Consider the function `f(x), g(x), h(x)` as given below. Show that `(fog)oh=fo(goh)` in each case.
`f(x)=x-1, g(x)=3x+1 and h(x)=x^(2)`.

Consider the function f(x), g(x), h(x) as given below. Show that (fog)oh=fo(goh) in each case. f(x)=x-4, g(x)=x^(2) and h(x)=3x-5

Consider the function f(x), g(x), h(x) as given below. Show that (fog)oh=fo(goh) in each case. f(x)=x^(2), g(x)=2x and h(x)=x+4

Consider the function f(x) , g(x) ,h(x) as given below , Show that (f^(@) g) ^(@) h =f^(@) (g^(@) h) in each case. f(x) =-x-1 ,g(x) =3x+ 1 and h (x) =x+4

If f(x)=x^(2), g(x)=3x and h(x)=x-2 . Prove that (fog)oh=fo(goh) .

Given f(x) = x-1, g(x) = 3x+1 and h(x) = x^2 show that (fog )oh = f o(goh)

If f(x)=2x+3, g(x)=1-2x and h(x) =3x . Prove that fo(goh)=(fog)oh .

Using the function f and g given below, find the fog and gof. Check whether fog=gof. f(x)=4x^(2)-1, g(x)=1+x

If f(x)=x+4, g(x)=2x-1 and h(x) =3x then find (fog)oh .

If f(x)=x-1, g(x)=3x , and h(x)=5/x , then f^(-1)(g(h(5))) =