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30 November, 16:50

which of the following is the solution to the differentiable equation dy/dx=e^y+x with the initial condtion y (0) = -ln (4)

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  1. 30 November, 16:58
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    y = - ln (-e^x + 5)

    Step-by-step explanation:

    I assume you mean:

    dy/dx = e^ (y + x)

    Use exponent properties:

    dy/dx = (e^y) (e^x)

    Separate the variables:

    e^ (-y) dy = e^x dx

    Integrate:

    -e^ (-y) = e^x + C

    Solve for y:

    e^ (-y) = - e^x - C

    -y = ln (-e^x - C)

    y = - ln (-e^x - C)

    Use initial condition to solve for C:

    -ln 4 = - ln (-e^0 - C)

    4 = - 1 - C

    C = - 5

    Therefore, the equation is:

    y = - ln (-e^x + 5)
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