What is a particular solution to the differential equation \frac{du}{dt}=\frac{2t+\sec^{2}t}{2u}

Bradley Barron

Bradley Barron

Answered question

2022-04-17

What is a particular solution to the differential equation dudt=2t+sec2t2u and u(0)=-5?

Answer & Explanation

gil001q4wq

gil001q4wq

Beginner2022-04-18Added 11 answers

dudt=2t+sec2t2u
2ududt=2t+sec2t
du2u=dt2t+sec2t
u2=t2+tant+C
(5)2=2(0)+tan(0)+C
C=25
u2=t2+tant+25
gsmckibbenx7ga

gsmckibbenx7ga

Beginner2022-04-19Added 17 answers

Start by multiplying both sides by 2u and dt to separate the differential equation:
2udu=2t+sec2tdt
These integrals aren't too complicated, but if you have any questions on them do not be afraid to ask. They evaluate to:
u2+C=t2+C+tant+C
We can combine all the Cs to make one general constant:
u2=t2+tant+C
We are given the initial condition u(0)=-5 so:
(5)2=(0)2+tan(0)+C
25=C
Thus the solution is u2=t2+tant+25

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