If the sector of a circle has a central angle of 50 and an area of 605 cm2, the radius is: 37.24 cm
Find the area of the shaded sector. radius of 3 ...A+ = 7.07
6.46
6.46
If the angle at the centre is 60° then the sector occupies 1/6 of the circle as 60/360 = 1/6. The area of a circle = πr² The area of the sector = 1/6.π3² = 9/6.π = 4.712 square units.
The area of the sector is: 221.2 cm2
The area of the sector of the circle formed by the central angle is: 37.7 square units.
Area of a sector of a circle = (pi) x (radius)2 x (central angle of the sector / 360)
Find the area of the shaded sector. radius of 3 ...A+ = 7.07
6.46
19.23
6.46
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
6.5
324.47 square feet
Radius: A line from the center of a circle to a point on the circle. Central Angle: The angle subtended at the center of a circle by two given points on the circle.
the radius
You can draw exactly four of the those right-angled sectors in a circle. The definition of a sector is quoted as "the portion of a circle bounded by two radii and the included arc". The circumference of a circle = 2*pi*radius. The arc of each sector will be 0.5*pi*radius.