Calculate the percentage of a sector relative to the budge total. The angle for that sector is 3.6 times the percentage.
Area of sector/Area of circle = Angle of sector/360o Area of sector = (Area of circle*Angle of sector)/360o
area of sector = (angle at centre*area of circle)/360
If the sector of a circle has a central angle of 50 and an area of 605 cm2, the radius is: 37.24 cm
(pi * radius squared) * ( sector angle / 360 )
Find the area of the shaded sector. radius of 3 ...A+ = 7.07
Multiply ( pi R2 ) by [ (angle included in the sector) / 360 ].
Area of sector/Area of circle = Angle of sector/360o Area of sector = (Area of circle*Angle of sector)/360o
Multiply ( pi R2 ) by [ (angle included in the sector) / 360 ].
area of sector = (angle at centre*area of circle)/360
With a protractorif it is a computer generated pie chart, find the fraction, and divide into 360
26.17
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.
It depends on what else is known about the sector: length of arc, area or some other measure.
By using a protractor and finding the angle between the two radii
government board
The bike stem angle chart provides information on the angle at which the stem of a bicycle is positioned in relation to the handlebars. This can affect the rider's comfort and performance on the bike. The chart typically includes different angle options and their corresponding effects on the rider's posture and handling of the bike.
If the sector of a circle has a central angle of 50 and an area of 605 cm2, the radius is: 37.24 cm