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Find the area of the shaded region. Round your answer to the nearest tenth.
please help

Find the area of the shaded region. Round your answer to the nearest tenth. please-example-1
User BarathVutukuri
by
2.4k points

2 Answers

13 votes
13 votes

Answer:

38.52 cm²

Explanation:

Take the shaded area to be found into 2 parts :

  1. Left sector
  2. Top area subtended by the chord

Area of left sector

  • As the area subtended by the chord takes up an angle of 120°, the remaining angle of the semicircle is :
  • 180° - 120° = 60°
  • Area = πr² x (angle of sector)/360°
  • Area = 3.14 x (6)² x 60/360
  • Area = 3.14 x 36 x 1/6
  • Area = 3.14 x 6
  • Area = 18.84 cm²

Area subtended by top chord

  • Area (120° sector) - Area (triangle)
  • Area = πr² x θ/360 - 1/2bh
  • Area = 3.14 x 36 x 120/360 - 1/2 x 6 x 6
  • Area = 3.14 x 12 - 18
  • Area = 37.68 - 18
  • Area = 19.68 cm²

Area (shaded)

  • Area (left sector) + Area (subtended by chord)
  • 18.84 + 19.68
  • 38.52 cm²
User Porter
by
3.2k points
7 votes
7 votes

Answer:

41.0 cm^2 to nearest tenth.

Explanation:

Required area = Area of the semicircle - area of the clear triangle

Area semicircle = 0.5πr^2

= 0.5π *6^2

= 18π.

Finding Altitude h of the triangle :

cos 60 = h / 6

h = 6 cos 60 = 6 * 1/2

= 3.

Finding Base b of the triangle:

sin 60 = 0.5b / 6

0.5b = 6 * sin 60

= 5.196.

So area of the triangle = h * 0.5b

= 3 * 5.196

Area of shaded region

= 18π - 3 * 5.196

= 40.96 cm^2

User EvilSnobu
by
2.6k points