Find the midpoint of the line segment with the given endpoints.
(2, 4). and (1, −3)
(1 1/ 2 , 1 /2) or (1.5 , 0.5)
Find the distance of the two points.
(5, 9), and (−7, −7)
20
2
Points A, B, and C are collinear. Point B is between A and C. Find the length indicated.
Find AC if AB =16 and BC = 12.
28
Name 4 types of segment bisectors.
point
line segment
line
ray
plane
Endpoint: (2, -5), Endpoint: (-5, 1)
Find the Midpoint!
(-3 1/2, -2) n or (-3.5, -2)
Find the distance of the two points.
(−6, −10), (−2, −10)
4
3
Points A, B, and C are collinear. Point B is between A and C. Find the length indicated.
Find AC if AB = 13 and BC = 9.
22
What does a segment bisector do to a line?
cuts the lines segment in half and creates two congruent line segments
Find the midpoint of the line segment with the given endpoints.
(−1, −6) AND (−6, 5)
(−3 1/2 , − 1/2). OR (-3.5, -0.5)
Find the distance between the two points?
(−2, 3), (−7, −7)
11.2
What is another way to name a plane?
Capital Letter
Points A, B, and C are collinear. Point B is between A and C. Solve for x.
AC = 3x + 3 , AB = -1 + 2x , and BC = 11.
Find x.
7
If Point M bisects the line segment PQ
What is the measure of PM and MQ if PQ = 22?
PM = 11 and MQ = 11
Find the midpoint of the line segment with the given endpoints.
(−5.1, −2), (1.4, 1.7)
(−1.85, −0.15)
Find the distance between the two points.
(6, 4), (−5, −1)
square root of 146
Draw me a pair of opposite rays?
Answers will vary.
Points A, B, and C are collinear. Point B is between A and C. Solve for x.
AC = 22 , BC = x + 14 , and AB = x + 10.
-1
M is the midpoint of each segment. Set up an equation to find x and then find the specified lengths.
EM = 7x-6
MF = 5x
EF = ?
x = 3
EM = 15
EF = 15
EF = 30
Find the other endpoint of the line segment with the given endpoint and midpoint.
Endpoint: (−1, 9), midpoint: (−9, −10)
(−17, −29)
Find the distance.
(−5, 6), (8, −4)
Draw me a set of collinear points?
Answers will vary.
Points A, B, C, D, and E are collinear and in that order. Find AC if AE = x + 50 and CE = x + 32.
AC = AE - CE =18
M is the midpoint of each segment. Set up an equation to find x and then find the specified lengths.
JM = 6x + 11
MK = 9x-13
x= ?
x = 8
JM = 59
MK = 59
JK = 118