Name a line.
Any of the following:
CD, CE, DC, ED, DE, EC, t
segments: LM ≅ MP, and LM=24. Find MP
24
Angle A and angle B are supplementary. The measure of angle A is 114 degrees. Find the measure of angle B.
66 degrees
The midpoint for the points (4,2) and (-3,-5).
(0.5,-1.5)
What transformation is shown?
Reflection over y-axis
Name a ray with endpoint E
Ray ED
Ray EC
S is the midpoint of RT, and RS = 30. Find RT.
60
Angle A and angle B are complementary. The measure of angle A is 35 degrees. Find the measure of angle B.
55 degrees
Find area and circumference. Use 3.14 for pi.
Area: 21.2 cm^2
Circumference: 16.3 cm
What transformation is shown?
Rotation 90 counterclockwise
Name a pair of opposite rays.
Ray DE, Ray DC
M bisects segment AT, and AT = 18.6. Find AM.
AM= 9.3
Name adjacent angles that form a linear pair.
Name a pair of vertical angles.
Possible answers-
Linear Pairs: BOA & AOD, AOE & EOC, BOE & EOD
Vertical Angles: AOB & DOC
Find the length of VW if V(5,9) and W(-7,-7).
VW = 20
Given a point in the coordinate plane, the rule (x,y) --> (x+6, y-3) translates the point in which direction?
6 units to the right, 3 units down
Name the blue plane in three different ways.
Plane M
Plane BCF, BCD, etc.
Solve for x. Then, find AB.
x = 5
AB = 45
Find x.
x = 12
Use Pythagorean theorem to find X.
Then, solve for area and perimeter.
x = 10
Area= (1/2)(8)(6) = 24 units^2
Perimeter= 8+6+10 = 24 units
The coordinates of the endpoints of a segment are A(-6, 8) and B (2, 7). Find the coordinates for the endpoints of the image of AB after the translation (x,y)--> (x + 4, y - 6)
A (-6 + 4, 8 - 6) = A(-2, 2)
B (2 + 4, 7 - 6) = B(6, 1)
Where do Plane M and Plane N intersect at?
Line t
Line CD, DE, CE, ED, etc
Find RP
x = -8
RP= -8 + 24
RP= 16
Z is in the interior of angle WXY. If the measure of angle WXZ = 40, and the measure of angle ZXY = 65, what is the measure of angle WXY?
(Draw the diagram)
105 degrees
Find the area of the shaded blue. Use 3.14 for pi.
23.4 cm^2
Figure ABC has vertices
A(1,3)
B(7,-5)
C(-2,4)
If figure ABC is rotated 90 degrees clockwise, what are its new coordinate points?
(x,y) --> (y,-x)
A(3,-1)
B(-5,-7)
C(4,2)