For each of the differential equations given in question, find the general solution:

Mathematics Part-II

Book: Mathematics Part-II

Chapter: 9. Differential Equations

Subject: Maths - Class 12^th

Q. No. 12 of Exercise 9.6

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12

For each of the differential equations given in question, find the general solution:

It is given that

This is equation in the form of (where, p = and Q = 3y )

Now, I.F. =

Thus, the solution of the given differential equation is given by the relation:

x(I.F.) =

⇒ x = 3y² + Cy

Therefore, the required general solution of the given differential equation is x = 3y² + Cy.

12

Chapter Exercises

Exercise 9.1

Exercise 9.2

Exercise 9.3

Exercise 9.4

Exercise 9.5

Exercise 9.6

Miscellaneous Exercise

1

For each of the differential equations given in question, find the general solution:

2

For each of the differential equations given in question, find the general solution:

3

For each of the differential equations given in question, find the general solution:

4

For each of the differential equations given in question, find the general solution:

5

For each of the differential equations given in question, find the general solution:

6

For each of the differential equations given in question, find the general solution:

7

For each of the differential equations given in question, find the general solution:

8

For each of the differential equations given in question, find the general solution:
(1 + x²)dy + 2xy dx = cot x dx (x ≠ 0)

9

For each of the differential equations given in question, find the general solution:

10

For each of the differential equations given in question, find the general solution:

11

For each of the differential equations given in question, find the general solution:
y dx + (x – y²)dy = 0

12

For each of the differential equations given in question, find the general solution:

13

For each of the differential equations given in question, find a particular solution satisfying the given condition:

14

For each of the differential equations given in question, find a particular solution satisfying the given condition:

15

For each of the differential equations given in question, find a particular solution satisfying the given condition:

16

Find the equation of a curve passing through the origin given that the slope of the tangent to the curve at any point (x, y) is equal to the sum of the coordinates of the point.

17

Find the equation of a curve passing through the point (0, 2) given that the sum of the coordinates of any point on the curve exceeds the magnitude of the slope of the tangent to the curve at that point by 5.

18

The Integrating Factor of the differential equation is

19

The Integrating Factor of the differential equation
is