: </b>Definitions of finite, infinite, countable and uncountable sets. A countable union of countable sets is countable. Uncountability of R. Non-existence of a bijection from a set to its power set. Indirect proof of existence of transcendental numbers.</span></span></span></span></span></p> <p style="text-align:justify"><b>MATH 175: Vectors and Mechanics (3, 0, 3)</b></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="text-autospace:none"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Vectors in Euclidean Spaces, especially in dimensions 1,2 and 3. Position Vector. Dot (Scalar) Product, Cross (Vector) Product of Vectors. Composition and Resolution of Vectors. Application of Vectors to Geometry: Vector equations of lines and planes. Vector-valued functions Differentiation of vector-valued functions. Application of vectors to Mechanics: Kinematics, Statics and Dynamics in euclidean space.</span></span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:12pt"><span style="font-family:&quot;Times New Roman&quot;,serif"><b>MATH 177: Computing for Mathematics I (2, 1, 3)</b></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">General overview of the principles of Computing; Data &amp; Programs or Algorithms. The role of Algorithms, the origins of computing machines and its social repercussions.  Data storage (bits and their storage). Main memory and mass storage. Representation of information as bit patterns.  The binary system- (storing of integers and fractions).  Data manipulation, Computer architecture, machine language and program execution. Operating Systems: The history of Operating Systems, its architecture, coordinating the Machine’s Activities and Handling competition among processes. Algorithms -The concept of an algorithm (representation, discovery, iterative and recursive structures). The efficiency and correctness of algorithms.  Introduction to Data Abstractions:  Basic data structures, related concepts and implementation of some Data structures. Computer Graphics Overview and modeling, spreadsheets.</span></span></span></span></span></p> <p style="text-align:justify"><b>BIO 181:  Biology for Mathematics (2, 0, 2)</b></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Cell structure, Basic Physiology and Anatomy</span></span></span></span></span></p> <p style="text-align:justify"><b>CHEM 155:  Physical Chemistry (2, 0, 2)</b></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Introduction to Physical chemistry: Definition, Structure of Science, Classifications; The Scientific Method: Laws, Hypotheses, Theories and Models. States of Matter I: Classification; Structure and Properties of matter; Types of systems; State variables and Equations of state. Thermodynamics I: The First Law, Heat Capacity, Enthalpy and Thermo-chemistry. Chemical Kinetics I: Elementary Chemical Kinetics, Basic Laws, Effect of Temperature and the Arrhenius equation.</span></span></span></span></span></p> <p style="text-align:justify"><b>ECONS 151:  Elements of Economics I (2, 0, 2)</b></p> <p style="text-align:justify">The purpose of this course is to introduce students without prior knowledge of Economics to the fundamental concepts and the use of analytical techniques which will be helpful in the study of economic problems. It is also intended to provide students not intending to specialize in the subject with knowledge of principles which can be in related disciplines. The course covers the nature and scope of economics, consumer choice, determination of prices in different market conditions, Production Theory and Theory of Distribution.</p> <p style="text-align:justify"><b>ENGL 157: Communication Skills l (2, 0, 2)</b></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Oral and written Communication skills ability to express ideas in good English.  Correction of common deficiencies in English grammar.  Comprehension and critical reading skills.</span></span></span></span></span></p> <p style="text-align:justify"><b>PHY 153: Electromagnetism (2, 0, 2)</b></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><i><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Electrostatics</span></span></i><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">: Currents and the conservation of charge. Lorentz force law and Maxwell’s equations. Gauss’s law. Application to spherically symmetric and cylindrically symmetric charge distributions. Point, line and surface charges. Electrostatic potentials; general charge distributions, dipoles. Electrostatic energy. Conductors. <i>Magnetostatics</i>: Magnetic fields due to steady currents. Ampere’s law. Simple examples. Vector potentials and the BiotSavart law for general current distributions. Magnetic dipoles. Lorentz force on current distributions and force between current-carrying wires. <i>Electrodynamics:</i> Faraday’s law of induction for fixed and moving circuits. Ohm’s law. Plane electromagnetic waves in vacuum, polarization. Electromagnetic energy and Poynting vector. <i>Electromagnetism and relativity</i>: Review of special relativity; tensors and index notation. Charge conservation. 4-vector potential, gauge transformations. Electromagnetic tensor. Lorentz transformations of electric and magnetic fields.<i> </i>Maxwell’s equations in relativistic form. Lorentz force law.</span></span></span></span></span></p> <p style="text-align:justify"> </p> <p style="text-align:justify"><strong>Year 1 Semester 2</strong></p> <p style="text-align:justify"><b>MATH 172: Calculus II (3, 0, 3)</b></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Integration: Indefinite Integral and Definite Integral.  Application of Integration to Areas and Volumes.  Integration by Substitution, Integration by Parts, Integration by Resolution to Partial Fractions.  Approximate Integration. Co-ordinate Geometry: Equations of Lines and Circles, Conic Sections, Parabola, Ellipse and Hyperbola. Parametric Representation of Curves. </span></span></span></span></span></p> <p style="text-align:justify"><b>MATH 174: Discrete Mathematics (3, 0, 3)</b></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Multinomial coefficients.  Complex Numbers. Demoivre’s Theorem. Finite Difference Equations.  The Z-transform approach to solution. Duality, Consistency. Difference Equations with Characteristics Polynomials, which have complex roots.  Boolean Algebra. Basic Boolean Functions. Digital Logic Gates Minterm and Maxterm Expansions.  Elements of proof Theory.  Relations in a Set. Partial Ordering.  