Let f be a twice differentiable function such that
`f''(x)=-f(x)" and "f'(x)=g(x)."If "h'(x)=[f(x)]^(2)+[g(x)]^(2),`
`h(a)=8" and "h(0)=2," then "h(2)=`

Let f be a twice differentiable function such that f''(x)=-f(x)" and "f'(x)=g(x)."If "h'(x)=[f(x)]^(2)+[g(x)]^(2), h(1)=8" and "h(0)=2," then "h(2)=

Let f be a twice differentiable function such that f''(x)=-f(x), and f'(x)=g(x),h(x)=[f(x)]^(2)+[g(x)]^(2) Find h(10) if h(5)=11

STATEMENT - 1 : Let f be a twice differentiable function such that f'(x) = g(x) and f''(x) = - f (x) . If h'(x) = [f(x)]^(2) + [g (x)]^(2) , h(1) = 8 and h (0) =2 Rightarrow h(2) =14 and STATEMENT - 2 : h''(x)=0

STATEMENT - 1 : Let f be a twice differentiable function such that f'(x) = g(x) and f''(x) = - f (x) . If h'(x) = [f(x)]^(2) + [g (x)]^(2) , h(1) = 8 and h (0) =2 Rightarrow h(2) =14 and STATEMENT - 2 : h''(x)=0

Let f be a twice differentiable function such that f"(x) = -f(x) , and f'(x) = g(x) , h(x)=[f(x)]^2+[g(x)]^2 Find h(10), if h(5) = 11

Let f be twice differentiable function such that f^('')(x) = -f(x) and f^(')(x) = g(x) . Also h(x) = [f(x)]^(2) + [g(x)]^(2). If h(4) = 7, then h(7) =

Let f be twice differentiable function such that f''(x)=-f(x) and f'(x)=g(x), h(x)={f(x)}^(2)+{g(x)}^(2) . If h(5) = 11, then h(10) is equal to :