A function satisfies g(5)=3 and g(3)=0, and a function h satisfies h(3)=-2 and h(0)=5.What is the value of h(g(3))?

A function f satisfies f (2) = 3 and f (3) = 5. A function g satisfies g(3) = 2 and g(5) = 6. What is the value of f(g(3)) ?

Let g:R rarr R be a differentiable function satisfying g(x)=g(y)g(x-y)AA x,y in R and g'(0)=a and g'(3)=b. Then find the value of g'(-3)

g(x)=2x-1 h(x)=1-g(x) The functions g and h are defined above. What is the value of h(0) ?

If g(x) is invertible function and h(x)=2g(x)+5, then the value of h^(-1) is

Several values for the functions g (x) and h (x) are shown in the table above. What is the value of g (h(3)) ?

g(x)=2^(x) h(x)=8x^(2) if functions g and h are defined in the above equations, what is the value of g(h(3)) ?

Let g(x) be a function satisfying g(0) = 2, g(1) = 3, g(x+2) = 2g(x+1), then find g(5).

Let g(x) be a function satisfying g(0) = 2, g(1) = 3, g(x+2) = 2g(x+1), then find g(5).

h(x)=2^x The function h is defined above. What is h(5) − h( 3) ?

Let g(x) be a function satisfying g(0)=2,g(1)=3,g(x+2)=2g(x)-g(x+1), then find g(5)