Asked by Grace
Given: ∆PQR, m∠R = 90°
m∠PQR = 75°
M ∈ PR , MP = 18
m∠MQR = 60°
Find: RQ
m∠PQR = 75°
M ∈ PR , MP = 18
m∠MQR = 60°
Find: RQ
Answers
Answered by
Steve
Note that ∠MQP = ∠MPQ so ∆QMP is isosceles.
MQ = MP = 18
∆MRQ is 30-60-90, with a hypotenuse of 18
RQ = 9√3
MQ = MP = 18
∆MRQ is 30-60-90, with a hypotenuse of 18
RQ = 9√3
Answered by
Sid
9
I've checked over and over and found that it's correct. RQ is literally half of MP
I've checked over and over and found that it's correct. RQ is literally half of MP
Answered by
billy bob joe
billy billy bob bob joe joe
Answered by
wutdoidowithlifeeeeeeeeee
The answer is 9. eeeeeeeeeee
Answered by
Anonymous
RQ=9.
Answered by
Mr. Math
The answer is 9. The friends above have resolved correctly. 9 is correct for all instances. Have a good day.
Answered by
mary
9 heres the statement reason chart
pg=njkbn=9
for right angle theorem
pg=njkbn=9
for right angle theorem
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