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Question
Solve the differential equation `(dy)/(dx) = (4x + y + 1)^2`.
Sum
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Solution
`(dy)/(dx) = (4x + y + 1)^2` ...(1)
Put 4x + y + 1 = u
∴ `4 + (dy)/(dx) = (du)/(dx)`
∴ `(dy)/(dx) = (du)/(dx) - 4`
∴ (1) becomes, `(du)/(dx) - 4 = u^2`
∴ `(du)/(dx) = u^2 + 4`
∴ `1/(u^2 + 4) du = dx`
Integrating both sides, we get
`int 1/(u^2 + 2^2) du = int dx`
∴ `1/2 tan^-1 (u/2) = x + c_1`
∴ `tan^-1 ((4x + y + 1)/(2)) = 2x + 2c_1`
∴ `tan^-1 ((4x + y + 1)/2) = 2x + c`, where `c = 2c_1`
This is the general solution.
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