Complete the two-column proof
Given: triangle SVX is congruent to triangle UTX and Line SV is || to line TU
Prove: VUTS is a parallelogram
Image: It's a parallelogram, with one line going from corner S to corner U and a line going from corner T to corner V. X being the center. If you draw this out corner S is at the Top Left-Hand corner with V being at the Top Right-hand corner. T being at the bottom left-hand corner and U at the bottom right-hand corner. And again X being in the center. That's has much as I can possibly describe this picture.
Statements:
1. Triangle SVX is congruent to triangle UTX
2. __________
3.__________
4. VUTS is a parallelogram
Reasons:
1. Given
2. Given
3. _________
4. _________
I already have statement 2 which is Line SV || line TU. However that's as far as I've gotten. Can someone please help me understand this. Thank you and God Bless!
Note: If you need anymore details let me know and I'll see if i can describe what you may need.
6 answers
1. Triangle SVX is congruent to triangle UTX
2. Line ST is parallel to line TU.
3. Line ST is congruent to line TU.
4. VUTS is a parallelogram.
Reasons:
1. Given
2. Given
3. Corresponding parts of a congruent triangle.
4. Definition of a parallelogram.
Also here is the rest of the quiz.
1. A (Always true)
2. A (128.6 degrees)
3. B (21)
4. C (Octagon)
5. C (135 degrees)
6. I'm not 100% sure so sorry you will have to do it yourself :(
7. The diagram has four sides, two pairs of equivalent angles, and two pairs of equivalent sides. This is proven by the definition of a parallelogram.
Hope this helps also 1-5 are 100% correct
The rest are my guess.
17 answers