A. 1/3
B. 3
C. 1/2
D. 1
x = cos θ, y = sin 5θ ==>(1-x<sup>2</sup>) (d<sup>2</sup>y/dx<sup>2</sup>) - x(dy/dx) =
The solution of x log x (dy/dx)+y=2 log x is
The solution of (x2y3+x2)+(y2x3+y2)dy=0 is
The solution of y2 dx+(3xy-1)dy=0 is
If y=(x<sup>2</sup>-1)<sup>n</sup>, then (x<sup>2</sup>-1)y<sub>n+2</sub>+2xy<sub>n+1</sub>=
The solution of excot y dx+(1-ex)cosec2ydy=0 is
The solution of (x+y+1) dy/dx=1 is
The solution of x cos(y/x)(y dx+x dy)=y sin y/x(x dy – y dx) is
A family of curves has the differential equation (xy)dy/dx = 2y2 - x2. Then the family of curves is
A= sin 780- sin 180+ cos 1320, B= cos 120+ cos 840+ cos 1320+ cos 1560 and C= (sin 750+sin 150)/ (sin 750+cos 150) then by arranging in the ascending order