two chords intersect inside a circle. the lengths of the segment of one chord are 4 and 6. the lengths of the segments of the other chord are 3 and _
7
8
9

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sqdancefan sqdancefan · Answer 1 · 2019-01-26T17:59:56+01:00

Answer:

8

Step-by-step explanation:

The product of the segment lengths of one chord is equal to the product of the segment lengths of the other chord:

4 · 6 = 3 · 8

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ColinJacobus ColinJacobus · Answer 2 · 2019-06-05T17:29:35+02:00

Answer: The lengths of the segments of the other chord are 3 units and 8 units.

Step-by-step explanation: As shown in the attached figure below, let the chords AB and CD intersect inside the circle at the point O, where

AO = 4 units, OB = 6 units, Co = 3 units.

We are to find the length of OD.

We have the following theorem :

Intersecting Chord Theorem: When two chords intersect each other inside a circle, then the products of their segments are equal.

Applying the above theorem in the given circle, we must have

[tex]AO\times OB=CO\times OD\\\\\Rightarrow 4\times6=3\times OD\\\\\Rightarrow 24=3OD\\\\\Rightarrow OD=\dfrac{24}{3}\\\\\Rightarrow OD=8.[/tex]

Thus, the lengths of the segments of the other chord are 3 units and 8 units.