Naming Triangles and Congruence Parts
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Naming Triangles and Congruence Parts
Quiz
•
Mathematics
•
10th Grade
•
Hard
Standards-aligned
Anthony Clark
FREE Resource
10 questions
Show all answers
1.
MULTIPLE SELECT QUESTION
1 min • 2 pts
Mark the angle pairs which are congruent due to the presence of transversal HK which would help prove that triangles RXH and KXN are congruent.
∠RXK ≅ ∠HXN
∠RHX ≅ ∠NKX
∠CRN ≅ ∠TNC
∠RHX ≅ ∠KXN
Tags
CCSS.HSG.SRT.B.5
2.
MULTIPLE SELECT QUESTION
1 min • 2 pts
You are trying to prove triangles A and B congruent. Given the information depicted on the diagram. What is the reason you would mark the blue, single arc angles congruent?
The two angles are corresponding parts of the two triangles in question.
Alternate internal angles of a transversal are congruent.
The reflexive property of congruence.
These angles are Vertical angles and therefore are congruent.
It meets the criteria for the angle addition postulate.
Tags
CCSS.HSG.SRT.B.5
3.
DROPDOWN QUESTION
1 min • 1 pt
Given the information in the image, you can deduce that the triangles are (a) because (b)
of the ASA Triangle congruence postulate.
of the SSA Triangle congruence theorem.
of the SSS Triangle congruence postulate.
of the HL Triangle congruence postulate.
of the AAS Triangle congruence theorem.
of the SAS Triangle congruence theorem.
there is not enough information given.
congruent
not congruent
Tags
CCSS.HSG.SRT.B.5
4.
DROPDOWN QUESTION
1 min • 1 pt
Given the information in the image, you can deduce that the triangles are (a) because (b)
of the ASA Triangle congruence postulate.
of the SSA Triangle congruence theorem.
of the HL Triangle congruence postulate.
of the AAS Triangle congruence theorem.
of the SAS Triangle congruence theorem.
there is not enough information given.
congruent
not necessarily congruent
of the SSS Triangle congruence postulate.
Tags
CCSS.HSG.SRT.B.5
5.
HOTSPOT QUESTION
1 min • 1 pt
You are trying to prove △MXC≅△LXC. Identify the components of the triangles on the diagram that are congruent due to the reflexive property help prove their congruence by selecting the points which define the components.
Tags
CCSS.HSG.SRT.B.5
6.
DROPDOWN QUESTION
1 min • 2 pts
What additional information is needed to prove that △MYG ≅ △MYR? (a)
EO ≅ TE
∠YTE ≅ ∠YES
∠ESO ≅ ∠TES
GM ≅ MK
GR ≅ GR
OT ≅ ZE
∠OMS ≅ ∠MSE
Tags
CCSS.HSG.SRT.B.5
7.
MULTIPLE SELECT QUESTION
1 min • 3 pts
You are trying to prove triangles A and B congruent. Given the information depicted on the diagram. What is the reason you would mark the blue, single arc angles congruent?
The two angles are corresponding parts of the two triangles in question.
Alternate internal angles of a transversal are congruent.
The reflexive property of congruence.
The transversal cuts through two parallel lines.
These angles are Vertical angles and therefore are congruent
Tags
CCSS.HSG.SRT.B.5
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