Let f:[0,00)`rarr`[0,00)and g:[0,00)`rarr`[0,00) be non increasing and non decreasing functions respectively and h(x) =g(f(x)).
If h(0)=0 .Then show h(x) is always identically zero.

Let f:[0,oo)rarr[0,oo) and g:[0,oo)rarr[0,oo) be non-increasing and non-decreasing functions,respectively,and h(x)=g(f(x)) If f and g are differentiable functions,h(x)=g(f(x)). If f and g are differentiable for all points in their respective domains and h(0)=0, then show h(x) is always, identically zero.

Let f (x ) and g(x) be increasing and decreasing functions respectively from [0,oo) "to" [ 0 , oo) Let h (x) = fog (x) If h(0) =0 then h(x) is

Let f and g be increasing and decreasing functions,respectively,from [0,oo]to[0,oo] Let h(x)=f(g(x)). If h(0)=0, then h(x)-h(1) is always zero (b) always negative always positive (d) strictly increasing none of these

If f:[1,10]rarr[1,10] is a non-decreasing function and g:[1,10]rarr[1,10] is a non- decreasing function.Let h(x)=f(g(x)) with h(1)=1, then h(2)

Let f:[0, infty) to [0, infty) and g: [0, infty) to [0, infty) be two functions such that f is non-increasing and g is non-decreasing. Let h(x) = g(f(x)) AA x in [0, infty) . If h(0) =0 , then h(2020) is equal to

If f'(0)=0 and f(x) is a differentiable and increasing function,then lim_(x rarr0)(x*f'(x^(2)))/(f'(x))

A =[[0,0],[0,0]] and B=[[1,0],[0,2]]

If f(x)={[(1)/(x),;x!=00,;x=0, then

If f(x)={(x^(2))/(|x|),x!=0,0,x=0 then

Let {:A=[(a,0,0),(0,a,0),(0,0,a)]:} , then A^n is equal to