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 number of integral pairs (x, y) satisfying the equation 2x^(2)-3xy-2y^(2)=7 is :

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) .

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

If y= A sin x+ B cos x , then prove that (d^(2)y)/(dx^(2))+y=0 .

The total number of ordered pairs (x , y) satisfying |x|+|y|=2,sin((pix^2)/3)=1, is equal to 2 (b) 3 (c) 4 (d) 6

If y=e^(4x) + 2e^(-x) satisfies the relation y_3 + Ay_1 + By = 0 then

Solution of the equation cos^2x(dy)/(dx)-(tan2x)y=cos^4x , where |x|< pi/4 and y(pi/6)=(3sqrt(3))/8 is

If y(x) satisfies the differential equation : y'-y tan x = 2 x sec x and y (0) =0 , then :