101, The number of solutions of (x, y) which satisfy `|y| = sinx` and `y=cos^(-1)(cosx)` where `-2pileqxleq2pi`

Find the number of solutions of (x , y),which satisfy absy = sin x and y = cos^-1(cosx) , where -2pi le x le 2pi

Find the number of solutions of (x,y) which satisfy |y|=cos x and y=sin^(-1)(sin x), where |x|<=3 pi

Find the number of solutions of (x ,\ y) which satisfy |y|=cosx\ a n d\ y=sin^(-1)(sinx),\ w h e r e\ |x|lt=3pi .

The number of real solutions (x, y) , where |y| = sin x, y = cos^-1 (cosx),-2pi leq x leq 2pi is

Find the number of solution of the equation |y|=sinxand y=cos^-1 cos x where -2pilexle2pi

Find the number of solution of the equation |y|=sinxand y=cos^-1 cos x where -2pilexle2pi

The number of real solution (x,y) where |y|=sinx,y=cos^(-1)(cosx),-2pilexle2pi is

Find the number of ordered pairs of (x, y) satisfying the equation y = |sinx| and y = cos^(-1)(cosx) , where x in [-π, π]

Find the number of ordered pairs of (x, y) satisfying the equation y = |sinx| and y = cos^(-1)(cosx) , where x in [-π, π]