1. Which point (A, B, C, or D) can act as the third point in a triangle with side ON in the image below will make it so the newly formed triangle is congruent to △JHG?
1. A.
2. B
3. C
4. D
2. Select the two triangles that are congruent, in the image below.
A. △ABC
B. △TUV
C. △WXY
D. △DEF
E. △QRS
3. What is the value of y given the information below
In △ABC, AB =14, BC =27, AC =19, and ∠A=32°
in △FGH, FG =14, GH =19, FH =2y+5, and ∠G=32°
A. 13.5
B. 4.5
C. 11
D. 7
4. Which congruence criteria can be used from the information about △HIJ and △MNO to prove IJ ≅ MN by CPCTC?
HI ≅ NO
∠I≅∠N
∠H≅∠O
A. AAS congruence
B. HL congruence
C. SAS congruence
D. SSS congruence
E. ASA congruence
5. Given parallelogram ABCD with diagonal AC , which theorem can be used to prove that ∠DAC≅∠ACB?
A. Alternate Interior Angles Theorem
B. Same-Side Interior Angles Theorem
C. Alternate Exterior Angles Theorem
D. Corresponding Angles Theorem
6. Select three true statements given the image below with parallelograms ABCD and CFGH
A. AB ≅ HG
B. AD ≅ BC
C. ∠B≅∠F
D. ∠A≅∠G
E. ∠D≅∠G
7. Select two pairs of congruent triangles that can be used to prove that the diagonals of the parallelogram below bisect each other.
A. △ABE and △ADE
B. △BCE and △DAE
C. △ABD and △CDB
D. △ABE and △CDE
E. △ABC and △CDA
8. Select three true statements about rectangle ABCD below.
A. △ABC≅△DCB
B. AB ≅ DC
C. AE ≅ EB
D. △ADE≅△ABE
E. ∠DAC≅∠CAB
1. B
2. A and E
3. A. 13.5
4. C. SAS congruence
5. A. Alternate Interior Angles Theorem
6. A, B, and C
7. A and C
8. B, C, and E