MA12010: Core pure and applied mathematics A
[Page last updated: 23 October 2023]
Academic Year: | 2023/24 |
Owning Department/School: | Department of Mathematical Sciences |
Credits: | 15 [equivalent to 30 CATS credits] |
Notional Study Hours: | 300 |
Level: | Certificate (FHEQ level 4) |
Period: |
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Assessment Summary: | EXCB 100% |
Assessment Detail: |
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Supplementary Assessment: |
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Learning Outcomes: |
After taking this unit, you will be able to:
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Synopsis: | You will develop core skills in mathematics. You will study algebra and build a firm grounding in the fundamental objects of mathematics such as sets, functions, numbers, polynomials and matrices. You will study analysis to define the notions of convergence and limit. You will explore calculus in two and three dimensions and key mathematical methods for solving linear differential equations. Mathematical methods will be motivated with examples from physics, engineering and other sciences. |
Content: | Algebra:
Sets and functions: constructions and properties, cardinality. Equivalence relations and partitions. Permutations: cycle notation and sign, the symmetric group. Numbers (natural, integer, rational, real, complex); algebraic properties as rings and fields. Primes, factorisation, and Euclid's algorithm; modular arithmetic. The complex plane: complex exponentials, roots of unity. Polynomials: division with remainder, coprime polynomials. Matrices with real coefficients: matrix algebra, linear transformations, 2-by-2 and 3-by-3 determinants, geometric interpretation. Systems of linear equations: matrix representation, row operations and row echelon form.
Multivariable calculus & differential equations:
Visualisation and analysis of space in rectangular, polar, cylindrical and spherical co-ordinate systems, arc length, surfaces of revolution. Visualisation and parameterisation of three-dimensional surfaces (planes, paraboloids, spheres, cylinders, cones). Partial derivatives, critical points, chain rule. Jacobians and change of variables, double integrals over rectangular and non-rectangular domains, triple integrals, surface area and volume, the Riemann interpretation. Key applications. Dynamics and differential equations: first-order linear and nonlinear differential equations, integrating factors, separable equations. Review of complex numbers and Euler's formula. Second-order linear constant-coefficient equations: characteristic equations, real and complex roots, general real solutions, inhomogeneous problems. Key applications.
Sequences:
Logic, quantifiers. Numbers and inequalities. Sequences. Series. Limits |
Course availability: |
MA12010 is Compulsory on the following courses:Department of Mathematical Sciences
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Notes:
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