1. Which triangle congruence criteria can always be used to prove two triangles congruent in a coordinate plane?

A. ASA congruence criteria
B. SSS congruence criteria
C. HL congruence criteria
2. Find the missing y-coordinate that makes the two triangles congruent.
Triangle ABC: A(8,4), B(2,6), C(5, 0)
Triangle MNO: M(7,4), N(1,2), O(4, y)
A. -2
B. -4
C. 4
D. 0
3. Find the coordinates of the missing vertex that makes the two triangles congruent.
Triangle FGH: F(−8,6), G(−6,6), H(−7, 2)
Triangle TUV: T(3,−3), U(3,−1)
A. V (-1,2)
B. V (-1,-2
C. V (1,2
D. V(1,-2)
4. Which triangle is congruent to the triangle with vertices (2,−2), (7,10), and (4,6)?
A. (−5,3), (7,−2), (3,1)
B. (9,6), (1,8), (−1,4)
C. (−4,2), (8,7), (1,1)
D. (−7,−5), (−3,−2), (3,3)
5. Which triangle is congruent to the triangle described?
A right triangle has a leg of length 4 and a hypotenuse of length √137
A. (2,2), (2,−9), (6,2)
B. (2,−10), (−8,−10), (−8,−4)
C. (−8,−2), (−4,−2), (−8,8)
D. (5,9), (−3,4), (1,4)

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