What is a solution to the differential equation $(dy/dx) +5y = 9$ ?

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What is a solution to the differential equation $(dy/dx) +5y = 9$ ?

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Answer 1 · 2016-11-21T23:39:16

$y = 9/5 + Be^(-5x)$

Explanation:

This is a First Order Separable Differential Equation.

We can isolate the variables as follows;

$dy/dx + 5y = 9$
$:. dy/dx = 9 - 5y$

Separating the variable gives us:

$:. int 1/(9 - 5y)dy = int dx$
$:. -int 1/(5y-9)dy = int dx$

Integrating gives us:

$-1/5 ln|5y-9| = x + C$
$:. ln|5y-9| = -5x -5C$
$:. 5y-9 = e^(-5x -5C)$
$:. 5y-9 = e^(-5x)e^( -5C)$
$:. 5y-9 = Ae^(-5x)$
$:. 5y = 9 + A/5e^(-5x)$
$:. y = 9/5 + Be^(-5x)$

Verification of Solution:

$y = 9/5 + Be^(-5x)$
$y = -5Be^(-5x)$

So, $dy/dx + 5y = -5Be^(-5x) + 5{9/5 + Be^(-5x)}$
$:. dy/dx + 5y = -5Be^(-5x) + 9 + 5Be^(-5x)$
$:. dy/dx + 5y = 9$ QED

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What is a solution to the differential equation $(dy/dx) +5y = 9$ ?

1 Answer

Explanation:

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What is a solution to the differential equation $(dy/dx) +5y = 9$ ?