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

The number of ordered pairs of integers (x,y) satisfying the equation x ^2+6x+y^2 =4 is

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

2.The number of ordered pair(s) (x,y) satisfying y = 2 sinx and y = 5x² + 2x + 3 is equal to-

If x, y in [0,2pi] then find the total number of order pair (x,y) satisfying the equation sinx .cos y = 1

The number of ordered pair(s) (x, y) of real numbers satisfying the equation 1+x^(2)+2x sin(cos^(-1)y)=0 , is :

Find the number of ordered pairs of natural numbers (x, y) satisfying the equation: (xy-1)^(2) = (x+1)^(2) + (y+1)^(2)

The number of positive integral pairs (x, y) satisfying the equation x^(2) - y^(2) = 3370 is :

If x in[0,6 pi],y in[0,6 pi] then the number of ordered pair (x,y) which satisfy the equation sin^(-1)sin x+cos^(-1)cos y=(3 pi)/(2) are

The total number of ordered pairs of (x,y) satisfying the equation 13+12[tan^-1x]=24[In x]+8[e^x]+6[cos^-1y] is/are: