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Warm Up Section 3.2 Draw and label each of the following in a circle with center P. (1). Radius: (2). Diameter: (3). Chord that is NOT a diameter: (4). Secant: (5). Tangent: . Warm Up Section 3.2 answers
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Warm Up Section 3.2 Draw and label each of the following in a circle with center P. (1). Radius: (2). Diameter: (3). Chord that is NOT a diameter: (4). Secant: (5). Tangent:
Warm Up Section 3.2 answers Draw and label each of the following in a circle with center P. (1). Radius: (2). Diameter: (3). Chord that is NOT a diameter: (4). Secant: (5). Tangent: T A E P R D C
Properties of Chords Section 3.2 Standard: MCC9-12.G.C.2 Essential Question: Can I understand and use properties of chords to solve problems?
Parts of circles are called Arcs. If the part of the circle is less than half the circle it is called a minor arc. If the part of the circle is more than half the circle it is called a major arc. And if it is exactlyhalf the circle it is called a semicircle.
The circle below has center P. Draw a diameter on your circle. Label the endpoints of the diameter H and K. Put another point on your circle and label it T. There are two semicircles pictured in your drawing. One can be symbolized HK and the other HTK . K T P H
K T P Name two minor arcs(you only need two letters to name a minor arc because you always travel the shortest distance unless told otherwise.) _______ , _______ Name two major arcs(you must use three letters to name a major arc because you always travel the shortest distance unless told otherwise.) _______ , _______ H HT TK KHT HKT
The circle below has center M. Mark two points on your circle and label them R and S. Now draw the following rays: and Color the inside of RMS. Name the arc that is inside the colored part of the angle. This is called the intercepted arc. Arc: ________ The angle is called acentral anglebecause its vertex is the center of the circle. S R M RS
S R M Arcs are measured in degrees. The measure of the intercepted arc is equal to the measure of the central angle that forms that arc. So, if mRMS = 60o, then m RS = 60o.
In this section you will learn to use relationships of arcs and chords in a circle. In the same circle, or congruent circles, two minor arcs are congruent if and only if their corresponding chords are congruent. C B AB DC if and only if _____ ______. DC AB D A
1. In the diagram, A D, , and m EF = 125o. Find m BC. E B A D F C chords Because BC and EF are congruent ________ in congruent _______, the corresponding minor arcs BC and EF are __________ . So, m ______ = m ______ = ______o. circles congruent 125 BC EF
STICKY NOTE PROBLEM: In the diagram, A D, arc BC FE, BC = 10 cm. What is the measure of segment EF Sticky Note Problem E B A D F C If the arcs are congruent, the chords will be congruent. BC=EF=10 cm.
If one chord is a perpendicular bisector of another chord, then the first chord is a diameter. If QS is a perpendicular bisector of TR, then ____ is a diameter of the circle. T S P Q R QS
If a diameter of a circle is perpendicular to a chord, then the diameter bisects the chord and its arc. If EG is a diameter and EG DF, then HD HF and ____ ____ . F E H G D GF GD
2. If m TV = 121o, find m RS. T 6 S V 6 R If the chords are congruent, then the arcs are congruent. So, m RS = 121o
3. Find the measure of CB, BE, and CE. C Since BD is a perpendicular diameter, it bisects the chord and the arcs. 4xo A B D 4x = 80 – x 5x = 80 x = 16 (80 – x)o E 4(16) = 64 so mCB = m BE = 64o mCE = 2(64o) = 128o
In the same circle, or in congruent circles, two chords are congruent if and only if they are equidistant from the center. if and only if _____ ____ C GE FE G E D A F B
4. In the diagram of F, AB = CD = 12. Find EF. Chords and are congruent, so they are equidistant from F. Therefore EF = 6 G A B 7x – 8 F 3x D E C 7x – 8 = 3x 4x = 8 x = 2 So, EF = 3x = 3(2) = 6
In the diagram of F, suppose AB = 27 and • EF = GF = 7. Find CD. Since and are both 7 units from the center, they are congurent. G A B F D E C So, AB = CD = 27.
In S, SP = 5, MP = 8, ST = SU, and • NRQ is a right angle. Show that PTS NRQ. N Step 1: Look at PTS !! Since MP = 8, and NQ bisects MP, we know MT= PT = 4. Since , PTN is a right angle. 4 T 4 M P U 3 5 S R Q Use the Pythagorean Theorem to find TS. 42 + TS2 = 52 TS2 = 25 – 16 TS2 = 9 So, TS = 3.
In F, SP = 5, MP = 8, ST = SU, and • NRQ is a right angle. Show that PTS NRQ. N Step 2: Now, look at NRQ! Since the radius of the circle is 5, QN = 10. Since ST = SU, MP and RN are equidistantfrom the center. Hence, MP = RN = 8. 8 T M P U 10 S R 6 Q Use the Pythagorean Theorem to find RQ. RQ2 + 82 = 102 RQ2 = 100 – 64 RQ2 = 36 So, RQ = 6.
In F, SP = 5, MP = 8, ST = SU, and • NRQ is a right angle. Show that PTS NRQ. N Step 3: Identify ratios of corresponding sides. In PTS, PT = 4, TS = 3, and PS = 5. In NRQ, NR = 8, RQ = 6, and QN = 10. Find the corresponding ratios: T M P U S R Q
Because the corresponding sides lengths are proportional, (all have a ratio of ½), PTS NRQ by SSS Thrm.
7. In S, QN = 26, NR = 24, ST = SU, and NRQ is a right angle. Show that PTS NRQ. N N 24 T M P U 26 S R R 10 Q Q 242 + RQ2 = 262 RQ2 = 676 – 576 RQ2 = 100 So, RQ = 10.
7. In S, QN = 26, NR = 24, ST = SU, and NRQ is a right angle. Show that PTS NRQ. N 12 T P 5 T M P 13 U S S Cords equidistant from center MP = RN = 24. So, PT = ½(24). SP is half of the diameter QN, so SP = ½(26) = 13. R Q 122 + ST2 = 132 ST2 = 169 –144 ST2 = 25 So, ST = 5.
Step 3: Identify ratios of corresponding sides. In PTS, PT = 12, TS = 5, and PS = 13, In NRQ, NR = 24, RQ = 10, and QN = 26. Find the corresponding ratios: N T M P U S R Q Because the corresponding sides lengths are proportional (all have a ratio of ½), PTS NRQ by SSS Thrm.
