Class 12th

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New answer posted

a year ago

0 Follower 2 Views

V
Vishal Baghel

Contributor-Level 10

Given,   (ex+ex)dy (exex)dx=0

(ex+ex)dy= (exex)dxdy=exexex+exdx

Integrating both sides

dy=exexex+exdx {? f| (x)f (x)dx=log|x|}

y=log|ex+ex|+c is the required general solution.

New answer posted

a year ago

0 Follower 3 Views

V
Vishal Baghel

Contributor-Level 10

Given, sec2xtanydx+sec2ytanxdy=0

Dividing throughout by ' tanxtany ' we get,

sec2xtanytanxtanydx+sec2ytanxtanxtanydy=0sec2xtanxdx+sec2ytanydy=0

Integrating both sides we get,

sec2xtanxdx+sec2ytanydy=logclog|tanx|+log|tany|=logc{f|(x)f(x)dxlog|f(x)|}log|(tanx+tany)|=logc

tanxtany=±c is the required general solution.

New answer posted

a year ago

0 Follower 2 Views

A
alok kumar singh

Contributor-Level 10

102. Let y=tan1x

So,  dydx=ddxtan1x=11+x2

d2ydx2= (1+x2)ddx (1) (1)ddx (1+x2) (1+x2)2

=2x (1+x2)2

New answer posted

a year ago

0 Follower 3 Views

V
Vishal Baghel

Contributor-Level 10

Given,  dydx+y=1

dydx=1y= (y1)

By separable of variable,

dy (y1)=dx

Integrating both sides,

dy (y1)=dxlog|y1|=x+c|y1|=ex+cy1=±ex.ec

y=1+Ac where A=±ec

Is the general solution.

New answer posted

a year ago

0 Follower 2 Views

V
Vishal Baghel

Contributor-Level 10

Kindly go through the solution

New answer posted

a year ago

0 Follower 2 Views

A
alok kumar singh

Contributor-Level 10

101. Let y=e6xcos3x

So, dydx=e6xddxcos3x+cos3xddxe6x

=e6x(sin3x)ddx(3x)+cos3xe6xddx(6x)

=e6x[3sin3x+6cos3x]

d2ydx2=e6xddx[3sin3x+6cos3x]+[3sin3x+6cos3x]ddxe6x

=e6x[3cos3xddx(3x)+6(sin3x)ddx(3x)]+[3sin3x+6cos3x]e6xddx(6x)

=e6x{9cos3x18sin3x18sin3x+36cos3x}

=e6x(27cos3x36sin3x)

=9e6x(3cos3x4sin3x)

New answer posted

a year ago

0 Follower 2 Views

V
Vishal Baghel

Contributor-Level 10

The given D.E is

dydx=1cosx1+cosx

By separable of variable,

dy=1cosx1+cosxdx{cos2x=12sin2x=2sin2x=1cos2x=2sin2x2=1cosxcos2x=2cos2x1}dy=2sin2x22cos2x2dxdy=tan2x2dx

Integrating both sides,

dy=tan2x2dx{sec2x=1+tan2}y=(sec2x21)dx

y=tanx212x+c c = constant

y=2tanx2x+c is the general solution.

New answer posted

a year ago

0 Follower 4 Views

A
alok kumar singh

Contributor-Level 10

100. Let y=exsin5x

so, dydx=exddxsin5x+sin5xddxex

=excos5xddx(5x)+exsin5x

=5excos5x+exsin5x.

d2ydx2=ddx(5excos5x+exsin5x)

=5exddxcos5x+5cos5xddxex+exddxsin5x+sin5xddxex

=5exsin5xddx(5x)+5excos5x+excos5xddx(5x)+exsin5x

=25exsin5x+5excos5x+5excos5x+exsin5x

=ex(10cos5x24sin5x)

=2ex(5cos5x12sin5x)

New answer posted

a year ago

0 Follower 1 View

V
Vishal Baghel

Contributor-Level 10

The highest order derivation present in the D.E. is y, so its order is 1.

As the given D.E. is a polynomial equation in its derivative its degree is 1.

New answer posted

a year ago

0 Follower 2 Views

A
alok kumar singh

Contributor-Level 10

99. Let y=x3logx

So,  dydx=x3ddxlogx+log2.dx3dx

=x3.1x+logx3x2

=x2+logx (3x2)

d2ydx2=ddx (x2+logx3x2)

=2x+6xlogx+3x2*1x

=2x+6xlogx+3x

=5x+6xlogx

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