Geometry Section 4.3 and Mixed Review

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Measures 2 skills from
High School
Geometry (Archived)
Texas Essential Knowledge and Skills (TEKS)

111.41.C.6.B

111.41.C.6.C

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Q 1/42
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Which triangles are congruent because of ASA?
29
$\Delta VTU\cong\Delta ABC$
$\Delta VTU\cong\Delta HGF$

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42 questions

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Q1
Which triangles are congruent because of ASA?
$\Delta VTU\cong\Delta ABC$
$\Delta VTU\cong\Delta HGF$
30s
111.41.C.6.B
Q2
Which triangles are congruent because of ASA?
group d
group a
group b
group c
30s
111.41.C.6.B
Q3
Can you use the SAS postulate, the AAS theorem or both to prove the triangles congruent?
either SAS or AAS
neither
AAS only
SAS only
30s
111.41.C.6.B
Q4
Based on the given information, what can you conclude, and why?
$\Delta MNO\cong\Delta OQP$ by SAS
$\Delta MNO\cong\Delta OQP$ by ASA
$\Delta MNO\cong\Delta QPO$ by ASA
$\Delta MNO\cong\Delta QPO$ by SAS
30s
111.41.C.6.B
Q5
30s
111.41.C.6.C
Q6
30s
111.41.C.6.C
Q7
30s
Q8
Justify the last two steps of the proof.
$\overline{\mathrm{BC}}\cong\overline{\mathrm{CB}}$ Symmetric Property of congruence; SSS
$\overline{\mathrm{BC}}\cong\overline{\mathrm{CB}}$ due to Reflexive Property of congruence; SAS
$\overline{\mathrm{BC}}\cong\overline{\mathrm{CB}}$ due to Reflexive Property of congruence; SSS
30s
111.41.C.6.B
Q9
30s
111.41.C.6.B
Q10
What other information do you need in order to prove the triangles congruent using the SAS Congruence Postulate?
$\angle BAC\cong\angle DAC$
$\angle CBA\cong\angle CDA$
$\overline{\mathrm{A}C}\cong\overline{\mathrm{BD}}$
$\overline{\mathrm{AC}}\ \perp\ \overline{\mathrm{BD}}$
30s
111.41.C.6.B
Q11
30s
111.41.C.6.B
Q12
Which statement describes congruent segments?
if P is in the interior of angle RST, then measure of angle RST= measure of angle RSP + measure of angle PST
If B is between A and C, then AB + BC=AC.
same perimeter and area
line segments with the same length
30s
Q13
Which statement describes the segment addition postulate?
if P is in the interior of angle RST, then measure of angle RST= measure of angle RSP + measure of angle PST
sum of two angles' measures that equals 180 degrees
angles where their sides form two pairs of opposite rays and they share a common vertex
If B is between A and C, then AB + BC=AC.
30s
Q14
Which of the following describes complementary angles?
two adjacent angles that are supplementary (the sides they don't share form a line)
the sum of two angles' measures that equals $180^\circ$
angles where their sides form two pairs of opposite rays and they share a common vertex
the sum of two angles' measures that equals $90^\circ$
30s
Q15
Which describes a linear pair?
angles where their sides form two pairs of opposite rays and they share a common vertex
two adjacent angles that are supplementary (the sides they don't share form a line)
30s

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Geometry Section 4.3 and Mixed Review

Quiz by Dr. Esequiel Garcia

Measures 2 skills fromHigh SchoolGeometry (Archived)Texas Essential Knowledge and Skills (TEKS)

Our brand new solo games combine with your quiz, on the same screen

Measures 2 skills from
High School
Geometry (Archived)
Texas Essential Knowledge and Skills (TEKS)