Zorn’s Lemma. </span></span></span></span></span></p> <p style="text-align:justify"><b>MATH 176: Linear Algebra I (3, 0, 3)</b></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Matrices and Determinants.  Systems of Linear Equations.  Vector Spaces and Subspaces, Basis Dimension and Co-ordinates. Algebra of Linear Transformations and Representation by Matrices. Eigenvalues and Eigen-vectors; Similar Matrices, Change of Basis. Cayley-Hamilton Theorem. </span></span></span></span></span></p> <p style="text-align:justify"><b>ENGL 178: Computing for Mathematics II (3, 0, 3)</b></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="text-autospace:none"><span style="font-family:Calibri,sans-serif"><i><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Advanced spreadsheet functions:</span></span></i><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif"> Conditional and Logical functions, Counting and Totalling cells conditionally, And, Or, Not, and Lookup functions. <i>Views, scenarios, goal seek, solver</i>: Goal seeking and solving, Advanced solver features, Scenarios, and Views. <i>Using spreadsheet to manage lists</i>: Excel lists, Listing terminologies, Sorting data, Subtotals, Filtering a list, Advanced filtering, Criteria tips, Multiple criteria, Calculated criteria, Data consolidation, Pivottables, Modifying a pivottables, Managing pivottables, Formating a pivottable, Banding, and Slicers. <i>Charts</i>:<i> </i>Introduction to charting, Creating charts, Formating charts, Changing the chart layout, and Sparklines. <i>Templates</i>: Introduction to templates, and Create custom templates. <i>Drawing and formatting</i>: Inserting, Formating, and Deleting Objects. <i>Excel </i>tools: Reviewing, Auditing, and Proofing tools.</span></span></span></span></span></span></p> <p style="text-align:justify"><b>STAT 166: Probability and Statistics (3, 0, 3)</b></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">General introduction, including the uses and applications of statistics, types of data and their collection methods, stages of statistical investigation; Descriptive analysis of data including exploratory data analysis; Introductory study of probability theory: Sets and sample space, random experiments and outcomes, measure of probability of events, mutually exclusive and independent events, conditional probability and Bayes‘ theorem, Some basic rules/theorems of probability; Counting techniques and application to problems; Random variables and probability distributions; moments</span></span></span></span></span></p> <p style="text-align:justify"><b>ECONS 152: Elements of Economics II (2, 0, 2)</b></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">A survey of national income- its measurement and determinants, fluctuations in economic activity and trends in Ghana’s national income, index number, international trade and national economy, the role of Government.</span></span></span></span></span></p> <p style="text-align:justify"><b>ENGL 158: Communication Skills II (3, 0, 3)</b></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Communication skills oral presentation, formal speech making, conducting Interviews and meetings. Communication process, skill in communication, channels in communication in an organisation, preparation of official documents such as letters memos, reports minutes and proposals.</span></span></span></span></span></p> <p style="text-align:justify"> </p> <p style="text-align:justify"><strong><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Year 2 Semester 1</span></span></span></span></span></strong></p> <p style="text-align:justify"><span style="font-size:12pt"><span style="font-family:&quot;Times New Roman&quot;,serif"><b>MATH 265: Mathematical Methods I (3, 0, 3)</b></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Partial differentiation of function of several variables. Differentiation of implicit functions, theorem and applications. Jacobians. Differentiation of a vector function of several Variables. Total Differential, Tangent Plane to Surface. The tangent vector. Curvilinear Co-ordinates. Plane polar, cylindrical and spherical Co-ordinates. Multiple integrals. Line integrals, multiple surface and volume integral. Gradient, divergence and curl. The Theorems of Green, Gauss, and Stokes. </span></span></span></span></span></p> <p style="text-align:justify"><b>MATH 267: Abstract Algebra I (3, 0, 3)</b></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Groups: </span></span></b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">The Integers mod<span style="position:relative"><span style="top:3.0pt"><img src="file:///C:/Users/DROGON~1/AppData/Local/Temp/msohtmlclip1/01/clip_image002.png" style="width:13px; height:15px" /></span></span>and symmetries. Definitions and Examples. Subgroups. Centre of a Group. <b>Cyclic Groups: </b>Definitions, Cyclic Subgroups. Generators and Relations. The method of Repeated Squares. Cauchy Theorem.<b>Permutation Groups: </b>Definitions and Notations. Dihedral Groups. <b>Cosets and Lagrange’s Theorem: </b>Cosets. Lagrange’s Theorem. Fermat’s and Euler’s Theorem. <b>Isomorphisms: </b>Definitions and Examples. Direct Products. <b>Homomorphisms and Factor Groups:</b>Factor Groups and Normal Subgroups. Group Homomorphisms. The Isomorphism Theorems. <b>Matrix Groups and Symmetry: </b>Matrix Groups. Symmetry. <b>The Structure of Groups: </b>Finite Abelian Groups. Solvable Groups. <b>Group Actions: </b>Groups Acting on Sets. The Class Equation. Burnside’s Counting Theorem. <b>TheSylow’s Theorems: </b>The Sylow Theorems. Examples and Applications. <b>Applications of Groups: </b>Privative Key Cryptography. Public Key Cryptography. Algebraic Coding Theory: Error- Detecting and Correcting Codes, Linear Codes, Parity-Check and Generator Matrices and Efficient Decoding.</span></span></span></span></span></p> <p style="text-align:justify"><b>MATH 275: Linear Algebra II (3, 0, 3)</b></p> <p style="text-align:justify">Annihilating polynomials. Linear functionals, dual spaces, multilinear forms. Determinant by multilinear form, uniqueness properties. Inner product spaces. Orthogonalization process. Best approximation. Adjoints, and Hermitian unitary and normal transformations. Hermitian, bilinear and quadratic forms, reduction to a canonical form.