Class 12

Math

Calculus

Differential Equations

Find the general solution of the differential equations y log y dx – x dy = 0

Connecting you to a tutor in 60 seconds.

Get answers to your doubts.

The solution of the differential equation{1+x(x2+y2)−−−−−−−−√}dx+{(x2+y2)−−−−−−−−√−1}ydy=0 is

Find the equation of the curve passing through the origin if the middle point of the segment of its normal from any point of the curve to the x-axis lies on the parabola $2y_{2}=x$

The solution of $ye_{−yx}dx−(xe_{(−yx)}+y_{3})dy=0$ is

The general solution the differential equationdydx−tany1+x=(1+xe)xsecy is

Find the order and degree (if defined) of the equation: $dx_{2}d_{2}y ={1+(dxdy )_{4}}_{35}$

A function y=f(x) satisfies the differential equation dydx−y=cosx−sinx with initial condition that y is bounded when x→∞. The area enclosed by y=f(x),y=cosx and the y-axis is

Solve $dxdy =x+2y−32x−y+1 $

The degree and order respectively of the differential equation are dydx=1x+y+1.