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13 votes
13 votes
a circle O has a chord length of 24 ft anda perpendicular distance from the center of the chord of 5 ft find the radius

User Ihightower
by
3.4k points

1 Answer

23 votes
23 votes

Answer:

13 ft

Explanation:


  • l(chord) = 24\: ft (Given)


  • l(perpendicular) = 5\: ft (Given)

  • Perpendicular dropped from the center of the circle to the chord bisects the chord.


  • \implies (1)/(2)l(chord) = 12\: ft

  • Let the
    l(radius) be r ft.

  • Radius of the circle, perpendicular to the chord and half of chord forms a right triangle where r represents the hypotenuse. Thus, by Pythagoras Theorem:


  • r=\sqrt{{[(1)/(2)l(chord)]}^2+{[l(perpendicular)]}^2}


  • \implies r=\sqrt{{12}^2+{5}^2}


  • \implies r=√(144+25)


  • \implies r=√(169)


  • \implies r= 13\: ft
User Salsa
by
3.3k points
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