</p> <p style="text-align:justify"><b>MATH 277: Real Analysis I (3, 0, 3)</b></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><i><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Limits and convergence: </span></span></i><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Sequences and series in R and C. Sums, products and quotients. </span></span><span lang="FR" style="font-size:12.0pt" xml:lang="FR"><span style="font-family:&quot;Times New Roman&quot;,serif">Absolute convergence; absolute convergence implies convergence. </span></span><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">The Bolzano-Weierstrass theorem and applications (the General Principle of Convergence). Comparison and ratio tests, alternating series test. <i>Continuity: </i>Continuity of real- and complex-valued functions defined on subsets of R and C. The intermediate value theorem. A continuous function on a closed bounded interval is bounded and attains its bounds. <i>Differentiability: </i>Differentiability of functions from R to R. Derivative of sums and products. The chain rule. Derivative of the inverse function. Rolle’s theorem; the mean value theorem. One-dimensional version of the inverse function theorem. Taylor’s theorem from R to R; Lagrange’s form of the remainder. Complex differentiation. <i>Power series: </i>Complex power series and radius of convergence. Exponential, trigonometric and hyperbolic functions, and relations between them. Direct proof of the differentiability of a power series within its circle of convergence. <i>Integration: </i>Definition and basic properties of the Riemann integral. A non-integrable function. Integrability of monotonic functions. Integrability of piecewise-continuous functions. The fundamental theorem of calculus. Differentiation of indefinite integrals. Integration by parts. The integral form of the remainder in Taylor’s theorem. Improper integrals.</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">MATH 279: Mathematical Programming (2,1,3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Quick review of Computer Organization; Arithmetic of the Computer: Floating - Point Format, Representation and Operations in the Computer; Algorithmic Design and Development; Introduction to Computer Programming Techniques: Coding in a High Level Language using MATLAB and if possible one symbolic mathematical application like MATHEMATICA, MAPLE, DERIVE or any other package designed for scientific computing. </span></span></span></span></span></p> <p style="text-align:justify"><b>STAT 251: Probability Distributions (3, 0, 3)</b></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Review of probability spaces and measure, properties and concept of random variables and probability distributions; Some useful discrete and continuous probability distribution functions, moment-generating functions, probability generating function, characteristics functions  and limit theorems; Joint probability distributions; Random walks and Poisson processes; Basic concepts of statistical inference, introduction to sampling techniques and sampling distributions of sample means, proportions and variances. </span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">ENGL 263 Literature in English I (1, 1, 1)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Literature as Poetry: What is a poem, and its characteristics? Difference between a poem and song. The figure of speech and the literary device. Practical Appreciation. Texts to be studied: selected African and English poems. Literature as Drama:  What is a play, and its characteristics: Drama and theatre. Shakespeare. The Modern Play. Texts to be studied: One Shakespeare play and one modern African Play.</span></span></span></span></span></p> <p style="text-align:justify"> </p> <p style="text-align:justify"><strong><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Year 2 Semester 2</span></span></span></span></span></strong></p> <p style="text-align:justify"><b>MATH 266: Mathematical Methods II (3, 0, 3)</b></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Improper Integrals. Integrals depending on a Parameter. Differentiation and Integration under the Integral Sign. Gamma and Beta Functions; Stirling’s Formula. Basic Properties and use of the Laplace Transform. Fourier Series. Fourier Transforms. </span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">MATH 268: Abstract Algebra II (3, 0, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Rings: </span></span></b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Rings. Integral Domains and Fields. Ring Homomorphisms and Ideals. Maximal and Prime Ideals. <b>Polynomials: </b>Polynomial Rings. The Division Algorithm. Irreducible Polynomials. <b>Integral Domains: </b>Fields of Fractions. Factorization in Integral Domains. <b>Lattices: </b>Lattices. Boolean Algebra. <b>Applications of Ring: </b>An application to software Design. The Algebra of Electric Circuit.</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">MATH 276: Numerical Analysis I (2, 1, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Mathematical Preliminaries and Error Analysis:</span></span></b><i> </i><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Round-off Errors and Computer Arithmetic, Algorithms and Convergence. <b>Solutions of Equations in One Variable</b><i>: </i>The Bisection Method, Fixed-Point Iteration, Newton’s Method and Its Extensions, Error Analysis for Iterative Methods, Accelerating Convergence, Zeros of Polynomials and Müller’s Method. <b>Methods for solving Systems of Equations:</b><i> </i>Linear Systems equations by Direct Methods, Pivoting Strategies, Matrix Inversion and Determinant of a Matrix, Matrix Factorization, Special Types of Matrices(symmetric, positive definite, diagonal matrices, diagonally dominant), Iterative methods (Jacobi, Gauss-Seidal), Relaxation Techniques for Solving Linear Systems. <b>Interpolation and Polynomial Approximation: </b>Interpolation and the Lagrange Polynomial, Data Approximation and Neville’s Method, Divided Differences, Hermite Interpolation, Cubic Spline Interpolation, Parametric Curves. <b>Numerical Differentiation and Integration:</b><i> </i>Numerical Differentiation, Richardson’s Extrapolation, Elements of Numerical Integration, Composite Numerical Integration, Romberg Integration, Adaptive Quadrature Methods, Gaussian Quadrature, Multiple Integrals, Improper Integrals</span></span></span></span></span></p> <p style="text-align:justify"><b>MATH 278: Real Analysis II (3, 0, 3)</b></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Uniform convergence: </span></span></b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">The general principle of uniform convergence. A uniform limit of continuous functions is continuous.