wr = 6. find the missing segment lengths.
tu =
rv =
tr =
vw =
vu =
ts =
(2y + 40)° (6y + 28)°
2y + 40 = 6y+28
-4y=-12
y = 3
9. what type of triangle center is point a?
10. which point of concurrency is shown below?
11. point m is a centroid. solve for x.
12. sketch △jkl with centroid r. make sure to shown all congruency and angle markings.

Question

wr = 6. find the missing segment lengths.
tu =
rv =
tr =
vw =
vu =
ts =
(2y + 40)° (6y + 28)°
2y + 40 = 6y+28
-4y=-12
 y = 3
9. what type of triangle center is point a?
10. which point of concurrency is shown below?
11. point m is a centroid. solve for x.
12. sketch △jkl with centroid r. make sure to shown all congruency and angle markings.

Accepted Answer

# Explanation:
## Step1: Recall centroid property
The centroid divides each median in a 2:1 ratio. If $M$ is the centroid and the segments of the median are $(3x + 18)$ and $(5x-22)$, then $5x-22 = 2(3x + 18)$.
## Step2: Expand the right - hand side
$$5x-22=6x + 36$$
## Step3: Solve for $x$
Subtract $5x$ from both sides: $-22=x + 36$. Then subtract 36 from both sides to get $x=-58$.

# Answer:
$x=-58$

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QUESTION IMAGE

Question

Explanation:

Step1: Recall centroid property

Step2: Expand the right - hand side

Step3: Solve for \(x\)

Answer: