The perimeter of the triangle ΔQRS formed by the midsegments of
ΔNOP is half the perimeter of ΔNOP.
Correct response:
The perimeter of ΔQRS is <u>8 units</u>
<u />
<h3>How to find the perimeter of a triangle</h3>
The given parameters are;
PO = 6, PN = 4, ON = 6
According to midsegment theorem, we have;
Which gives;
The perimeter of ΔQRS = + +
Therefore;
- The perimeter of ΔQRS = 3 + 2 + 3 =<u> 8</u>
Learn more about the midsegment theorem here:
brainly.com/question/26080494
brainly.com/question/7423948
Okay, so whatever the answer is to angle A its the same answer to angle C and angle B and D. the angle looks like a obtuse which means it has to be bigger than 90 degrees. use your protractor to measure it.
1) Equation I=prt
2) Divide both side of the equation with rt to isolate the variable p one one side of the equation
Rearrange: I/rt=p. P=I/rt
Result : p=I/rt
Answer:
4
Step-by-step explanation:
Micheal's median:219
Quentin's median:215
219-215=4
Answer:
(-1, -7)
Step-by-step explanation:
Used desmos, also, in these situations I believe you can take the number inside the brackets and make it negative and keep the number outside the same to find the vertex.