2 Answers

Stevejpurves · Answer 1 · 2018-01-09T20:37:03+0000

Sector area= 0.5 r^2 * theta (in radians)

arc length = r*theta
3=r*(0.7854)
r=3.82

sector area= 0.5 * (3.82)^2 * 0.7854 = 5.73 sq ft

Austinheiman · Answer 2 · 2018-01-15T00:59:41+0000

Answer:

Area of the sector = 5.73 feet²

Explanation:

An arc length is 3 feet is cut off by a central angle of
$(\pi )/(4)$

We have to find the area of the sector formed.

Area of the sector formed =
$(1)/(2)r^(2)\theta$

If the arc length = 3 feet

Central angle =
$(\pi )/(4)$

Since arc length =
$r\theta$

3 = r(\frac{\pi }{4})

r =
$(3)/((\pi )/(4))=((3)(4))/(\pi )=(12)/(\pi )$

Now area of the sector =
$(1)/(2)((12)/(\pi ))^(2)(\pi )/(4)$

=
$(1)/(2)((144)/(\pi ^(2)))((\pi )/(4))$

=
$(144)/(\pi ^(2))((\pi )/(8))$

=
$(18)/(\pi )$

=
(18)/(3.14)=5.73 square feet

Therefore, area of the sector formed is 5.73 feet²

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