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Question
Find the particular solution of the differential equation:
`xy(dy)/(dx) = (x + 2) (y + 2)`, given that y(1) = −1.
Sum
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Solution
`xy(dy)/(dx) = (x + 2) (y + 2)`
`y/(y + 2)dy = (x + 2)/xdx`
`int y/(y + 2)dy = int (1 + 2/x)dx`
`int (1 - 2/(y + 2))dy = x + 2 log |x| + C`
y − 2 log |y + 2| = x + 2 log |x| + C
Given y(1) = −1:
−1 − 2 log 1 = 1 + 2 log 1 + C
C = −2
∴ y − 2 log |y + 2| = x + 2 log |x| − 2
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