Asked by Unknown
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.
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.
Answers
Answered by
Not your dad
yea no sorry this big brain stuff we not big brain
Answered by
Anonymous
the answer to 8 is Proof that's all I got
Answered by
SavageAlphaWolf16
the answer to number to is SV is congruent to TU
Answered by
SavageAlphaWolf16
also look at some notes
Answered by
Answers
Statements:
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.
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.
Answered by
Yet another weeb
6 is 96 I think
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