4.12 Proportional Segments in Circles = 8.9 mcher 5x- 215 10 (50-(4)- 2560 16 AC Find ACS(act =AB}- (BỜ AB $50m. 2. вс -16x Theorem 63 +16x2 If two chords intersect within a circle, then the product òf the seg- ments of one is equal to the product of the segments of the other. 100 * 3x, BC = 4x B Fiad BCÁYA iwToricounetminio 2 700 Given: Circle O and chords AB and CD intersecting in P 2 SIC 25 Prove: Proof. Develop in class. AP x PB = CP × PD 10 %3D 24 #レーFnd AD AT 25Corollary 63-1 14.4 DC DB 9.2 The product of the segments of any chord through a fixed point 19.8 14.440within a circle is constant.
4.12 Proportional Segments in Circles = 8.9 mcher 5x- 215 10 (50-(4)- 2560 16 AC Find ACS(act =AB}- (BỜ AB $50m. 2. вс -16x Theorem 63 +16x2 If two chords intersect within a circle, then the product òf the seg- ments of one is equal to the product of the segments of the other. 100 * 3x, BC = 4x B Fiad BCÁYA iwToricounetminio 2 700 Given: Circle O and chords AB and CD intersecting in P 2 SIC 25 Prove: Proof. Develop in class. AP x PB = CP × PD 10 %3D 24 #レーFnd AD AT 25Corollary 63-1 14.4 DC DB 9.2 The product of the segments of any chord through a fixed point 19.8 14.440within a circle is constant.
Mathematics For Machine Technology
8th Edition
ISBN:9781337798310
Author:Peterson, John.
Publisher:Peterson, John.
Chapter59: Areas Of Rectangles, Parallelograms, And Trapezoids
Section: Chapter Questions
Problem 79A
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Express answers as radicals and fractions of applicable. I'm not sure this one is related to Theorem 63 or not, I will put the picture with it (just in case). The picture might be a little messy, sorry about that.
Find the length of the shortest chord through a point 5 inches from the center of a
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