Class 12

Math

Calculus

Differential Equations

Solve the following differential equation:$3e_{x}tanydx+(2−e_{x})sec_{2}ydy=0,$given that when $x=0,y=4π ˙$

Connecting you to a tutor in 60 seconds.

Get answers to your doubts.

Find the general solution of the differential equations $x_{5}dxdy =−y_{5}$

Form the differential equation of the family of hyperbola having foci on x-axis and center at the origin.

Find a particular solution of the differential equation $dydx +ycotx=1(x=0)4xcosecx$$(x=0)$, given that $y=0$when $x=2π $

Determine order and degree (if defined) of differential equations given$(dtds )_{4}+3sdt_{2}d_{2}s =0$

Show that the general solution of the differential equation $dxdy +x_{2}+x+1y_{2}+y+1 =0$ is given by $(x+y+1)=A(1−x−y−2xy)$ where A is a parameter

The differential equations , find the particular solution satisfying the given condition:$2xy+y_{2}−2x_{2}dxdy =0;y=2$when x = 1

Find a particular solution of the differential equation $(x+1)dxdy =2e_{−y}−1$given that $y=0$when$x=0$.

Find the general solution of the differential equations:$(x+3y_{2})dydx =y(y>0)$