mathstresser
Junior Member
- Joined
- Jan 28, 2006
- Messages
- 134
Find a particular solution to
\(\displaystyle \L\\ x'' + x = (sect)^2\)
using the method of variation of constants.
I don't really know what to do with this.... This is all I can come up with.
Xp= u1x1 +u2x2
Wronskian=> W
W1/W, W2/W
\(\displaystyle \L\\ (sect)^2 = 1/(cost)^2\)
\(\displaystyle \L\\ x'' + x = (sect)^2\)
using the method of variation of constants.
I don't really know what to do with this.... This is all I can come up with.
Xp= u1x1 +u2x2
Wronskian=> W
W1/W, W2/W
\(\displaystyle \L\\ (sect)^2 = 1/(cost)^2\)