The proof that UX ≅ SV is shown.

Given: △STU an equilateral triangle

∠TXU ≅ ∠TVS

Prove: UX ≅ SV

Triangle T X V is shown. Point S is on side T X and point U is on side T V. A line is drawn from points S to U to form equilateral triangle T S U. Lines are drawn from point S to point V and from point U to point X and intersect at point W.

What is the missing statement in the proof?

Statement
Reason
1. ∠TXU ≅ ∠TVS 1. given
2. ∠STV ≅ ∠UTX 2. reflex. prop.
3. △STU is an equilateral triangle 3. given
4. ST ≅ UT 4. sides of an equilat. △ are ≅
5. ? 5. AAS
6. UX ≅ SV 6. CPCTC
△SXU ≅ △TVS
△UVX ≅ △SXV
△SWX ≅ △UWV
△TUX ≅ △TSV

Question

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Taylorvincent Taylorvincent · Answer 1 · 2020-11-03T19:24:18+01:00

Answer:

Answer:

5. Statement: △TUX ≅ △TSV

Step-by-step explanation:

Given, triangle STU is an equilateral triangle.

To prove that

Proof:

1. Statement: ∠TXU ≅ ∠TVS

Reason: Given in question .

2. Statement: ∠STV ≅ ∠UTX

Reason: By using reflection proeperty of rotation.

3. Statement: △STU is an equilateral triangle.

Reason: given.

4. Statement: ST ≅ UT

Reason: Sides of equilateral triangle STU.

5. △TUX ≅ △TSV

Reason: AAS congruence property of triangle.

6. Statement: UX ≅ SV

Reason: CPCT ( corresponding parts of congruence triangles).

Step-by-step explanation:

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santiagomichelle868 santiagomichelle868 · Answer 2 · 2021-11-10T23:09:37+01:00

Answer:

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Step-by-step explanation:

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