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Solve the equation (dy)/(dx)=1/x=(e^y)/(...

Solve the equation `(dy)/(dx)=1/x=(e^y)/(x^2)`

Text Solution

Verified by Experts

The correct Answer is:
`e^(-y)/(x) = 1/(2x^(2))+c`
Dividing by `e^(y)`, we get
`e^(-y)(dy)/(dx)+e^(-y)1/x=1/x^(2)`
Putting `e^(-y)=v`, we get
`-(dv)/(dx)+v/x=1/x^(2)`
or `(dv)/(dx) -1/xv=-1/x^(2)`(linear)
I.F. `e^(-int(1//x)dx)=e^(-logx)=1//x`
Therefore, solution is
`v/x = int-1/x^(2)1/xdx+c=x^(-2)/2+c`
`therefore (e^(-y))/x=x^(-2)/2+c`
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Knowledge Check

  • Solution of the equation (dy)/(dx)=e^(x-y)(1-e^y) is

    A
    `e^y=1+c/e^x`
    B
    `e^y=e^x-1+ce^(e^x)`
    C
    `e^x = e^y + 1 + ce^(e^y)`
    D
    None of these

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