`f(x)=(x)/(sinx ) and g(x)=(x)/(tanx)` , where ` 0 lt x le 1 ` then in the interval

If quad f(x)=(x)/(sin x) and g(x)=(x)/(tan x), where0

If f(x)=cosx+sinx and g(x)=x^(2)-1 , then g(f(x)) is injective in the interval

Let f(x)=(sinx)/x and g(x)=|x.f(x)|+||x-2|-1|. Then, in the interval (0,3pi) g(x) is :

Let f'(sinx)lt0andf''(sinx)gt0,AAx in (0,(pi)/(2)) and g(x)=f(sinx)+f(cosx), then find the interval in which g(x) is increasing and decreasing.

Let f(x) = {{:(-1,-2 le x lt 0),(x^2-1,0 le x le 2):} and g(x)=|f(x)|+f(|x|) . Then , in the interval (-2,2),g is

Let g(x)= f(x) +f'(1-x) and f''(x) lt 0 ,0 le x le 1 Then

Let f(x) be defined on [-2,2[ such that f(x)={{:(,-1,-2 le x le 0),(,x-1,0 le x le 2):} and g(x)= f(|x|)+|f(x)| . Then g(x) is differentiable in the interval.

Let f(x)=(sqrt(1+sinx)-sqrt(1-sinx))/(tanx) , x ne 0 Then lim_(x to 0) f(x) is equal to