1 Answer

Zerobandwidth · Answer 1 · 2020-09-26T05:28:01+0000

For this case we have that by definition, the equation of a line of the slope-intersection form is given by:
y = mx + b

Where:

m: It's the slope

b: It is the cut-off point with the y axis

In addition, if two lines are perpendicular then the product of their slopes is -1. That is to say:

$m_ {1} * m_ {2} = - 1$

We have the following line:

$5x + 2y = 12\\2y = -5x + 12\\y = - \frac {5} {2} x + 6$

So, we have to:
$m_ {1} = - \frac {5} {2}$

We find
$m_ {2}:$

$m_ {2} = \frac {-1} {- \frac {5} {2}}\\m_ {2} = \frac {2} {5}$

Therefore, the line is of the form:

$y = \frac {2} {5} x + b$

We substitute the given point to find "b":

$3 = \frac {2} {5} (2) + b\\3 = \frac {4} {5} + b\\b = 3- \frac {4} {5}\\b = \frac {11} {5}$

Finally, the equation is:

$y = \frac {2} {5} x + \frac {11} {5}$

ANswer:

$y = \frac {2} {5} x + \frac {11} {5}$

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