<b> </b>Uniform convergence and term-wise integration and differentiation of series of real-valued functions.<b> </b>Local uniform convergence of power series.</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Uniform continuity and integration:</span></span></b><i> </i><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Continuous functions on closed bounded intervals are uniformly continuous. Review of basic facts on<i> </i>Riemann integration (from Analysis I). Informal discussion of integration of complex-valued and R<sup>n</sup>-valued functions of one variable; <i>R<sup>n</sup> as a normed space, d</i>efinition of a normed space. Examples, including the Euclidean norm on <i>R</i><sup>n</sup> and the uniform norm on C[a, b]. Lipschitz mappings and Lipschitz equivalence of norms. The Bolzano-Weierstrass theorem in R<sup>n</sup>.  <b>Differentiation from R<sup>m</sup> to R<sup>n</sup>:<i> </i></b>Definition of derivative as a linear map; elementary properties, the chain rule. Partial derivatives; continuous partial derivatives imply differentiability. Higher-order derivatives; symmetry of mixed partial derivatives (assumed continuous). Taylor’s theorem. The mean value inequality. Path-connectedness for subsets of R<sup>n</sup>; a function having zero derivatives on a path-connected open subset is constant. <b>Metric spaces: </b>Definition and examples. Metrics used in Geometry, Limits, continuity, balls, neighbourhoods, open and closed sets. <b>The Contraction Mapping Theorem: </b>The contraction mapping theorem. Applications including the inverse function theorem (proof of continuity of inverse function, statement of differentiability). Picard’s solution of differential equations.</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">MATH 286: Differential Equations I (3, 0, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Introduction: Methods of deriving Differential Equations. Ordinary Differential Equations of first order.  Separable, Homogeneous, Linear, Exact, Integrating factors and methods of isoclines.  Linear differential equations of the second order with constant coefficients. Systems of first order equations. Solution of ordinary equations of first order Using methods of variation of parameters.  Reduction of nth order equation to a system of first order equations</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">STAT 252: Statistical Inference (3, 0, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Estimation: Point and interval estimation of parameters (mean, proportion and variance), properties of point estimators, methods of point and interval estimation; Hypothesis Testing: Basic concepts, significance tests for parameters including analysis of variance (ANOVA); Non-parametric tests (Chi-square tests, tests for independent and paired samples); Type I and II errors and power function, Neyman-Pearson Lemma and likelihood ratio test for most powerful critical region. </span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:12pt"><span style="font-family:&quot;Times New Roman&quot;,serif"><b>ENGL 264: Literature in English II (1, 1, 1)</b></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Literature as Poetry: What is a poem, and its characteristics? Difference between a poem and song. The figure of speech and the literary device. Practical Appreciation. Texts to be studied: selected African and English poems. Literature as Drama:  What is a play, and its characteristics: Drama and theatre. Shakespeare. The Modern Play.</span></span></span></span></span></p> <p style="text-align:justify"> </p> <p style="text-align:justify"><strong>Year 3 Semester 1</strong></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">MATH 365:  Differential Equations II (3, 1, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Existence and uniqueness of solution of differential equations. Solution of certain linear differential equations of second order in series (for example, Legendre’s equation and Bessel’s equation). Special functions (recurrence relations); Legendre polynomials, Bessel functions, Hermite and Chebychev polynomials, Laguerre and Hypergeometric functions</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:12pt"><span style="font-family:&quot;Times New Roman&quot;,serif"><b>MATH 379 NUMERICAL ANALYSIS II (2, 1, 3)</b></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><i><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Numerical Solutions of Nonlinear Systems of Equations: </span></span></i><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Fixed Points for Functions of Several Variables, Newton’s Method, Quasi-Newton Methods, Steepest Descent Techniques, Homotopy and Continuation Methods, The Conjugate Gradient Method. <i>Initial-Value Problems for Ordinary Differential Equations: </i>Euler’s Method, Higher-Order Taylor Methods, Runge-Kutta Methods, Error Control and the Runge-Kutta-Fehlberg Method, Multistep Methods, Variable Step-Size Multistep Methods, Extrapolation Methods, Higher-Order Equations and Systems of Differential Equations, Stability, Stiff Differential Equations</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">STAT 351: Statistical Computing and Data Analysis I (2, 2, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">The topics includes: Database management and use of statistical packages; Graphical techniques; importing graphics into word-processing documents (e.g, LaTeX); </span></span><span style="font-size:12.0pt"><span style="font-family:&quot;Times New Roman&quot;,serif">Microsoft Excel, Access and Power Point; </span></span><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Data analysis and automating tasks in spreadsheet using macros; Programming in Visual Basic for Applications(VBA), Report development in spreadsheet; Simulation and sampling.