Find three cities on this map that appear to be collinear. Chicago, Bloomington, Springfield ANSWER WARM UP!
Front Side – True or False
Back Side Use the diagram to answer the questions. 9.Name one pair of opposite rays. ____________ & ____________ Opposite Rays - Share the same end point - The 2 rays are on the same line - They go in opposite directions
Lesson 1.2 Use Segments and Congruence
Congruent Segments: exactly the same size and length XY= PQ segment XY is congruent to segment PQ IIII
Between: A point is between 2 points if it is on the line (collinear with) that connects those two points.
Broken Pencil
Segment Addition Postulate : Segment Addition Postulate Thus, XY + YZ = XZ
EXAMPLE 1 Apply the the Segment Addition Postulate SOLUTION Maps The cities shown on the map lie approximately in a straight line. Use the given distances to find the distance from Lubbock, Texas, to St. Louis, Missouri. Because Tulsa, Oklahoma, lies between Lubbock and St. Louis, you can apply the Segment Addition Postulate. LS = LT + TS = = 740 The distance from Lubbock to St. Louis is about 740 miles. ANSWER
GUIDED PRACTICE for Examples 1 and 2 In the diagram, WY = 30. Can you use the Segment Addition Postulate to find the distance between points W and Z ? 4. NO; Because w is not between x and z. ANSWER
GUIDED PRACTICE 1. Use the Segment Addition Postulate to find XZ. xz = xy + yz = = 73 Segment addition postulate Substitute 23 for xy and 50 for yz Add SOLUTION ANSWER xz = 73
EXAMPLE 2 Find a length Use the diagram to find GH. Use the Segment Addition Postulate to write an equation. Then solve the equation to find GH. SOLUTION Segment Addition Postulate. Substitute 36 for FH and 21 for FG. Subtract 21 from each side GH = 36 FG + GH=FH = 15GH
GUIDED PRACTICE Use the segment addition postulate to write an equation. Then solve the equation to find WX Use the diagram at the right to find WX. 5. vx = vw + wx 144= 37 + wx 107 = wx Segment addition postulate Subtract 37 from each side SOLUTION ANSWER WX = 107 Substitute 37 for vw and 144 for vx
Example 3 Point S is between point R and point T. Use the given information to write an equation in terms of x. Solve the equation. Then find both RS and ST. RS = 3x – 16 ST = 4x – 8 RT = 60 3x-16 I x I I I
WARM-UP Directions: Find x. What do you notice about the relationship between segment AB and segment BC?
1.3 Lesson Use Midpoint and Distance Formulas
Midpoint The midpoint of a segment is a point that divides a segment into 2 congruent segments. I I A B So….. AM = MB M
Segment Bisector A point, segment, line, or plane that divides a line segment into two equal parts I I I
In the skateboard design, VW bisects XY at point T, and XT = 39.9 cm. Find XY. Skateboard SOLUTION EXAMPLE 1 Find segment lengths Point T is the midpoint of XY. So, XT = TY = 39.9 cm. XY = XT + TY = = 79.8 cm Segment Addition Postulate Substitute. Add. Bisect: to cut in 1/2
EXAMPLE 2 Use algebra with segment lengths Point M is the midpoint of VW. Find the length of VM. ALGEBRA
GUIDED PRACTICE Identify the segment bisector of. Then find PQ. line l
Warm Up: Find the coordinates of the midpoint
MIDPOINT FORMULA The midpoint of two points P(x 1, y 1 ) and Q(x 2, y 2 ) is M(X,Y) = M ( x 1 + x 2, y 2 +y 2 ) Think of it as taking the average of the x’s and the average of the y’s to make a new point. 2
EXAMPLE 3 Use the Midpoint Formula a. FIND MIDPOINT The endpoints of RS are R(1,–3) and S(4, 2). Find the coordinates of the midpoint M.
EXAMPLE 3 Use the Midpoint Formula – =, M, – 1 M The coordinates of the midpoint M are 1, – ANSWER SOLUTION a. FIND MIDPOINT Use the Midpoint Formula.
EXAMPLE 3 Use the Midpoint Formula FIND ENDPOINT Let (x, y) be the coordinates of endpoint K. Use the Midpoint Formula. STEP 1 Find x. 1+ x 2 2 = 1 + x = 4 x = 3 STEP 2 Find y. 4+ y 1 2 = 4 + y = 2 y = – 2 The coordinates of endpoint K are (3, – 2). ANSWER b. FIND ENDPOINT The midpoint of JK is M(2, 1). One endpoint is J(1, 4). Find the coordinates of endpoint K.
Guided Practice A. The endpoints of are A(1, 2) and B(7, 8). Find the coordinates of the midpoint M. B. The midpoint of is M(– 1, – 2). One endpoint is W(4, 4). Find the coordinates of endpoint V.