Properties of chords. leave answer in simplest form. DONT TAKE FOREVER TO ANSWER

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asked Feb 17, 2023 167k views

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Eveningsun · Answer 1 · 2023-02-23T15:09:31+0000

Let's put more details in the figure to better understand the problem:

To be able to determine DC, let's treat this as two similar triangles and apply ratio and proportion.

We get,

$\text{ }\frac{\text{ AB}}{\text{ OB}}\text{ = }\frac{\text{ EF}}{\text{ OE}}$
$(18)/(12)\text{ = }\frac{x}{\text{ 10}}$
$\frac{18\text{ x 10}}{12}\text{ = }x$
$(180)/(12)\text{ = }x$
$15\text{ = }x$
$\text{ FE = 15}$

If a diameter or radius is perpendicular to a chord, then it bisects the chord and its arc. Therefore, we can say that FE = ED.

Determining the length of FD, we get:

$\text{ FE + ED = FD}$
$\text{ FE + FE = FD}$
$\text{ 15 + 15 = FD}$
$\text{ FD = 30}$

Therefore, FD = 30

Properties of chords. leave answer in simplest form. DONT TAKE FOREVER TO ANSWER-example-1

Properties of chords. leave answer in simplest form. DONT TAKE FOREVER TO ANSWER

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