What is the slope of the line of this equation: $9x + 8y -13 =0$ ?

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Answer 1 · 2017-06-24T07:31:29

$m=-9/8$

The slope of a line can be found when a linear equation is written in the form:

$y = mx + b$

Where $m$ is the slope of the line.

You can get to this form, by algebraically isolating the $y$ .

$9x+8y-13=0$

Add $13$ to both sides:

$9x+8y=13$

Subtract $9x$ from both sides:

$8y=-9x+13" "$ (notice the $9x$ can go in front of $13$ )

Divide both sides by $8$ :

$y=-9/8x+13/8$

The slope is the coefficient of the $x$ term.

ANSWER: $m=-9/8$

Answer 2 · 2017-06-24T07:36:01

Slope = $-9/8$

The equation of a straight line in slope $(m)$ and intercept $(c)$ form is: $y=mx+c$

in this example: $9x+8y-13=0$ can be written as:

$y= -9/8x+13/8$

Hence the slope of $y$ is $-9/8$ and the $y-$ intercept is $13/8$

The graph of $y$ is shown below:
graph{9x+8y-13=0 [-10, 10, -5, 5]}

What is the slope of the line of this equation: 9x + 8y -13 =09x + 8y -13 =0?