What are the local extrema of $f(x)= x^2(x+2)$ ?

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What are the local extrema of $f(x)= x^2(x+2)$ ?

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Answer 1 · 2015-12-26T05:59:43

Minima $(0, 0)$
Maxima $(-4/3, 1 5/27)$

Explanation:

Given-

$y=x^2(x+2)$
$y=x^3+2x^2$
$dy/dx=3x^2+4x$
$(d^2y)/(dx^2)=6x+4$
$dy/dx=0=>3x^2+4x=0$
$x(3x+4)=0$
$x=0$
$3x+4=0$
$x=-4/3$
At $x=0; (d^2y)/(dx^2)=6(0)+4=4>0$

At $x=0; dy/dx=0;(d^2y)/(dx^2)>0$
Hence the function has a minima at $x=0$

At $x=0;y=(0)^2(0+2)=0$
Minima $(0, 0)$

At $x=-4/3; (d^2y)/(dx^2)=6(-4/3)+4=-4<0$
At $x=-4; dy/dx=0;(d^2y)/(dx^2)<0$

Hence the function has a maxima at $x=-4/3$

At $x=-4/3;y=(-4/3)^2(-4/3+2)=1 5/27$

Maxima $(-4/3, 1 5/27)$

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What are the local extrema of $f(x)= x^2(x+2)$ ?

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