Number of solutions `2^(sin(|x|))=4^(|cosx|) in [-pi,pi]` is equal to

The total number of solutions of cos x= sqrt(1- sin 2x) in [0, 2pi] is equal to

Number of roots of |sin|x||=x+|x|" in "[-2pi,2pi] , is

Find the number of solutions of sin^2x-sinx-1=0in[-2pi,2pi]

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

If 1+2sin x+3sin^(2)x+4sin^(3)x+... upto infinite terms = 4 and number of solutions of the equation in [ (-3pi)/(2), 4pi] is k. Sum of all internal angles of a k-sided regular polygon is

The number of critical points of f(x)=max{sinx,cosx},AAx in[-2pi,2pi], is

Find the number of solution of the equations 2^(cos x)=|sin x|, when x in[-2pi,2pi]

Find the number of solutions of sin^(2) x cos^(2)x=1+cos^(2)xsin^(4) x in the interval [0,2pi]

Find the number of solutions for sinxtan4x=cosx , when x in (0,pi)

sin^-1 (cosx) = pi/2 - x is valid for