What is a solution to the differential equation $dy/dx=2yx+yx^2$ ?

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What is a solution to the differential equation $dy/dx=2yx+yx^2$ ?

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Answer 1 · 2016-07-03T21:40:16

$=alpha e ^(x^2(1 + x/3) )$

Explanation:

$dy/dx=2yx+yx^2$

separate it, starting with....

$dy/dx=y(2x+x^2)$

$1/y dy/dx=(2x+x^2)$

you might recognise $1/y dy/dx$ as $(ln y)'$ and so the integration can be done pretty infomally, but if not....we can integrate both sides as follows.....starting again with the last equation:

$1/y dy/dx=(2x+x^2)$

$1/y dy=(2x+x^2) \ dx$

$int dy qquad 1/y = int dx qquad (2x+x^2)$

$ln y = x^2 + x^3/3 + C$

$= x^2(1 + x/3) + C$

$implies y = e^ (x^2(1 + x/3) + C)$

$= e^ (x^2(1 + x/3) )*e^(C)$

$=alpha e ^(x^2(1 + x/3) )$

where $alpha = const = e^C$

Answer 2 · 2016-07-03T21:42:15

$y = C_0 e^{x^2 + 1/3 x^3}$

Explanation:

Grouping variables

$(dy)/y = (2x+x^2)dx$

integrating both sides

$log_e y = x^2+1/3x^3 + C$

Finally

$y = C_0 e^{x^2 + 1/3 x^3}$

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What is a solution to the differential equation $dy/dx=2yx+yx^2$ ?

2 Answers

Explanation:

Explanation:

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Science

Math

Humanities

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What is a solution to the differential equation dy/dx=2yx+yx^2dy/dx=2yx+yx^2?

2 Answers

Explanation:

Explanation:

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What is a solution to the differential equation $dy/dx=2yx+yx^2$ ?