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1. |
Which point do planes DHC, EHF, and BFG have in common? |
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A. |
H |
B. |
F |
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C. |
G |
D. |
B |
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2. |
Which figure shows points D(-1, -1), E(3, 4), F(-4, 2), and G(0, 2) on a coordinate plane with lines EF and DG intersecting at H and a point C that is coplanar with D, E, F, G, and H, but is not contained in either line? |
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A. |
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B. |
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C. |
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D. |
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3. |
If  and  intersect at V, what is the measure of  |
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A. |
32 |
B. |
12 |
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C. |
28 |
D. |
5 |
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4. |
In the figure, ABCD is a square. Which of the following is a valid conjecture about points A, B, C, and D? |
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A. |
AB = BD |
B. |
None of the statements are valid conjectures. |
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C. |
AB = CD |
D. |
AB + CD = 12 |
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5. |
Determine the converse of the following if-then statement.
If the flowers are yellow, then they are daffodils. |
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A. |
The flowers are not daffodils. |
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B. |
If the flowers are not yellow, then they are not daffodils. |
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C. |
The flowers are not yellow. |
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D. |
If the flowers are daffodils, then they are yellow. |
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6. |
Name the plane parallel to plane AEF. |
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A. |
plane EFH |
B. |
plane DGH |
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C. |
plane CHF |
D. |
plane DBA |
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7. |
Name the postulate or theorem that concludes  |
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A. |
Corresponding Angles Postulate |
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B. |
Alternate Exterior Angles Theorem |
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C. |
Alternate Interior Angles Theorem |
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D. |
Consecutive Interior Angles Theorem |
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Hint |
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8. |
Find the distance between the parallel lines m and n whose equations are
y = x + 4 and y = x - 6, respectively. |
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A. |
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B. |
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C. |
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D. |
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9. |
Which pair of triangles shows  by the AAS Theorem? |
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A. |
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B. |
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C. |
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D. |
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10. |
If the measures of two sides of a triangle are 3 and 1, between what two numbers must the measure of the third side fall? |
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A. |
1 and 7 |
B. |
2 and 4 |
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C. |
2 and 5 |
D. |
1 and 3 |
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11. |
Which statement is true? |
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A. |
Any two isosceles triangles are similar. |
B. |
Any two right triangles are similar. |
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C. |
Any two equilateral triangles are similar. |
D. |
Any two triangles are similar. |
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12. |
Find the value of x in the figure. |
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A. |
3.2 |
B. |
4.8 |
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C. |
5.4 |
D. |
3.6 |
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13. |
 . Find the value of y. |
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A. |
1.8 |
B. |
1.9 |
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C. |
2 |
D. |
2.2 |
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14. |
The intersection of two planes could be a ______. |
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A. |
plane |
B. |
segment |
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C. |
point |
D. |
line |
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15. |
Find the coordinates of R, the midpoint of  , if the endpoints of are Q(3, -5) and S(-3, 6). |
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A. |
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B. |
(6,1) |
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C. |
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D. |
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16. |
If  bisects  which angle is congruent to |
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A. |
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B. |
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C. |
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D. |
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17. |
What is a valid conclusion to the following hypothesis?
If there are two points... |
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A. |
There are two lines containing both points. |
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B. |
There is one line containing both points. |
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C. |
There are no lines containing both points. |
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D. |
There are an infinite number of lines containing both points. |
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18. |
If two lines are cut by a transversal and ______ angles are congruent, then the lines are parallel. |
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A. |
vertical |
B. |
consecutive interior |
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C. |
corresponding |
D. |
adjacent |
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19. |
Which statement is not true? |
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A. |
In an isosceles triangle, the base is congruent to one of the legs. |
B. |
A triangle cannot be obtuse and contain a 90° angle. |
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C. |
A triangle cannot be scalene and isosceles. |
D. |
A triangle can be obtuse and isosceles. |
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Hint |
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20. |
In the figure, points A, B, and C lie in plane Z. Which of the following postulates can be used to show that A and B are collinear? |
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A. |
If two planes intersect, then their intersection is a line. |
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B. |
Through any three points not on the same line, there is exactly one plane. |
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C. |
If two lines intersect, then their intersection is exactly one point. |
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D. |
Through any two points, there is exactly one line. |
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Hint |
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