GEO 2105 Term 1 UNIT 2 CW4
Name _______________________ Pd _____
Find a missing vertex of a square on a graph
You are given one vertex of a square and the length of the side. Determine which point
CANNOT be another vertex of the square. Use graph paper or graph on back of dry erase
boards.
1. A square had a side length of 4; one vertex is (2, -1)
A. (6, -1)
B. (2, -5)
C. (-2, -1)
D. (6, 3)
E. (2, 1)
2. Given a square, s = 3; one vertex is (0, 1)
A. (3, 1)
B. (-3, 1)
C. (0, 4)
D. (0, -4)
E. (3, 4)
3. A square has a side length = 5 and a vertex at (-1, -1)
A. (-1, 4)
B. (-6, -1)
C. (3, -1)
D. (-1, -6)
E. (4, 4)
4. Given a square with s = 2 and a vertex at (2, 2)
A. (0, 0)
B. (4, 1)
C. (0, 2)
D. (0, 4)
E. (2, 0)
5. A square had a side length of 5; one vertex is (2, -1)
A. (6, -1)
B. (2, -5)
C. (-3, -1)
D. (6, 3)
E. (2, 1)
6. Given a square, s = 2; one vertex is (0, 1)
A. (3, 1)
B. (-2, -1)
C. (0, 4)
D. (0, -4)
E. (3, 4)
7. A square has a side length = 4 and a vertex at (-1, -1)
A. (-1, 4)
B. (-5, 3)
C. (3, -1)
D. (-1, -6)
E. (4, 4)
Which of the following CAN be a vertex of the square.
8. Given a square with s = 1 and a vertex at (2, 2)
A. (0, 0)
B. (4, 1)
C. (2, 3)
D. (0, 4)
E. (2, 0)
9. Find the length of all segments when B is between A and C; AC = 5x, AB = 2x, BC = x + 8
10. Find the length of all segments when q is between W and Y; WX = 3q + 7, XY = 2q -5,
WY = 27
11. Find the length of all segments when R is between Q and S; QR = 10x, RS = 64,
QS = 30x + 4
Assume that the letters are in order from left to right. Solve for the number line value of the
given letter.
12. WXYZ, WZ=100, WX=50, YZ=30, Y = 20 on the number line.
X = _____
13. RSTU, RU=12, TU=5, s=-5 on the number line.
R = _____
14. MNOP, MP=25, MO=20, NP=12, N=-5.
O = _____
15. EFGH, GH=17, EG=30, EH=47, G=5.
H=_____
F= _____
E=_____