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A chord of a circle is 56cm long. The distance of the chord to the centre of the circle is 20cm. a) calculate the radius of the circle b) calculate the length of a chord which is 24cm from the center of the circle.​

User Sergey Repin
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1 Answer

27 votes
27 votes

Answer:

  • a) 34.4 cm,
  • b) 49.4 cm

Explanation:

The distance from the center to the chord is the perpendicular bisector of the chord.

The three segments form a right triangle:

  • The radius - hypotenuse,
  • The half-length of the chord - leg,
  • The distance to the chord - another leg.

a) Use Pythagorean to find the radius:

  • r² = (56/2)² + 20²
  • r² = 28² + 20²
  • r² = 1184
  • r = √1184
  • r = 34.4 cm (rounded)

b) Let the half-chord is x cm long. Use Pythagorean to find the missing leg:

  • 34.4² = x² + 24²
  • 1184 = x² + 576
  • x² = 1184 - 576
  • x² = 608
  • x = √608
  • x = 24.7 cm (rounded)

The length of the chord is:

  • 24.7*2 = 49.4 cm
User Mark Lyons
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