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Geometry
Name
Cumulative Content Standards
Period
Due Date
Weekly Standards Review #5
Directions: Use the space provided to show all appropriate work. No Calculator Allowed.
1. Which is the inverse of a  b ?
A.
B.
C.
D.
ba
b ~ a
a ~ b
~ a ~ b
2. If BD bisects CBE , mABC 
A.
B.
C.
D.
4. Use the true statement and the given
information to draw a conclusion.
True statement: If an angle is a right angle,
then it has a measure of 90˚. Given  B is a
right angle.
.
A. AB and BD are collinear.
B. ABC has a measure that is between
0˚ and 90˚.
C.  B has a measure of 90˚.
D. ABC has three congruent sides.
30˚
60˚
150˚
210˚
5. One word left undefined in geometry is
3. Let p = “We receive more than eight inches of
snow.” Let q = “School is cancelled.”
q  p reads:
A. If we receive more than eight inches
of snow, then school is cancelled.
B. We receive more than eight inches of
snow if and only if school is
cancelled.
C. School is cancelled if and only if we
receive more than eight inches of
snow.
D. If school is cancelled, then we receive
more than eight inches of snow.
A.
B.
C.
D.
? .
between
line
line segment
ray
Rev. 4/30/2017
6. Points A, B, C, and D are collinear. If B is the
midpoint of AD , CD = 3 and AB = 5, then
BC =
.
A.
B.
C.
D.
2
3
5
8
7. What is the biconditional form of the
statement “If a whitetail deer has antlers, then
it is a male deer”?
A. A whitetail deer has no antlers if and
only if it is not a male deer.
B. A whitetail deer has antlers if and only
if it is a male deer.
C. If a whitetail deer has no antlers, then
it is not a male deer.
D. If a whitetail deer is male, then it has
antlers.
8. A plane and a line
point.
A.
B.
C.
D.
9. Which pair of angles are not adjacent?
?
intersect in a single
sometimes
always
never
not enough information
A.
B.
C.
D.
1 and 2
3 and 4
2 and 3
1 and 4
10. Determine if the conditional and its converse
are true. If they are both true, select which
biconditional correctly represents them. If
either the conditional or the converse is false,
select the counterexample which disproves
the statement:
If two angles are supplementary, then they
form a linear pair.
If two angles form a linear pair, then they are
supplementary.
A. Two angles are a linear pair only if
they are supplementary.
B. Counterexample: If two angles form a
linear pair, they are complementary,
not supplementary.
C. Counterexample: If two angles form a
linear pair, they are complementary,
not supplementary.
D. Two angles are supplementary if and
only if they form a linear pair.
Rev. 4/30/2017
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