Operations With & Composite Functions
to compose functions
evaluate outer function using the inner function
How do you compose two functions?
Given two functions f[g(x)], step1: substitute the inner function g(x), for x step2: insert into outer function f(x) step3: perform operations step4: combine like terms
If you were to evaluate the composite function f[g(x)] for f(x) = 3x² + 6 and g(x) = x - 8, what is the first step?
Step 1: Substitute g(x) for x f[g(x)] = f[x - 8]
If you were to evaluate the composite function f[g(x)] for f(x) = 3x² + 6 and g(x) = x - 8, what is the second step?
Step 2: Insert into f(x) f[g(x)] = 3(x - 8)² + 6
If you were to evaluate the composite function f[g(x)] for f(x) = 3x² + 6 and g(x) = x - 8, what is the third step?
Step 3: Factor = 3(x² - 16x + 64) + 6
If you were to evaluate the composite function f[g(x)] for f(x) = 3x² + 6 and g(x) = x - 8, what is the fourth step?
Step 4: combine like terms = 3x² - 48x + 198.
How do you find the domain of a composite function?
Step1: find the domain (restrictions) of the inner function Step2: combine the functions step3: find the domain (restrictions) of the composite function step4: compose domains.
Composition of functions is not commutative. True or false?
True! f[g(x)] is generally not equal to g[f(x)]. Consider f(x) = 2x, and g(x) = x - 3 f[g(x)] = 2(x - 3) = 2x - 6 g[f(x)] = (2x) - 3 = 2x - 3 f[g(x)] is not equal to g[f(x)].
[f o g](x) = f[g(x)] true or false?
True! these are two ways of writing the same thing.
to multiply polynomial functions
apply the distributive property
to add radical functions
combine coefficients in front of radical with common index and radicand
to add polynomial functions
combine like terms
to subtract polynomial functions
distribute negative one to subtrahend and combine like terms
to add rational functions
get a common denominator and equivalent numerators, then combine like terms in numerators
to subtract rational functions
get common denominator and equivalent numerators, distribute negative one to the subtrahend, then combine like terms in numerators
decompose h(x) = (x-4)²
if we choose to remove the component (x-4) as the inner function g(x), then we replace x for every g(x) in f. h(x) = (x-4)² becomes = f[g(x)], or = f(x-4) so f(x) = x² , and g(x) = x - 4 the answer depends on which component you choose to remove.
to multiply rational functions
multiply numerators and multiply denominators
to divide rational functions
multiply the dividend by the reciprocal of the divisor
criteria for multiplying radical functions
must have same index
criteria for adding radical functions
must have save index and radicand
to multiply radical functions
product of coefficients is placed in front of radical with common index, multiply radicands
to divide polynomial functions
set dividend over divisor, factor both with respect to integers, cancel common factors, simplify
find the domains of g[f(x)], if f(x) = 4x − 6, and g(x) = √x .
step1: in f(x) = 4x − 6, x is all real numbers step2: in g(f(x)) = √f(x) = √(4x − 6) step3: in g(f(x)) = √(4x − 6) √(4x − 6) ≥ 0, so x ≥ (3/2) step4: in g(f(x)), Domain {x | x ≥ (3/2) }
find the domains of f[g(x)], if f(x)= 3/(x-2) and g(x)=√(1-x)
step1: in g(x) = √(1-x), x ≤ 1 step2: in f[g(x)] = 3/(√(1-x) - 2) step3: in 3/(√(1-x) - 2), √(1-x) ≠ 2 , so (1-x) ≠ 4, finally x ≠ -3 step4: f[g(x)], Domain {x | x ≤ 1, and x ≠ -3 }
function decomposition
when you break into simpler functions from a more complicated function; finding the components of a function.
