2 Answers

Janum Trivedi · Answer 1 · 2022-10-11T14:20:50+0000

Answer:

C. 7 units

Explanation:

The given parameters are;

The length of the chord of the circle,
$\overline{AC}$ = 14 units

The orientation of the radius and the chord = The radius is perpendicular to the chord

We have in ΔAOC,
$\overline{AO}$ =
$\overline{OC}$ = The radius of the circle

$\overline{OB}$ ≅
$\overline{OB}$ by reflexive property

The angle at point B = 90° by angle formed by the radius which is perpendiclar to the chord
$\overline{AC}$

ΔAOB and ΔCOB are right triangles (triangles having one 90° angle)

$\overline{AO}$ and
$\overline{OC}$ are hypotenuse sides of ΔAOB and ΔCOB respectively and
$\overline{OB}$ is a leg to ΔAOB and ΔCOB

Therefore;

ΔAOB ≅ ΔCOB, by Hypotenuse Leg rule of congruency

Therefore;

$\overline{AB}$ ≅
$\overline{BC}$ by Congruent Parts of Congruent Triangles are Congruent, CPCTC

$\overline{AB}$ =
$\overline{BC}$ by definition of congruency

$\overline{AC}$ =
$\overline{AB}$ +
$\overline{BC}$ by segment addition postulate

∴
$\overline{AC}$ =
$\overline{AB}$ +
$\overline{BC}$ =
$\overline{AB}$ +
$\overline{AB}$ = 2 ×
$\overline{AB}$

∴
$\overline{AB}$ =
$\overline{AC}$ /2

$\overline{AB}$ = 14/2 = 7

$\overline{AB}$ = 7 units.

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