Class 12

Math

Calculus

Continuity and Differentiability

Find the derivative of f given by $f(x)=sin_{−1}x$assuming it exists.

Connecting you to a tutor in 60 seconds.

Get answers to your doubts.

Find a particular solution satisfying the given condition for the following differential equation.$(1+x_{2})dxdy +2xy=4x_{2}$, given that $y=0$ when $x=0$.

Differentiate the functions with respect to x$cosx_{3}sin˙_{2}(x_{5})$

Find the general solution of each of the following differential equations:$dxdy =1+cosx1−cosx $.

The solution of the D.E. $dxdy =(x_{2}+1)−2xy $ is

Find $dxdy $, if $y+siny=cosx$

$y=x_{2}+cosx$Find a particular solution satisfying the given condition for the following differential equation.$dxdy +ytanx=2x+x_{2}tanx$, given that $y=1$ when $x=0$.

Find the general solution of each of the following differential equations:$xdxdy =y−cos_{2}(xy )$

Find the general solution for the following differential equation.$xdxdy +y=xgx$