How do you find the important points to graph $f(x)= -x^2-4x$ ?

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Answer 1 · 2018-01-18T17:13:48

Check below for detail examination of the function.

$f(x)=-x^2-4x$ ,
$D_f=RR$

$f(x)=0 <=> -x^2-4x=0 <=> x^2+4x=0 <=> x(x+4)=0 <=> (x=0, x=-4)$

$f'(x)=-2x-4=-2(x+2)$

$f'(x)=0$ $<=> x=-2$

$f''(x)=-2<0$
$x$ $in$ $RR$

$f$ has global maximum at $x_0=-2$ , $f(-2)=4$

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$lim_(xrarr-oo)f(x)=lim_(xrarr-oo)(-x^2-4x)=lim_(xrarr-oo)(-x^2)=-oo$

$f(-2)=4$

$lim_(xrarr+oo)f(x)=lim_(xrarr+oo)(-x^2-4x)=lim_(xrarr+oo)(-x^2)=-oo$

$f$ is defined in $RR$ so it doesn't have any vertical asymptotes.

$lim_(xrarr-oo)f(x)/x=lim_(xrarr-oo)(-x^2-4x)/x=lim_(xrarr-oo)(-x^2/x)=+oo$

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How do you find the important points to graph f(x)= -x^2-4xf(x)= -x^2-4x?