</span></span></span></span></span></p> <p style="text-align:justify"> </p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">STAT 353: Non-Parametric Statistics (3,1, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif"><span style="color:black">Non-parametric statistics is about estimation and hypothesis testing when the form of the underlying distribution is unknown. The topics include: G</span></span></span><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">eneral nature of nonparametric tests: comparisons with classical parametric methods, emphasis on assumptions and interpretation, ranks and runs; Goodness of fit tests analysis contingency table for measures of association; Tests for randomness; <i><span style="position:relative"><span style="top:3.0pt"><img src="file:///C:/Users/DROGON~1/AppData/Local/Temp/msohtmlclip1/01/clip_image004.png" style="width:35px; height:19px" /></span></span></i>-sample tests: <span style="color:black">Tests of randomness, Kolmogorov-Smirnov test, </span>Wilcoxon's rank sum,  Kruskal-Wallis, Friedman tests, Sign, Wilcoxon Signed-rank, Kendall's <i><span style="position:relative"><span style="top:5.0pt"><img src="file:///C:/Users/DROGON~1/AppData/Local/Temp/msohtmlclip1/01/clip_image006.png" style="width:13px; height:19px" /></span></span></i>Spearman's rank correlation coefficient tests; Confidence intervals based on ranks; Efficiency of nonparametric procedures and robustness considerations.</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">STAT 355: Sample Survey Theory and Methods I (3,1, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Introduction: Uses, scope and advantages of sample survey, types of surveys, and organization and management of surveys; Basic concepts of sampling: Types of sampling designs (probability and non-probability sampling); sampling unit, sampling size and sampling frame, errors in surveys, and bias arising from non-response; Data collection methods; History of censuses in Ghana, organization of censuses and sample surveys – stages in the planning and execution of censuses and surveys, scope and cost of census and survey, construction of questionnaire, pre-testing of questionnaire and pilot surveys, field operations, coding of collected data, processing of data, control tabulations, etc.; Evaluation of census data (post enumeration surveys); Non-probability sampling methods; Simple random sampling: estimation of population means, proportions and totals; properties of estimates; determination of sample size.</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">STAT 357: Regression Analysis (3,1, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Basic concepts of regression  and  correlation analysis; Correlation coefficient  and scatter diagram; Estimation of parameters of simple and multiple regression models by the least squares method, inferential analyses on regression parameters; Use of qualitative variables; Residual analysis for testing model assumptions and adequacy; Correlation analysis of response and predictor variables, concept of multicolinearity; Use of statistical packages for regression and correlation analyses (SPSS, R, Strata, SAS, Excel, etc.).</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:12pt"><span style="font-family:&quot;Times New Roman&quot;,serif"><b>STAT 359: Stochastic Processes I   (3,1, 3)</b></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif"><span style="text-transform:uppercase">D</span></span></span><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">efinitions and context for the theory of stochastic processes; Random walks with and without reflecting/absorbing barriers. Markov Chains: definition, the transition matrix, continue-time chain, and the Chapman-Kolmogorov equations; Classification of states; The existence and uniqueness of a stationary distribution; Applications, in particular to Bonus-Malus Systems, simulation of Markov chains; Properties of some standard probability distributions (introduction to Poisson Processes); The Theory of Recurrent Events; Poisson Processes, Markov Processes; Renewal Processes.</span></span></span></span></span></p> <p style="text-align:justify"> </p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif"><strong>Year 3 Semester 2</strong></span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">STAT 352: Statistical Computing and Data Analysis II (2,2, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Application of statistical packages (e.g. SPSS, R, Strata, SAS, Splus, Strata, Minitab, Genstat, Excel, etc.) in statistical data analysis. <span style="color:black">This will include </span>statistical reporting using software packages for statistical computations, numerical and graphical summaries; confidence intervals, parametric and non-parametric tests; regression and time series analyses; Analyzing data from comparative studies.</span></span></span></span></span></p> <p style="text-align:justify"> </p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">STAT 354: Demographic Statistics (3,1, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Scope, uses and sources of demographic and socio-economic data; methods of enumeration; demographic concepts and measures; current and cohort methods of description and analysis; rates and ratios; standardization; construction of life tables. Measurement of fertility, mortality and nuptiality. Determinants of age structure and the intrinsic growth rate. Survey data; interpretation of demographic statistics, tests of consistency and reliability. Population projection, and discuss their effects upon education and manpower planning; Use of microcomputer to interpret demographic data.</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">STAT 356: Sample Survey Theory and Methods II (3,1, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Random sample designs: The definitions, notations and description of selection with stratified sampling, systematic sampling, cluster sampling, multi-stage sampling, and probability proportional to size (pps); Properties estimates of population means, proportions and totals; determination of sample size; Ratio and regression estimation; Criteria for choosing sampling designs; Variance estimation with complex sample designs: Taylor series method, repeated replications, jackknife repeated replications, use of appropriate software to calculate standard errors; Students would be required to conduct surveys on some socio-economic issues using sample designs and submit reports for assessment.</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">STAT 358:  Time Series Analysis I (3,1, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span style="font-size:12.0pt"><span style="font-family:&quot;Times New Roman&quot;,serif">Topics will include the following:  Basic concepts of time series modelling; </span></span><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Descriptive techniques for time series</span></span><span style="font-size:12.0pt"><span style="font-family:&quot;Times New Roman&quot;,serif">; </span></span><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Stationary time series, removal of trend and seasonal differences, moments and autocorrelation; Index Numbers: Uses and types of price indexes; Simple autoregressive and moving average models, moments and autocorrelations, the conditions of stationarity and invertibility</span></span><span style="font-size:12.0pt"><span style="font-family:&quot;Times New Roman&quot;,serif">; </span></span><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Mixed (ARMA) models and the AR representation of MA and ARMA models;  Fitting and testing time series models; Forecasting, methods of forecasting, scientific forecasting, basic forecasting models, forecasting criteria; Model building and identification.