If `|cosec x|=(5pi)/(4)+(x)/(2)AA x in(-2pi,2pi)`, then the number of solutions are

If log_(0.5) sin x=1-log_(0.5) cos x, then the number of solutions of x in[-2pi,2pi] is

Assertion (A) : cos x = (-1)/(2) and 0 lt x lt 2pi, "then the solutions are x" = (2pi)/(3), (4pi)/(3) . Reason (R ) : cos is negative in the first and fourth quadrant only

If sin^(-1)""(x)/(5)+cosec^(-1)""(5)/(4)=(pi)/(2), then the value of x is

If 0lt=xlt=2pia n d|cosx|lt=sinx , then then (a) set of all values of x is [pi/4,(3pi)/4] (b) the number of solutions that are integral nultiple of pi/4 is one (c) the number of the largest and the smallest solution is pi (d) the set of all values of x is x in [pi/4,pi/2]uu[pi/2,(3pi)/4]

If cos(x+pi/3)+cos x=a has real solutions, then (a) number of integral values of a are 3 (b) sum of number of integral values of a is 0 (c) when a=1 , number of solutions for x in [0,2pi] are 3 (d) when a=1, number of solutions for x in [0,2pi] are 2

Solve cos 2x=|sin x|, x in (-pi/2, pi) .

Solve cos 2x=|sin x|, x in (-pi/2, pi) .

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