y' = (1 − 2x) y^2

Yandel Hunter

Yandel Hunter

Answered question

2022-02-10

y' = (1 − 2x) y^2

Answer & Explanation

sigcinweq0s

sigcinweq0s

Beginner2022-02-11Added 19 answers

Divide differential equation with y2 to get classic separable equation.
This is permissible for all yq0
Integrate both sides with respect to x
Mind the chain rule and notice that integration of the left side can be written simply as integration with respect to y
1y2,dy=(12x),dx
1y+C1=xx2+C2
1y=x2x+C1C2
Since C1​ and C2​ are constants C1C2 is also a constant.
Call it C
General solution in implicit form is
1y=x2x+C
General solution in explicit form is
1x2x+C
Use initial condition to calculate constant C
y(0)=161020+C=16C=6
Therefore particular solution is
Solution is not defined when x2x6=0, that is solution is not defined for x=2,3
Solution is therefore well defined on intervals <,2>,<2,3> and <3,+>
Since solution curve must pass trough point (0,d16) and 0<2,3> we see that this solution is defined on interval <2,3>

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