Mathematics II

Requirements for the exam for Mathematics II, SS 2016/2017

Key notions from Mathematics I

supremum and infimum of a set of real numbers
limit of a sequence
limit of a function
continuity of a function at a point
derivative of a function at a point

Key notions

open ball
open set
closed set
convergence of a sequence in Rⁿ
function continuous on a set
compact set
maximum/minimum of a function on a set
local maximum/minimum of a function with respect to a set
partial derivative
function of class C¹
convex set
concave function
antiderivative

Definitions

the Euclidean metric
interior point of a set
interior of a set
boundary point of a set
boundary of a set
closure of a set
bounded set
a function continuous with respect to a set
a function continuous at a point
strict maximum/minimum of a function on a set
strict local maximum/minimum of a function with respect to a set
local maximum/minimum
strict local maximum/minimum
limit of a function at a point
tangent hyperplane
gradient of a function
critical point of a function
partial derivative of the second order
function of class C^k and C^∞
convex function
strictly concave/convex function
quasiconcave/quasiconvex function
strictly quasiconcave/quasiconvex function
rational function
Riemann integral

Theorems with easier proofs

properties of the Euclidean metric
properties of open sets
characterisation of convergence of sequences in Rⁿ
characterisation of closed sets
properties of closed sets
boundedness of the closure
continuity and level sets
necessary condition for a local extremum
continuity of functions of class C¹
super-level sets of concave functions
extremum of a concave function of class C¹
uniqueness of an extremum
super-level sets of quasi-concave functions
structure of the set ∫f(x)dx
linearity of antiderivative
integration by substitution
integration by parts

Theorems with harder proofs

Heine theorem
characterisation of compact sets in Rⁿ (proof in R²)
on attaining extrema of functions
weak Lagrange theorem
tangent hyperplane theorem
implicit function theorem
Lagrange multipliers theorem in R²
integral with variable upper limit

Theorems without proof

properties of the interior and the closure
continuity and arithmetic operations
continuity and composition of functions
derivative of a compound function
interchanging of partial derivatives
implicit functions theorem
Lagrange multipliers theorem with more constraints
relation of concavity and continuity
characterisation of concave functions of class C¹
existence of an antiderivative
existence of the Riemann integral
Riemann integral over subintervals
linearity of the Riemann integral
Riemann integral and inequalities
Newton-Leibniz formula