The discussion focuses on solving the integral \(5 \int e^{\frac{t}{2}} \sin(2t) \, dt\) using integration by parts and algebraic manipulation. Participants suggest letting \(u = \sin(2t)\) and \(dv = e^{\frac{t}{2}} dt\), leading to a recursive relationship involving the integral itself. The final expression derived is \(I = 10 e^{\frac{t}{2}} \sin(2t) - 40 e^{\frac{t}{2}} \cos(2t) - 16 I\), which simplifies to \(I = \frac{10}{17} \sin(2t) e^{\frac{t}{2}} - \frac{40}{17} e^{\frac{t}{2}} \cos(2t)\). This approach highlights the importance of recognizing patterns in integrals and using exponential forms for trigonometric functions.
PREREQUISITESStudents studying calculus, mathematicians focusing on integral calculus, and anyone looking to improve their skills in solving complex integrals involving exponential and trigonometric functions.
I don't know how, or I would of already done it.vela said:That's what you want to do, but you forgot the overall factor of 5 on the righthand side when you integrated by parts. So fix that first.
vela said:You don't know how to multiply the righthand side by 5?
genericusrnme said:just skimming over, I see it hasn't been suggested to use the exponential form of Sin(2t)
Any time I see an integral over a Cos or a Sin I find that it takes me a lot less time just to use the fact that
Sin(at) = \frac{e^{i\ a\ t} - e^{-i\ a\ t}}{2\ i}
Then you end up with two easy integrals of exopnents which you can then turn back into trig functions after everything has been done.
That might just be me though, most other people I know prefer u substitution.
Good! (But you have a sign error. The cosine term should be negative.)MathWarrior said:giving
5 \int e^{\frac{t}{2}}sin(2t) = (5)2sin(2t)e^{\frac{t}{2}}+(5)8cos(2t)e^{\frac{t}{2}} -16(5)\int e^{\frac{t}{2}}sin(2t)
which turns into
5 \int e^{\frac{t}{2}}sin(2t) = 10sin(2t)e^{\frac{t}{2}}+40cos(2t)e^{\frac{t}{2}} -80\int e^{\frac{t}{2}}sin(2t)
?