[" Total humber of codeded paixs "(x,y)" satisfying "1y1=cos x],[" and "y=sin-1(sin x)" whex "x in[-2 pi,3 pi]," is "]

The total number of ordered pairs (x, y) satisfying |y|=cosx and y=sin^(-1)(sinx) , where x in [-2pi, 3pi] is equal to :

The total number of ordered pairs (x, y) satisfying |y|=cosx and y=sin^(-1)(sinx) , where x in [-2pi, 3pi] is equal to :

Total number of ordered pairs (x,y) satisfying Iyl=cos x and y=sin^(-1)(sin x) where |x|<=3 pi is equal to

Total number of ordered pairs (x, y) satisfying |y| = cos x and y = sin^(-1)(sin x) where |x| le 3 pi, is equal to :

Total number of ordered pairs (x, y) satisfying |y| = cos x and y = sin^(-1) (sin x) where |x| leq3pi is equal to

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

The total number of ordered pairs (x,y) satisfying |x|+|y|=4, sin((pi)x^(2)//3)=1 is equal to

The total number of ordered pair(x,y) satisfying |x|+|y|=4,sin((pi x^(2))/(3))=1 is equal to

Find the number of ordered pairs (x,y) satisfying the equations sin^(-1)x+sin^(-1)y=(2pi)/3 and cos^(-1)x-cos^(-1)y=-(pi)/3