</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">STAT 360:  Stochastic Processes II (3,1, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Martingales and martingales convergence theorem; Brownian motion: distributional results, reflection principle, stopping times and hitting times, diffusion processes; Conditional Expectation: precise definition, properties of the conditional expectation operator, deriving results using the conditional expectation; Stochastic differential equations and the Radon-Nikodym Theorem. Branching Processes: generating functions, definitions, extinction probabilities, martingales recuperated from branching processes and intro to more complicated examples.</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">MATH 366: Partial Differential Equations (2,2, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Definition of a Partial Differential Equations (PDE). Equations of the First Order, Cauchy Problem, Characteristics, Method of Lagrange, Classification of Second Order Equations. Laplace and Poisson Equations, Boundary Value Problems, the Sturm-Liouville Problem, Separation of Variables, Fundamental Solution of Potentials and their Properties, Harmonic Functions, Green’s Function, Uniqueness Theorems. The Wave and Heat Equations, Methods of Eigen Functions, Expansions.</span></span></span></span></span></p> <p style="text-align:justify"> </p> <p style="text-align:justify"><strong><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Year 4 Semester 1</span></span></span></span></span></strong></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">STAT 451: Project Report Writing (1,2, 2)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">The topics include the following: Principles of conducting research; Types of approaches to research: Qualitative and quantitative; Selecting research topic; Research proposal; Literature search; Methods of data collection; Analysis of research data; Writing and presentation of research report. After this, students will be given research topics from various areas in Statistics to write on and submit reports as their project works.</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">STAT 453: Introduction to Measure and Probability Theory (3,1, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Measure and integration: Measurable functions, measures, measure space; integration, monotone convergence theorem, Fatou's lemma; convergence theorems; Radon Nikodym theorem; Lebesgue decomposition; Probability Theory: Probability as a measure; probability space; random variables; distribution functions and characteristic functions. Sums of random variables, independence. Modes of convergence of sequences of random variables. Borel-Canteli lemmas and the zero-one laws, laws of large numbers and central limit theorem.</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">STAT 455: Survival Analysis (3,1, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Topics include Types of survival data;  survivor and hazard functions; censoring; estimating the survivor and hazard functions; comparing survivor functions using non-parametric tests; parametric models for the hazard function; Cox proportional hazards regression models.</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">STAT 457: Design and Analysis of Experiments I (3,1, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">The nature of experimental investigation: experimental objective, statistical objectives of  design – elimination of sources of bias and random errors; Principles experimentation: randomization, replication and blocking, covariates, orthogonality, balance, logical control or error, sequential design; Elementary concepts of design of experiments: factors, factor levels plots, treatments, single factor and multiple factor experiments, fixed, rand and mixed effects models; Completely randomized design: Randomization process, the model and its specification, estimation effects, partitioning of the total sum of squares, expected mean squares, analysis of variance and its underlying assumptions, test of treatment effects, methods of multiple comparisons; Randomized block design: situations for its use, compare and contrast with completely randomized design, the model and its specification, estimation effects of additivity and interaction, partitioning of total sum of squares, analysis of variance and its test of treatment and block effects, Turkey’s test of additivity, treatment of missing observation.</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">STAT 469: Operations Research I (3,1, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Basic concepts and historical background of operations research (OR); Decision Theory: techniques of decision theory, for example, minimax/maximin criterion, minimax regret criterion, decision </span></span><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">trees, expected values, etc.; Linear programming (LP) as resource allocation tool: Formulation of LP problems, solution methods of LP models, duality theory and economic interpretations, post optimality (sensitivity) analysis of LP model; Application transportation and assignment problems; Integer programming methods; Unconstrained and constrained optimisation problems and methods of solution.</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">STAT 471:  Applied Time Series Analysis (3,1, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Probability models for time series, stationary processes, the autocorrelation function; pure random process, MA and AR processes; mixed models, integrated models; the general linear process, continuous processes. Model identification and estimation, estimating the auto covariance and autocorrelation functions; fitting AR and MA processes; estimating the parameters of mixed and integrated models; the Box-Jenkins seasonal model; residual analysis. Forecasting, univariate and multivariate procedure; prediction theory. Spectral theory, the spectral density function; Fourier analysis and harmonic decompositions; periodogram analysis; spectral analysis, effects of linear filters; estimation of spectra; confidence intervals for the spectrum.