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]`

Find the number solution are ordered pair (x,y) of the equation 2^(sec^(2)x)+2^("cosec"^(2)y)=2cos^(2)x(1-cos^(2)y) in [0,2pi]

The number of pairs (x,y) which will satisfy the equation x^2-x y+y^2=4(x+y-4) is

The ordered pair (5,2) belongs to the relation R= {(x,y): y= x-5, x, y in Z}

Find all number of pairs x,y that satisfy the equation tan^4 x + tan^(4)y+2 cot^(2)x * cot^(2) y=3+ sin^(2)(x+y) .

Value of x and y satisfying the equation sin^(7)y=|x^(3)-x^(2)-9x+9|+|x^(3)-4x-x^(2)+4|+sec^(2)2y+cos^(4)y are

Find all the pairs of x,y that satisfy the equation cosx+cosy+cos(x+y)=-3/2

If y=5 cos x-3 sin x , prove that (d^(2)y)/(dx^(2)) + y= 0

The number of values of y in [-2pi,2pi] satisfying the equation abs(sin2x)+abs(cos2x)=abs(siny) is

If y= sin (sin x) then show that, (d^(2)y)/(dx^(2)) + (tan x) (dy)/(dx) + y cos^(2)x = 0