Question: Find the solution of y''+9y=9sec
2(3t) 0<t< 𝞹/6
We first find the homogenous solution of y''+9y=0
r
2+9=0
Then r
1=3i and r
2=-3i
Yc(t)=C
1y
1(t)+C
2y
2(t)
=C
1cos3t+C
2sin3t
W=y1 × y2' - y2 × y1' = cos3t×cos3t-sin3t×(-sin3t)=3
Let Yp(t)= 𝝁1y1+ 𝝁2y2
𝝁1=-∫ (sin3t × 9sec
2(3t))/3 dt
=- ∫3sin3t × [1/cos
2(3t)] dt
=-3 ∫(sec3t × tan3t)dt
= -sec3t
Therefore 𝝁1 = -sec3t
𝝁2 =∫(cos3t × 9sec
2(3t))/3 dt
=∫3 cost3t × (1/cos
2(3t)dt
= ln⎮sec3t+tant3t⎮
Therefore 𝝁2 = ln⎮sec3t+tan3t⎮
Yp(t)= 𝝁1y1+ 𝝁2y2
=cos3t(-sec3t)+sin3t × ln⎮sec3t+tan3t⎮
Y(t)=Yc(t)+Yp(t)
=C
1cos3t+C
2sin3t+cos3t(-sec3t)+sin3t ln⎮sec3t+tan3t⎮