</span></span><span style="font-size:12.0pt"><span style="font-family:&quot;Times New Roman&quot;,serif"> Use of statistical packages for graphical and numerical analysis</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">STAT 473: Further Topics in Regression Analysis (3, 1, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Analysis of the general linear regression model: homoscedasticity and heteroscedasticity assumption concepts, detection and effects of multicollinearity, residual analysis model selection and validation, stepwise variable selection procedures, use of dummy variable and transformations; Non-linear regression models (logistic, poisson r<span style="color:black">egression, ridge, etc. regression models), </span>the use of indicator variables, <span style="color:black">odds ratio analysis of binary data, </span>measurement of association in two-way tables<span style="color:black">; Applications involve the use of a statistical software package</span>, like SPSS, R, SAS, or STATA for data analysis.</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">STAT 475: Mathematics of Finance (3,1, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Topics to be covered include: Rates of interest and discount including nominal and effective interest rates; Simple and compound interests; Present and future values of stream of cash flows; Annuities and perpetuities;  Amortization of  loans and sinking funds; Break-Even Analysis; Investment appraisal techniques: payback technique, accounting rate of return, net present value (NPV), internal rate of return (IRR), and discounted-payback period (DPP); Determination of yields on investment funds: money-weighted rate of return and time –weighted rate of return; Introduction to the operation of certain financial securities such as forwards contracts, <i>futures</i> contracts, stocks, treasury bills and fixed deposits, bonds, options, hedging; Capital rating, Stochastic interest rate models; Index Numbers.</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">ACTS 457:  Loss Models I (3,1, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Principles of general insurance, economics of insurance; Models for loss severity, Insurance claim number models: the Poisson distribution, the negative binomial distribution; parametric models, effect of policy modifications and tail behaviour. Aggregate claims model, Panjer recursion model, (a,b,0), (a,b,1) and mixed Poisson models; Models for future claim amounts for claims that have occurred but are not settled. Estimation of premiums using both claims experience and general information, credibility theory, limited fluctuation, greatest accuracy credibility theory and empirical Bayes method.</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">MATH 473: Mathematical Economics I (3,1, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Theory of Consumer Behavior: Constrained Optimizing Behaviour. The Slutsky Equation, Construction of Utility Number. Theory of the Firm: Constrained Optimizing Behaviour, Constant Elasticity of Substitution (CES), and Production Function. Market Equilibrium with Lagged Adjustment and Continuous Adjustment. Multi Market Equilibrium. Pareto Optimality. Linear Models. Input-Output (I-O) models, Concepts of Linear Programming and Applications.</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">MAS 261: Principles of Management I (3,0, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">It covers nature and scope of management, managerial functions, organizational theories, and goals of business organizations–economic and social responsibilities of management, decision making techniques and influence, the nature and types of organization and their implications for organizational administration.</span></span></span></span></span></p> <p style="text-align:justify"> </p> <p style="text-align:justify"><strong>Year 4 Semester 2</strong></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">STAT 452: Project Report (0,8, 4)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Students will continue to work on their project works assigned to them in the first semester and submit their final research reports for assessment in a defense.</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">STAT 454: Introduction to Bayesian Statistics (3,1, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Topics include: Problems associated and connections the with classical approach; Prior and posterior distributions; Specification of prior distribution; Bayesian point and interval estimation, properties of Bayes' estimators; Bayesian testing procedures; Examples of situations where Bayesian and classical approaches give equivalent or nearly equivalent results; Bayesian computation and Markov Chain Monte Carl Gibbs Sampling; Modern Bayesian methods.</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">STAT 456: Multivariate Analysis (3,1, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Introduction to analysis of multivariate data with examples from various fields such as economics, education, social and physical sciences, and health care; Topics include examples of multivariate data;</span></span><span style="font-size:12.0pt"><span style="font-family:&quot;Times New Roman&quot;,serif"> Mean vectors and covariance matrices, correlation matrix; M</span></span><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">ultivariate normal distribution; Sampling from a multivariate normal distribution: Wishart and Hotelling’s T<sup><span style="position:relative"><span style="top:-2.5pt">2</span></span></sup> distribution and their properties; Inference about the mean vector; Multivariate regression, multivariate analysis of variance (MANOVA); Principal components analysis; Factor analysis; Discriminant analysis and classification; Canonical correlation analysis; Cluster analysis; Use statistical computer packages for multivariate data.