B. Sc. Management Math Notes
MT105a Study Notes – J.Fenech
Chapter 1/2 – Basics
1. Basic notations 1.1. Sum of: ∑ 1.2. Product of: ∏ 2. Sets A = {1,2,3} describes the set A containing members 1, 2, and 3. A={n | n is a whole number and 1≤n≤3} x A denotes that x is a member of set A S T denotes that S is a subset of T A B is the set whose members belong to either set A, set B or both i.e. A B = {x | x A or x B} A B is the intersection of 2 sets where A B = {x | x A and x B} denotes an empty set
3. Functions Given two sets A and B, a function from A to B is a rule which assigns to each member of A precisely one member of B.
A function is a one-way relationship: the function number, (x).
takes a number x as input and it returns another
An inverse function takes as input a number y and returns the number x such that ( ) ( ) Not all functions have an inverse. Ex. ( ) A composite function is one where two functions that; ( ) ( ( )) 4. Powers Rules ( )
is given by
are applied consecutively to obtain h such
1|Page
MT105a Study Notes – J.Fenech
Chapter 3 – Differentiation
1. Definition The derivative is a measure of the instantaneous rate of change of a function 1.1. Derivative from first principles ( ) ( )
1.2. Alternative notation ( ) 1.3. Standard Derivatives Table
2. Differentiation Rules 2.1. Sum Rule ( ) ( ) ( ) ( ) ( ) ( )
2.2. Product Rule
( )
( ) ( )
( )
( ) ( )
( ) ( )
2.3. Quotient Rule ( )
( ) ( )
( )
[ ( ) ( ) ( ) ( )] ( )
2.4. Chain Rule or Composite function rule ( ) ( ( )) ( ) ( ( )) ( )
2|Page
MT105a Study Notes – J.Fenech 3. Differentiation by taking logarithms 4. Local Maxima and Minima Derivatives are very useful for finding the maximum and minimum values of a function In particular; If ’(x) > 0 then is increasing at x If ’(x) < 0 then is decreasing at x 4.1. First derivative test At a point c for which ’(c) =0, is neither increasing nor decreasing. C is the
Chapter 1/2 – Basics
1. Basic notations 1.1. Sum of: ∑ 1.2. Product of: ∏ 2. Sets A = {1,2,3} describes the set A containing members 1, 2, and 3. A={n | n is a whole number and 1≤n≤3} x A denotes that x is a member of set A S T denotes that S is a subset of T A B is the set whose members belong to either set A, set B or both i.e. A B = {x | x A or x B} A B is the intersection of 2 sets where A B = {x | x A and x B} denotes an empty set
3. Functions Given two sets A and B, a function from A to B is a rule which assigns to each member of A precisely one member of B.
A function is a one-way relationship: the function number, (x).
takes a number x as input and it returns another
An inverse function takes as input a number y and returns the number x such that ( ) ( ) Not all functions have an inverse. Ex. ( ) A composite function is one where two functions that; ( ) ( ( )) 4. Powers Rules ( )
is given by
are applied consecutively to obtain h such
1|Page
MT105a Study Notes – J.Fenech
Chapter 3 – Differentiation
1. Definition The derivative is a measure of the instantaneous rate of change of a function 1.1. Derivative from first principles ( ) ( )
1.2. Alternative notation ( ) 1.3. Standard Derivatives Table
2. Differentiation Rules 2.1. Sum Rule ( ) ( ) ( ) ( ) ( ) ( )
2.2. Product Rule
( )
( ) ( )
( )
( ) ( )
( ) ( )
2.3. Quotient Rule ( )
( ) ( )
( )
[ ( ) ( ) ( ) ( )] ( )
2.4. Chain Rule or Composite function rule ( ) ( ( )) ( ) ( ( )) ( )
2|Page
MT105a Study Notes – J.Fenech 3. Differentiation by taking logarithms 4. Local Maxima and Minima Derivatives are very useful for finding the maximum and minimum values of a function In particular; If ’(x) > 0 then is increasing at x If ’(x) < 0 then is decreasing at x 4.1. First derivative test At a point c for which ’(c) =0, is neither increasing nor decreasing. C is the