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Andrea Olivato · Answer 1 · 2022-10-23T17:05:02+0000

Answer:

$y=(\displaystyle 3)/(\displaystyle 50)x+(\displaystyle 13)/(\displaystyle 10)$

Explanation:

Hi there!

Slope-intercept form:
y=mx+b where
is the slope and
is the y-intercept (the value of y when x is 0)

1) Determine the slope (m)

$m=(\displaystyle y_2-y_1)/(\displaystyle x_2-x_1)$ where two given points are
(x_1,y_1) and
(x_2,y_2)

Plug in the given points (15,2.2) and (5,1.6):

$m=(\displaystyle 1.6-2.2)/(\displaystyle 5-15)\\\\m=(\displaystyle -0.6)/(\displaystyle -10)\\\\m=(\displaystyle 0.6)/(\displaystyle 10)\\\\m=(\displaystyle 0.3)/(\displaystyle 5)\\\\m=(\displaystyle 3)/(\displaystyle 50)$

Therefore, the slope of the line is
$(\displaystyle 3)/(\displaystyle 50)$ . Plug this into
y=mx+b :

$y=(\displaystyle 3)/(\displaystyle 50)x+b$

2) Determine the y-intercept (b)

$y=(\displaystyle 3)/(\displaystyle 50)x+b$

Plug in a given point and solve for b:

$1.6=(\displaystyle 3)/(\displaystyle 50)(5)+b\\\\1.6=(\displaystyle 3)/(\displaystyle 10)+b\\\\1.6-(\displaystyle 3)/(\displaystyle 10)=(\displaystyle 3)/(\displaystyle 10)+b-(\displaystyle 3)/(\displaystyle 10)\\\\(\displaystyle 13)/(\displaystyle 10)=b$

Therefore, the y-intercept is
$(\displaystyle 13)/(\displaystyle 10)$ . Plug this back into
$y=(\displaystyle 3)/(\displaystyle 50)x+b$ :

$y=(\displaystyle 3)/(\displaystyle 50)x+(\displaystyle 13)/(\displaystyle 10)$

I hope this helps!

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