If `f(x) = |cos x|`, then `f'((pi)/(4))` is equal to …… `0 lt x lt (pi)/(2)`

If f(x)= |cos x- sin x| , then f'((pi)/(3)) is equal to …….

If f(x)=|cosx-sinx| , then f'(pi/4) is equal to

If f(x)=|x|^(|sinx|) , then f'((pi)/(4)) equals

If f(x) = |cos x- sin x| then find f'((pi)/(6))

f(x)= |(sin x,cos x),(tan x,cot x)| then f'((pi)/(4)) = …….

(d)/(dx) ( sqrt(x sin x)) = …… (0 lt x lt pi)

f(x)= {(-4 sin x + cos x",",x le - (pi)/(2)),(a sin x + b",",-(pi)/(2) lt x lt (pi)/(2)),(cos x + 2",",(pi)/(2) le x):} . If f(x) is continuous for x in R , then find the value of a and b.

Prove that the function f given by f (x) = log |cos x| is decreasing on (0,(pi)/(2)) and increasing on ((3pi)/(2) ,2pi) .