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What is the slope and intercept of $- x - 10 y = 20$ $-x-10y=20$ ?

1 Answer

May 21, 2016

Slope: $(- \frac{1}{10}) XXXXX$ $(-1/10)color(white)("XXXXX")$ y-intercept: $(- 2)$ $(-2)$

Explanation:

Given
$XXX - x - 10 y = 20$ $color(white)("XXX")-x-10y=20$

Convert this into the slope-intercept form
$XXX y = m x + b$ $color(white)("XXX")y=color(green)(m)x+color(blue)(b)$
with slope $m$ $color(green)(m)$ and y-intercept $b$ $color(blue)(b)$

$- x - 10 y = 20$ $-x-10y=20$
$XXX \to - 10 y = x + 20$ $color(white)("XXX")rarr -10y=x+20$

$XXX \to y = - \frac{1}{10} x - 2$ $color(white)("XXX")rarr y= color(green)(-1/10)xcolor(blue)(-2)$

which is the slope-intercept form
with slope $(- \frac{1}{10})$ $color(green)(""(-1/10))$ and y-intercept $(- 2)$ $color(blue)(""(-2))$

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Typically it is only the y-intercept that is required in this type of question, but if the x-intercept is also desired:

Set $y = 0$ $y=0$ in the original equation (the x-intercept occurs on the X-axis where $y = 0$ $y=0$ ).

$XXX - x - 10 (0) = 20$ $color(white)("XXX")-x-10(0)=20$

$XXX \to x = (- 20)$ $color(white)("XXX")rarr x=color(red)(""(-20))$

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Here is what the graph of this equation looks like:
graph{-x-10y=20 [-24.6, 3.86, -7.37, 6.87]}

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