[" Let "f'(sin x)<0" and "f''(sin x)>0AA...

[" Let "f'(sin x)<0" and "f''(sin x)>0AA x in(0,pi/2)" and "g(x)=f(sin x)+f(cos x)" ,then find the internal "],[g(x)" is increasing and decreasing "]

Promotional Banner

Promotional Banner

Similar Questions

Explore conceptually related problems

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'(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'(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'(sin x) lt 0 and f''(sin x) gt 0 AA x in (0, pi/2) and g (x) = f (sin x) + f (cos x) , then

If f(x) =4x^2 and g(x) =f(sin x)+f(cos x), then g (23^(@)) is

Let g(x)=f(sin x)+ f(cosx), then g(x) is decreasing on:

Let f''(x) gt 0 AA x in R and let g(x)=f(x)+f(2-x) then interval of x for which g(x) is increasing is

Let f''(x) gt 0 AA x in R and let g(x)=f(x)+f(2-x) then interval of x for which g(x) is increasing is

Let g(x)=f(x)+f(1-x) and f'(x)>0AA x in(0,1) Find the intervals of increase and decrease of g(x)

Recommended Questions

[" Let "f'(sin x)<0" and "f''(sin x)>0AA x in(0,pi/2)" and "g(x)=f(sin...
Text Solution
|
Let g(x)=f(x)+f(1-x) and f^(x)>0AAx in (0,1)dot Find the intervals of ...
Text Solution
|
Statement 1: Let f(x)=sin(cos x)in[0,pi/2]dot Then f(x) is decreasing ...
Text Solution
|
Let f'(sin x) 0AA x in(0,(pi)/(2)) and g(x)=f(sin x)+f(cos x), then
Text Solution
|
Let f(x)=sin x and cg(x)={max{f(t),0 pi Then ,g(x) is
Text Solution
|
If f'(x)=k(cos x-sin x),f'(0)=3 and f((pi)/(2)) find f'(x)
Text Solution
|
If f(x)=sin x and g(x)=f(f(f,.....(f(x)))) then value of g'(0)+g''(0)+...
Text Solution
|
If f(x)=3 cos x and g(x)=sin^(2)x, the evaluate: (f+g)((pi)/(2))
Text Solution
|
"Let f(x) "=|{:(cos x" " sin x" " cos x),(cos 2x" "sin 2x" "2cos 2...
Text Solution
|