Ask Question
21 July, 03:03

the resquest of the y'+6y=e^4t, y (0) = 2

+2
Answers (1)
  1. 21 July, 05:00
    0
    This is a linear differential equation of first order. Solve this by integrating the coefficient of the y term and then raising e to the integrated coefficient to find the integrating factor, i. e. the integrating factor for this problem is e^ (6x).

    Multiplying both sides of the equation by the integrating factor:

    (y') e^ (6x) + 6ye^ (6x) = e^ (12x)

    The left side is the derivative of ye^ (6x), hence

    d/dx[ye^ (6x) ] = e^ (12x)

    Integrating

    ye^ (6x) = (1/12) e^ (12x) + c where c is a constant

    y = (1/12) e^ (6x) + ce^ (-6x)

    Use the initial condition y (0) = - 8 to find c:

    -8 = (1/12) + c

    c=-97/12

    Hence

    y = (1/12) e^ (6x) - (97/12) e^ (-6x)
Know the Answer?
Not Sure About the Answer?
Find an answer to your question ✅ “the resquest of the y'+6y=e^4t, y (0) = 2 ...” in 📘 Mathematics if you're in doubt about the correctness of the answers or there's no answer, then try to use the smart search and find answers to the similar questions.
Search for Other Answers