k(x)

h(x)

f(x)

g(x)

g(x) is a stretched version of f(x)

g(x) is a compressed version of f(x)

g(x) is a rotated version of f(x)

g(x) is a mirrored version of f(x)

g(6)

g(-6)

g(-3)

g(3)

f(2) = g(2)

f(1) = g(2)

f(1) = g(1)

f(2) = g(1)

g(x) = f(2x)

g(x) = f(x/2)

g(x) = f(x+2)

g(x) = f(x-2)

It shifts the function

It reflects the function

It stretches the function

It compresses the function

It makes the input increase or decrease faster

It makes the input increase or decrease slower

It reflects the input

It shifts the input

Ask someone else

Forget about it

Try more examples

Ignore the concept

You will get confused

You can ignore the transformation

You will see the pattern of input compression

You will find new functions

Input the same value into both

Input twice the value into f(x)

Input half the value into f(x)

Input twice the value into g(x)