NCERT Solutions for Chapter 9 Differential Equations Class 12 Maths Exercise 9.1

Class 12 Maths NCERT Solutions for Chapter 9 Differential Equations Exercise 9.1

Differential Equations Exercise 9.1 Solutions

1. Determine order and degree (If defined) of differential equation d⁴y /dx⁴ + sin(y')  = 0 

Solution

d⁴y /dx⁴ + sin(y''')  = 0 
⇒ y''' + sin(y''') = 0 
The highest order derivative present in the differential equation is y''''. Therefore, its order is four. 
The given differential equation is not a polynomial equation in its derivatives. Hence, its degree is not defined.

2. Determine order and degree(if defined) of differential equation y' + 5y = 0

Solution

The given differential equation is : 
y' + 5y = 0 
The highest order derivative present in the differential equation is y' . Therefore, its order is one. 
It is a polynomial equation in y'. The highest power raised to y' is 1. Hence, its degree is one.

3. Determine order and degree (if defined of differential equation (ds/dt)⁴ + 3s d²s/dt² = 0 

Solution

The highest order derivative present in the given differential equation is d²s/dt². Therefore, its order is two . 

It is a polynomial equation in d²s/dt²  and ds/dt. The power raised to d²s/dt² is 1. 

Hence, its degree is one. 

4. Determine order and degree (if defined) of differential equation d²y/(ds²)² + cos (dy/dx) = 0 

Solution

The highest order derivative present in the given differential equation is d² y/dx². Therefore, its order is 2. 
The given differential equation is not a polynomial equation in its derivatives. Hence, its degree is not defined. 

5. Determine order and degree (if defined) of differential equation d² y/dx² = cos 3x + sin 3x 

Solution

d²y/dx² = cos 3x + sin 3x 
⇒ d²y/dx² - cos 3x - sin 3x = 0 
The highest order derivative present in the differential equation is d²y/dx² . Therefore, its order is two. 

It is a polynomial equation in d² y/dx² and the power raised to d²y/dx² is 1. 

Hence, its degree is one. 

6. Determine order and degree (if defined) of differential equation 

(y''') + (y'')³ + (y')⁴ + y⁵ = 0

Solution

(y''') + (y'')³ + (y')⁴ + y⁵ = 0 
The highest order derivative present in the differential equation is y'''. Therefore, its order is three. 

The given differential equation is a polynomial equation in y''' , y'' , and y' . 
The highest power raised to y''' is 2. Hence, its degree is 2. 

7. Determine order and degree(if defined) of differential equation y′′′ + 2y″ + y′ = 0

Solution

y′′′ + 2y″ + y′ = 0
The highest order derivative present in the differential equation is y'''. Therefore, its order is three. 

It is a polynomial equation in y''', y'' and y' . The highest power raised to y''' is 1. Hence, its degree is 1. 

8. Determine order and degree(if defined) of differential equation y′ + y = e^x  .    

Solution

y′ + y = e^x 
⇒ y' + y - e^x  = 0 
The highest order derivative present in the differential equation is y'. Therefore, its order is one. 
The given differential equation is a polynomial equation in y' and the highest power raised to y' is one. Hence, its degree is one. 

9. Determine order and degree (if defined) of differential equation y'' + (y')² + 2y = 0  

Solution

y'' + (y')² + 2y = 0  
The highest order derivative present in the differential equation is y''. Therefore, its order is two. 

The given differential equation is a polynomial equation in y'' and y' and the highest power raised to y'' is one. 

Hence, its degree is one . 

10. Determine order and degree(if defined) of differential equation y″ + 2y′ + sin y = 0

Solution

y'' + 2y' + sin y = 0 
The highest order derivative present in the differential equation is y''. Therefore, its order is two. 

This is a polynomial equation in y'' and y' and the highest power raised to y'' is one. 
Hence, its degree is one. 

11. The degree of the differential equation 
(d²y/dx² )³ + (dy/dx)² + sin(dy/dx) + 1 = 0 

(A) 3 
(B) 2 
(C) 1 
(D) not defined 

Solution

The given differential equation is not a polynomial equation in its derivatives. Therefore, its degree is not defined. 

Hence, the correct answer is D.

12. The order of the differential equation  2x²(d²y/dx²) + 3(dy/dx) + y = 0 is 

(A) 2 
(B) 1 
(C) 0 
(D) not defined 

Solution

The highest order derivative present in the given differential equation is d² y/dx² . Therefore, its order is two. 

Hence, the correct answer is A.