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

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

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

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

Let f and g be inceasing and decreasing function respectively from [0,oo) to [0,oo) , let h(x)=f(g(x)) . If h(0)=0, then h(x)-h(1) is

Let f:[0,,∞) rarr [0,,∞)and g:[0,,∞) rarr [0,,∞) 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.

STATEMENT-1: Let f(x) and g(x) be two decreasing function then f(g(x)) must be an increasing function . and STATEMENT-2 : f(g(2)) gt f(g(1)) , where f and g are two decreasing function .

STATEMENT-1: Let f(x) and g(s) be two decreasing function then f(g(x)) must be an increasing function . and STATEMENT-2 : f(g(2)) gt f(g(1)) , where f and g are two decreasing function .

f:RrarrR is a function defined by f(x)=10x-7. If g=f^(-1) then g(x)=