That will depend on the length of its arc which has not been given
the area of a sector = (angle)/360 x PI x radius x radius pi r squared
To find the area of a sector when only the radius is given, you'll need to know the angle of the sector in either degrees or radians. The formula for the area of a sector is ( A = \frac{1}{2} r^2 \theta ), where ( r ) is the radius and ( \theta ) is the angle in radians. If the angle is not provided, the area cannot be determined solely with the radius.
The area of the sector of a circle with a radius of 2 inches and an arc of 60 degrees: 2.094 square inches.
The radius is 8 feet.
The area of a circle is derived from Pi x r2 where Pi = 3.14 and r = the radius, therefore a circle with an area of 662.89 has a radius of 14.5
Find the area of the shaded sector. radius of 3 ...A+ = 7.07
0. There is no circle so no shaded area of a circle!
if a circle has a radius of 12cm and a sector defined by a 120 degree arc what is the area of the sector
the area of a sector = (angle)/360 x PI x radius x radius pi r squared
the formula for the area of a sector is measure of arc/360 times (pi)(radius squared) it should come out to be about 1.046 or 1.047, or 1/3(pi) the formula for the area of a sector is measure of arc/360 times (pi)(radius squared) it should come out to be about 1.046 or 1.047, or 1/3(pi)
if given the central angle and the area of the circle, then by proportion: Given angle / sector area = 360 / Entire area, then solve for the sector area
The area of a sector of a circle with radius 12 and arc length 10pi is: 188.5 square units.
The area of the shaded sector is: 245.7 square units.
It depends on what information you have: the radius and the area of the sector or the length of the arc.
The area of the sector of a circle with a radius of 2 inches and an arc of 60 degrees: 2.094 square inches.
The area of a sector in a circle if the radius is 4 cm and the arc has degree 120 is: 16.76 cm2
Area of a sector of a circle = (pi) x (radius)2 x (central angle of the sector / 360)