Section 1-3 Segments, Rays, and Distance. line; segment; ray;
1.3 Segments, Rays, and Distance
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Transcript of 1.3 Segments, Rays, and Distance
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1.3 Segments, Rays, and Distance
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• Segment – Is the part of a line consisting of two endpoints & all the points between them.– Notation: 2 capital letters with a line over
them.
– Ex:– No arrows on the end of a line. – Reads: Line segment (or segment) AB
A B
AB
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• Ray – Is the part of a line consisting of one endpoint & all the points of the line on one side of the endpoint.– Notation: 2 capital letters with a line with an
arrow on one end of it. Endpoint always comes first.
– Ex: – Reads: Ray AB– The ray continues on past B indefinitely
A B
AB
AB
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• Opposite Rays – Are two collinear rays with the same endpoint. – Opposite rays always form a line.
– Ex:
Same Line
Q R S
RQ & RS
Endpoints
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Ex.1: Naming segments and rays.
• Name 3 segments:– LP– PQ– LQ
• Name 4 rays:– LQ– QL– PL– LP– PQ
L P Q
Are LP and PL opposite rays??
No, not the same endpoints
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Group Work
• Name the following line.
• Name a segment.
• Name a ray.
X
Y
ZXY or YZ or ZX
XY or YZ or XZ
XY or YZ or ZX or YX
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Number Lines
• On a number line every point is paired with a number and every number is paired with a point.
JK M
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Number Lines
• In the diagram, point J is paired with 8
• We say 8 is the coordinate of point J.
JK M
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Length of MJ
• When I write MJ = “The length MJ”
• It is the distance between point M and point J.
JK M
I want a real number as the
answer
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Length of MJ
• You can find the length of a segment by subtracting the coordinates of its endpoints
JK M
• MJ = 8 – 5 = 3 • MJ = 5 - 8 = - 3
Either way as long as you take the absolute value of the answer.
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Postulates and Axioms
• Statements that are accepted without proof– They are true and always will be true– They are used in helping to prove further
Geometry problems, theorems…..
• Memorize all of them– Unless it has a name (i.e. “Ruler Postulate”)– Not “Postulate 6”
• named different in every text book
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Ruler Postulate
• The points on a line can be matched, one-to-one, with the set of real numbers. The real number that corresponds to a point is the coordinate of the point. (matching points up with a ruler)
• The distance, AB, between two points, A and B, on a line is equal to the absolute value of the difference between the coordinates of A and B. (absolute value on a number line)
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Remote time
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A- Sometimes B – Always C - Never
• The length of a segment is ___________ negative.
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• If point S is between points R and V, then S ____________ lies on RV.
A- Sometimes B – Always C - Never
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• A coordinate can _____________ be paired with a point on a number line.
A- Sometimes B – Always C - Never
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Segment Addition Postulate
• Student demonstration
• If B is between A and C, then AB + BC = AC.
A
C
B
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Example 1
• If B is between A and C, with AB = x, BC=x+6 and AC =24. Find (a) the value of x and (b) the length of BC. (pg. 13)
A
C
B
Write out the problem based on the segments, then substitute in the info
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Congruent
• In Geometry, two objects that have– The same size and– The same shape
are called congruent.
What are some objects in the classroom that are congruent?
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Congruent __________
• Segments (1.3)
• Angles(1.4)
• Triangles(ch.4)
• Circles(ch.9)
• Arcs(ch.9)
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Congruent Segments
• Have equal lengths
• To say that DE and FG have equal lengthsDE = FG
• To say that DE and FG are congruentDE FG
2 ways to say the exact same thing
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Midpoint of a segment
• Based on the diagram, what does this mean?
• The point that divides the segment into two congruent segments.
A
B
P
3
3
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Bisector of a segment
• A line, segment, ray or plane that intersects the segment at its midpoint.
A
B
P
3
3
Something that is going to cut
directly through the midpoint
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Remote time
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• A bisector of a segment is ____________ a line.
A- Sometimes B – Always C - Never
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• A ray _______ has a midpoint.
A- Sometimes B – Always C - Never
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• Congruent segments ________ have equal lengths.
A- Sometimes B – Always C - Never
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• AB and BA _______ denote the same ray.
A- Sometimes B – Always C - Never
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Ch. 1 Quiz
Know the following…
1. Definition of equidistant
2. Real world example of points, lines, planes
3. Types of intersections
4. Points, lines, planes1. Characteristics
2. Mathmatical notation