</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:12pt"><span style="font-family:&quot;Times New Roman&quot;,serif"><b>STAT 458: Design and Analysis of Experiments II (3,1, 3)</b></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Factorial experiments and designs: basic definitions and principles, 2<sup>2</sup> and 2<sup>3</sup> designs, calculation and interpretation of effects and interactions, Yate’s algorithm for the 2<sup>k</sup> design; Latin square design: situations of its use, model and its specification, randomization, analysis of variance test and its test of treatment effect, treatment of missing observations; Incomplete block design, optimality criteria; Crossed and nested block structures; Confounding: reasons for confounding, complete confounding test of treatment effects, rules of confounding in 2<sup>p </sup>blocks; Analysis of Covariance: concomitant variables, the covariance model and its underlying assumptions, estimation and comparison of treatment effects, adjusted treatment means, analysis of covariance table hypothesis testing: Use of statistical computer packages for data analysis and interpretation.</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">STAT 470: Operations Research II (3,1, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Network Analysis: Basic definitions, minimal spanning tree, travelling  salesman, maximal flow problems, project management control techniques (CPM and PERT); Inventory Control: basic definitions, inventory costs, i</span></span><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">nventory models; Queuing Theory: definitions and classes of queues, simple queue model and its characteristics, applications to various situations; Markov Process: definition, transition matrix and its formation, equilibrium or long run situations to markov process; Simulation as an operation research tool;  Non-linear optimisation techniques; Methods of forecasting. </span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">STAT 472: Statistical Quality Control (3,1, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif"><span style="color:black">Topics covered are: Historical background </span></span></span><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">of statistical quality control; Concepts of quality management including quality improvement philosophies, t</span></span><span style="font-size:12.0pt"><span style="font-family:&quot;Times New Roman&quot;,serif">otal quality management (TQM), and quality tools; Statistical process control: control charts for variables and attributes; Process characterization and capability analysis, CUSUM and EWMA, short production runs; Acceptance sampling by attributes and variables: definition of terminologies, sampling plans, operating characteristic and average outgoing curves, effects of lot size, tolerance interval; Role of design of experiments in quality improvement; I</span></span><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">international quality standards.</span></span></span></span></span></p> <p style="text-align:justify"><b>STAT 474: Basic Epidemiology (3,1, 3)</b></p> <p style="text-align:justify">Topics covered are Measures of disease frequency and risk, and alternative sources of epidemiological data; Cross-section, cohort, case-control and intervention studies; Experimental versus observational data; Issues of causation, randomization, placebos Interpretation of epidemiological studies; Preventive strategies, measures of public health impact and screening; Validity, measurement of response, sample size determination, matching and random allocation methods; Design and analysis of randomized clinical trials, group sequential designs and crossover trials; Survival studies; Diagnosis testing; statistical analysis of the medical process; Image analysis of PET and MRI scans; A computing tutorial will be used to introduce a statistical package like Stata, R or SAS.</p> <p style="text-align:justify"><b>STAT 476: Actuarial Statistics II (3, 1, 3)</b></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Topics include: Brief of theory of interest; Force of mortality and life tables; Life annuities, assurances and premiums, reserves; Insurance policies with expenses and bonuses introduced, Gross Premiums and Gross Premium Reserves of insurance policies; Joint life and last survivor statuses, multiple decrement tables, expenses, individual and collective risk theory; Population projections;</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">STAT 478: Financial Accounting (3,1, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Topics to be covered include: Profit and loss account or income statement, balance sheet and cash flow statement; Journal, ledger and book keeping principles; Preparation of financial statement for sole trader and partnership businesses and that for limited liability companies, basic cash flow statement for limited liability companies; Application of accounting standards and case studies.  </span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">MATH 474: Mathematical Economics II (3,1, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Macro-economic theory is treated with a Mathematical approach in the following areas: Simple model of </span></span><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Income Determination, Consumption and Investment, the Investment Savings (IS) Curve. Monetary Equilibrium, the Liquidity Preference/ Money Profit (LM) Curve. Labour Wages and Price (Inflation) models.  Full employment equilibrium models of Income Determination.  Aggregate demand and Supply analysis.  Balance of Trade (Payments), Model of Income Determination.  Dynamic Models of Income Determination. Stabilisation Policy, Comparative Statics Analysis of Monetary Fiscal Policy, the Harod Domar Growth model, the Neo-classical growth model.  Interest Theory.</span></span></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><b><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">MAS 262: Principles of Management II (3,0, 3)</span></span></b></span></span></span></p> <p style="text-align:justify"><span style="font-size:11pt"><span style="line-height:normal"><span style="font-family:Calibri,sans-serif"><span lang="EN-US" style="font-size:12.0pt" xml:lang="EN-US"><span style="font-family:&quot;Times New Roman&quot;,serif">Organizational behaviour/human relations – interpersonal and group processes, the application of concepts, like leadership, motivation, communication, morale, to the management of people and organizations, time management, analysis of causes, of change, managing change, innovation, management control.</span></span></span></span></span></p> </div> </div> <div> <div>Programme Type</div> <div><a href="/taxonomy/term/29" hreflang="en">BSc</a></div> </div> Fri, 11 Sep 2020 13:05:05 +0000 enaidoo 11 at https://statacts.knust.edu.gh