if f'(x)=[f(x)]^2, and f(0)=1, then f(6)=(1)/(n) for some integer n. What is n?

asked Jun 24, 2021 23.0k views

2 votes

, and

, then

for some integer

. What is

by Hair

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2 votes

The ODE is separable: We can write

$f'(x)=f(x)^2\implies(\mathrm df)/(\mathrm dx)=f^2\implies(\mathrm df)/(f^2)=\mathrm dx$

Integrating both sides gives

$-\frac1f=x+C$

so that

$f(0)=1\implies-1=C$

and so

$-\frac1f=x-1\implies f(x)=\frac1{1-x}$

Then
$f(6)=-\frac15$ , making
n=-5 .

PeskyPotato answered Jun 29, 2021

5.7k points

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