fulse
That would certainly do it.
Multiply ( pi R2 ) by [ (angle included in the sector) / 360 ].
It is found by: (sector area/entire circle area) times 360 in degrees
Yes as for example in the case of a sector of a circle.
You have to remember that the complete circle is 360°.When they tell you that the sector is some percent of the circle, it's the same percent of 360° !Example:A sector is 40 percent of the circle. How many degrees is it ?40 percent is the same as 0.40Multiply (0.40 x 360°) and you get 144°. Is that cool ? !
Area of sector/Area of circle = Angle of sector/360o Area of sector = (Area of circle*Angle of sector)/360o
No. Assuming the measure of the arc is in some units of length along the curve, you have to divide the result by the circumference of the circle. Basically, you need to multiply the area of the whole circle by the fraction of the whole circle that the sector accounts for.
sector
That would certainly do it.
Divide the area of the sector by 360 and multiply it to the area. The area of the sector is 5 square inches.
Multiply ( pi R2 ) by [ (angle included in the sector) / 360 ].
Multiply ( pi R2 ) by [ (angle included in the sector) / 360 ].
Sector
Divide the angle sector by 360 and multiply it by 24 square meters. The area is equal to 3 square meters.
6.5
For A+ it's 20
It is found by: (sector area/entire circle area) times 360 in degrees