1. Math
  2. Advanced Math
  3. find the general solution to each linear differential equation...

Question: find the general solution to each linear differential equation...

Question details

. Find the general solution to each linear differential equation in two ways: (i) multiply by an integrating factor (t) and integrate, and (ii) apply formula (2.7).

Theorem: A first order linear equation (2.6) with p, f continuous on an interval I has solutions on I y=교 μ(t)f(t)dt where μ(t)-el p(t)dt μ(t) , (2.7)

1. Find the general solution to each linear differential equation in two ways: (i) multiply by an integrating factor u(t) and integrate, and (ii) apply formula (2.7) t dt dy dt (b) V + tan()y- cos?() (c) tay+2y = l-t +12 dt

Solution by an expert tutor
Blurred Solution
This question has been solved
Subscribe to see this solution