The general solution of y" + 4y' = 8, can be written as (A) y = c1 + c2e¯2« + c3e²a + 3x (B) y= c1 + c2e¯2« + c3e²a + 4x (C) y = c1 + c2 cos 2x + c3 sin 2x + 8 (D) y = c1+ c2 Cos 2x + c3 sin 2x + 2x %3D (E) y = c + C2 cos 2x + c3 sin 2x + 3x
The general solution of y" + 4y' = 8, can be written as (A) y = c1 + c2e¯2« + c3e²a + 3x (B) y= c1 + c2e¯2« + c3e²a + 4x (C) y = c1 + c2 cos 2x + c3 sin 2x + 8 (D) y = c1+ c2 Cos 2x + c3 sin 2x + 2x %3D (E) y = c + C2 cos 2x + c3 sin 2x + 3x
Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
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Transcribed Image Text:The general solution of y" + 4y' = 8, can
%3|
be written as
(A) y = c1 + C2e-2# + C3e2 + 3x
+ c3e2¤ + 3x
(B) y = c1 + c2e¯2« + c3e2ª + 4x
(C) y= c1 + c2 cos 2x + c3 sin 2x + 8
(D) y = c1+ c2 cos 2x + c3 sin 2x + 2x
(E) y= c1+ c2 cos 2x + c3 sin 2x + 3x
D A
O C
OD
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