Class 12

Math

Calculus

Differential Equations

Find the general solution of the differential equations $dxdy =sin_{−1}x$

Connecting you to a tutor in 60 seconds.

Get answers to your doubts.

The solution of the differential equation ${1+x(x_{2}+y_{2}) }dx+{(x_{2}+y_{2}) −1}ydy=0$ is equal to

The general solution of the differential equation dydx−tany1+x=(1+x)exsecy is

Form the differential equation of all concentric circles at the origin.

Show that the differential equation $y_{3}dy+(x+y_{2})dx=0$ can be reduced to a homogeneous equation.

if $a,b$ are two positive numbers such that $f(a+x)=b+[b_{3}+1−3b_{2}f(x)+3b{f(x)}_{2}−{f(x)}_{3}]_{31}$ for all real $x$, then prove that $f(x)$ is peroidic and find its peroid?

The equation of a curve passing through (1,0) for which the product of the abscissa of a point $P$ and the intercept made by a normal at $P$ on the x-axis equal twice the square of the radius vector of the point $P$ is

The differential equation of the curve for which the initial ordinate of any tangent is equal to the corresponding subnormal (a) is linear (b) is homogeneous of second degree (c) has separable variables (d) is of second order

The differential equation of the curve xc−1+yc+1=1 is given by