Consider the diagram below. 2095.2 m. 1000 m. In order to set up for a rowing competition, the crew needs to find a practice course in a lake. Using the diagram above, determine which of the following reasons allows us to conclude that x is equal to the distance across the lake. All three angles of the triangles are congruent, so the triangles must also be congruent. B. The triangles for two parallel lines; therefore, they must be congruent.

Consider the diagram below. 2095.2 m. 1000 m. In order to set up for a rowing competition, the crew needs to find a practice course in a lake. Using the diagram above, determine which of the following reasons allows us to conclude that x is equal to the distance across the lake. All three angles of the triangles are congruent, so the triangles must also be congruent. B. The triangles for two parallel lines; therefore, they must be congruent.

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Description: Consider the diagram below.2095.2 m.1000 m.In order to set up for a rowing competition, the crew needs to find a practice course in a lake. Usingthe diagram above, determine which of the following reasons allows us to conclude that x is equal tothe

Elementary Geometry For College Students, 7e

7th Edition

ISBN:9781337614085

Author:Alexander, Daniel C.; Koeberlein, Geralyn M.

Publisher:Alexander, Daniel C.; Koeberlein, Geralyn M.

ChapterP: Preliminary Concepts

SectionP.CT: Test

Problem 1CT

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Consider the diagram below.
2095.2 m.
1000 m.
In order to set up for a rowing competition, the crew needs to find a practice course in a lake. Using
the diagram above, determine which of the following reasons allows us to conclude that x is equal to
the distance across the lake.
All three angles of the triangles are congruent, so the triangles must also be congruent.
The triangles for two parallel lines; therefore, they must be congruent.

In order to set up for a rowing competition, the crew needs to find a practice course in a lake. Using
the diagram above, determine which of the following reasons allows us to conclude that x is equal to
the distance across the lake.
All three angles of the triangles are congruent, so the triangles must also be congruent.
The triangles for two parallel lines; therefore, they must be congruent.
В
Vertical angles are congruent, so by ASA, the two triangles are congruent.
Alternate interior angles are congruent, so all of the sides must also be congruent
DELL

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