How many inflection points does the function have?

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asked Aug 25, 2018 39.5k views

1 Answer

Nick Guerrera · Answer 1 · 2018-08-31T03:18:25+0000

$f(x)=-\frac{x^2}2+x-\cos^2x$

$\implies~f'(x)=-x+1-2\cos x(-\sin x)=-x+\sin2x+1$

$\implies~f''(x)=-1+2\cos2x$

Inflection points always occur at points where the second derivative is equal to zero, but not every such point will be an actual inflection point.

$-1+2\cos2x=0\iff\frac12=\cos2x$

$\implies 2x=\pm\frac\pi3+2n\pi$

$\implies x=\pm\frac\pi6+n\pi$

where

is an integer. There are infinitely many inflection points for this function.

How many inflection points does the function have?

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