How do you determine if $3x = |y|$ is an even or odd function?

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How do you determine if $3x = |y|$ is an even or odd function?

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Answer 1 · 2018-04-08T19:34:27

even.

Explanation:

$3x=|\y|$

substituting $y$ for $-y$

$3x=|+-y|$

$3x=|\y|$

so it's even.
In general:
A function is even $rarr$ it is symmetrical about the $y$ axis
and an odd function $rarr$ if it's symmetrical about the origin

but if You want to know through an equation you just substitute for each $x$ for $-x$

A function is even
if $f(x)=f(-x)$
like $y=x^2$ if You substitute for each $x$ for $-x$ You get
$y=(-x)^2=x^2=f(x)$ so it's even
and same goes for $y=|\ x|$

And it will be odd if $f(x)=-f(-x)$
ex: $y=x$
if You substitute $x$ for $-x$ you get
$y=-x=-f(x)$

and it will be neither even nor odd if it gives You something else like $y=3x+2$
if You substitute $x$ for $-x$
you get:
$y=-3x+2 !=+-f(x)$

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How do you determine if $3x = |y|$ is an even or odd function?

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