Question

RSTU is a parallelogram. If m∠TSV = 31° and m∠SVT = 126°, explain how you can find the measure of ∠URV. Show all steps of your work, and refer to any properties of triangles, parallelograms, or triangle congruency theorems as necessary to justify your response.

Answer 1

@mhchen

Answer 2

@Ultrilliam

Answer 3

@AngeI

Answer 4

@Vocaloid

Answer 5

@BenLindquist

Answer 6

@lowkey

Answer 7

@lowkey have you figured it out?

Answer 8

@hero plz help

Answer 9

You're lucky I was able to find your picture. No one can see it as currently posted.

Answer 10

@bruhidk are you still here?

Answer 11

There are only two properties you need in order to solve this.

1. Interior Angles of A Triangle Threorem:
The sum of the interior angles of a triangle sum to 180 degrees

2. Alternate Interior Angles Theorem

Answer 12

Next time find a different way to post the picture so that you can get help faster.

Answer 13

sorry, since you found the picture what would the measurement be

Answer 14

https://docs.google.com/document/d/1QrpWgnLw1dfHXmP3agl1KHkTPvTRXEWM0X6kDnLFjjU/edit?usp=sharing

Answer 15

here is a link to a picture if u need it

Answer 16

\(\angle TSV\) and \(\angle SVT\) are two interior angles of a triangle. \(\angle STV?\) is the third angle. Knowing this, what is the measure of \(\angle STV\)?

Answer 17

23?

Answer 18

Correct. Now to find m\(\angle URV\) you have to apply the Alternate Interior Angles Theorem

Answer 19

Does that mean the URV is also 23

Answer 20

No wait or is it 31

Answer 21

You were correct the first time. m\(\angle URV\) is also \(23^{\circ}\)

Answer 22

okay, thank you

Answer 23

You're welcome. But next time, try uploading your pictures directly from your computer.

Answer 24

okay :)))

Answer 25

m of URV is 23.0