`(2x^2+3y^2-7)x dx-(3x^2+2y^2-8)y dy=0`

Solve the differential equation : (x^2y + x^2)dx + (xy^2 - y^2) dy = 0

If (y^(3)-2x^(2)y)dx+(2xy^(2)-x^(3))dy=0, then the value of xysqrt(y^(2)-x^(2)), is

Equation of the circle cutting orthogonal these circles x^2+y^2-2x+3y-7=0 , x^2 +y^2+5x-5y+9=0 and x^2+y^2+7x-9y+29=0 is:

The order of the differential equation 2x^2 (d^2 y)/( dx^2) -3 (dy)/( dx) + y =0 is

If the pairs of lines x^2+2x y+a y^2=0 and a x^2+2x y+y^2=0 have exactly one line in common, then the joint equation of the other two lines is given by a. 3x^2+8x y-3y^2=0 b. 3x^2+10 x y+3y^2=0 c. y^2+2x y-3x^2=0 d. x^2+2x y-3y^2=0

Solve (2xlogy)dx+(x^(2)/(y)+3y^(2))dy=0.

IF [y= (sin^-1) /sqrt(1-x^2)] show that : [(1 -x^2) (d^2y /dx^2) - 3x(dy/dx) -y =0]