Total no. of orderd pairs (x,y) satisfyi...

Total no. of orderd pairs (x,y) satisfying `x(sin^2 x+ 1/x^2)=2sinx,sin^2y,` where `x in (-pi,0)uu(0,pi) and y in[0,2pi]` is/are

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Find the total no. of orderd pairs (x,y) satisfying x(sin^2 x+ 1/x^2)=2sinxsin^2y, where x in (-pi,0)uu(0,pi) and y in[0,2pi] .

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

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

Number of ordered pair (x,y) which satisfies the relation (x^(4)+1)/(8x^(2))=sin^(2)y*cos^(2) y , where y in [0,2pi]

Number of ordered pair (x,y) which satisfies the relation (x^(4)+1)/(8x^(2))=sin^(2)y*cos^(2) y , where y in [0,2pi]

Number of ordered pair (x,y) which satisfies the relation (x^(4)+1)/(8x^(2))=sin^(2)y*cos^(2) y , where y in [0,2pi]

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