Direction: The complete solution of the ordinary differential equation
| + p | + qy = 0 is | |||
| dx2 | dx |
y = c1e-x + c2e-3x
-
Then, p and q are
-
- p = 3, q = 3
- p = 3, q = 4
- p = 4, q = 3
- p = 4, q = 4
- p = 3, q = 3
Correct Option: C
| + p | + qy = 0 | |||
| dx2 | dx |
D2 + pD + q = 0
It's solutions is y = c1e-x + c2e-3x
⇒ m = –1, n = –3
If m and n are two roots of the above equation, then
m + n = –p,
⇒ –1 – 3 = –p,
⇒ p = 4
and mn = q,
⇒ (–1) (–3) = q,
⇒ q = 3
