Question

3.
The number of arbitrary constants in the
particular solution of a differential equation
of 4th order is
(A)5
(B) 0
(C) 4.
(D) None of these​

Answer 1

Answer:

i think the answer is (c) 4

Answer 2

Answer:

4

Step-by-step explanation:

Let the differential equation of 4th order is

$\frac{d^{4}y }{dx^{4} }=f(x)$ ......Eq (1)

Here f(x) is denoted as a function of x.

Hence, to get the solution of this above equation we have to integrate 4 times the equation with respect to x. So, there will be 4 integration constant in the general solution.

Therefore, in the particular solution, there will be 4 arbitrary constants and option (c) will be the correct answer.(Answer)