6,7, and 8 please

MAC fg(r)). Consider h(x) = sin(2?). h(x) is a composition of two functions, where hi(r) = (fog)(s) = 4. Identify each of the following f( ) = _Sinx ) g(x) = S'( ) = 605 ( x ) g'(x) = 2x 5. Complete the following table. h' (T) '(.x) g(x) f'(g(x)) g' (x) T = -6 -12 cos(36) Cos(6 36 cos ( 36 ) - 12 r = 1 2 cos( 1) coS(1) cos ( 1 ) 2 8 cos( 16) cos( 4 ) 16 CoS( 16 ) 8 6. Find a formula for h'(x) if h(x) = sin(x?), using the functions f, g and/ or their derivatives. 7. Give the general formula for h'(1) if h(x) = f(g(a)). 8. State the general formula found in #7 in words