How do you tell wether the equation $3x + y = 6$ represents direct variation and if so, how do you identify the constant of variation?

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How do you tell wether the equation $3x + y = 6$ represents direct variation and if so, how do you identify the constant of variation?

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Answer 1 · 2016-02-01T18:20:37

The equation does not represent direct variation. Consequently, there is no constant of variation.

Explanation:

You can determine whether or not an equation represents direct variation by first rewriting it in slope-intercept form:

$y=mx+b$

where:
$y=$ y-coordinate
$m=$ slope
$x=$ x-coordinate
$b=$ y-intercept

In direct variation, $b$ , the y-intercept, is $0$ . However, if you rearrange your equation into slope-intercept form, you will find that the y-intercept is not $0$ :

$3x+y=6$

$y=-3x$ $color(red)(+6)$

In this case, the y-intercept is $6$ . Since it is not $0$ , this equation does not represent direct variation. Consequently, there is no constant variation since the equation does not follow the general equation, $y=mx+0$ .

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How do you tell wether the equation $3x + y = 6$ represents direct variation and if so, how do you identify the constant of variation?

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How do you tell wether the equation $3x + y = 6$ represents direct variation and if so, how do you identify the constant of variation?