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New answer posted

a year ago

0 Follower 2 Views

V
Vishal Baghel

Contributor-Level 10

The highest order derivative present in the D.E. is y|| so its order is 2.

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

New answer posted

a year ago

0 Follower 5 Views

A
alok kumar singh

Contributor-Level 10

85. Let y = (x2- 5x + 8) (x3 + 7x + 9) ____ (1)

(i) by product rule

dydx=(x25x+8)ddx(x3+7x+9)+(x3+7x+9)ddx(x25x+8)

=(x25x+8)(3x2+7)+(x3+7x+9)(2x5).

3x4 + 7x2- 15x3- 35x + 24x2 + 56 + 2x4- 5x3 + 14x2- 35x 18x-45

= 5x4- 20x3 + 45x2- 52x + 11

(ii) y=(x25x+8)(x3+7x+9)

y=x5+7x2+9x5x435x245x+8x3+56x+72

y=x55x4+15x326x2+11x+72.

dydx=5x420x3+45x252x+11.

Taking log in eqn (1)

logy=log(x25x+8)+log(x3+7x+9)

Now, Differe(iii) ntiating w r t 'x' we get,

1ydydx=1x25x+8ddx(x25x+8)+1x3+7x+9ddx(x3+7x+9).

1ydydx=2x5x25x+8+3x2+7x3+7x+9

dydx=y[(2x5)(x3+7x+9)+(3x2+7)(x25x+8)(x25x+8)(x3+7x+9).]

=yy 2x4 + 14x4 + 18x- 35x- 45 + 3x1- 15x3 + 24x2 + 7x2- 35x + 56]

{?eqn(1)}.

dydx = 5x4- 20x3 + 45x2- 52x + 11

We observed that all the methods give the same result.

New answer posted

a year ago

0 Follower 3 Views

V
Vishal Baghel

Contributor-Level 10

The given order derivative 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 1 View

V
Vishal Baghel

Contributor-Level 10

The highest order present in the D.E. is y||| so its order is 3.

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

New answer posted

a year ago

0 Follower 4 Views

A
alok kumar singh

Contributor-Level 10

84. Given, f(x) = (1 + x)(1 + x 4)(1 + x 8)

Taking log,

logf(x) = log (1 + x) + log (1 + x) + log (1 + x 4) + log (1 + x 8)

Now, Differentiating w r t 'x' we get,

1f(x)f(x)=11+xddx(1+x)+11+x2ddx(1+x2)+11+x4ddx(1+x4)+11+x8d(1+x8)dx

f(x)=f(x){11+x+2x1+x2+4x31+x4+8x71+x8}.

f(x)=(1+x)(1+x2)(1+x4)(1+x8){11+x+2x1+x2+4x31+x4+8x71+x8}

Putting x = 1

f'(x) = (1 +1)(1 + 14)(1 +18) {11+1+2*11+12+4*131+14+8*171+18}

=2*2*2+2{12+22+42+82}

=16*{152}=8*15=120.

New answer posted

a year ago

0 Follower 3 Views

V
Vishal Baghel

Contributor-Level 10

The highest order derivative present in the D.E. is y||| so its order is 3.

As the given D.E. is a polynomial equation in its derivation, its degree is 2.

New answer posted

a year ago

0 Follower 1 View

V
Vishal Baghel

Contributor-Level 10

d4ydx4 As the given D.E. is a polynomial equation in its derivative, its degree is 1.

New answer posted

a year ago

0 Follower 9 Views

V
Vishal Baghel

Contributor-Level 10

d4ydx4 As the given D.E. is not a polynomial equation in its derivative, its degree is not defined.

New answer posted

a year ago

0 Follower 2 Views

A
alok kumar singh

Contributor-Level 10

83. Given, xy = ex-y.

Taking log,

log (x + y) = log (ex-y).

=logx + log y = (x-y) log e.

= logx +log y = x -y {Q log e = 1}

Differentiating w r t 'x' we get,

1x+1ydydx=1dydx

1ydydx+dydx=112

dydx (1y+1)= (x1x)

dydx (1+yy)= (x1x)

dydx=y (x1)x (1+y)

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 d2sdt2 so its order is 2 .

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

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