B is the midpoint of AC. What is the length of AB? AB is 9x+7 and BC is -3x+20

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asked Aug 11, 2022 8.2k views

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Andreamazz · Answer 1 · 2022-08-17T05:25:28+0000

Answer:

$AB = (67)/(4)\\$

Explanation:

If
is the midpoint of
$\overline{AC}$ then
is just half of
and also,
is just half of
. This means that
must be equal to
. Essentially,
9x +7 = -3x +20 and we can solve for the of
from that equation.

$9x +7 = -3x +20 \\ 9x +7 +3x = -3x +20 +3x \\ 12x +7 = 20 \\ 12x +7 -7 = 20 -7 \\ 12x = 13 \\ (12x)/(12) = (13)/(12) \\ x = (13)/(12)$

Now we can solve for

$AB = 9((13)/(12)) +7 \\ AB = 3((13)/(4)) +7 \\ AB = (39)/(4) +7 \\ AB = (39)/(4) +(28)/(4) \\ AB = (67)/(4)$

B is the midpoint of AC. What is the length of AB? AB is 9x+7 and BC is -3x+20

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