The length of the arc of ABC is 22pi. You can get this answer by completing this equation 330/360*24pi, which will give you 22pi.
A central angle of 120 is one third of the circle, so the arc length of 28.61 is one third of the circumference. 28.61 X 3 = 85.83
The radius of a circle has no bearing on the angular measure of the arc: the radius can have any positive value.
If you have the arc length:where:L is the arc length.R is the radius of the circle of which the sector is part.
Find the circumference of the whole circle and then multiply that length by 95/360.
An arc length of 120 degrees is 1/3 of the circumference of a circle
47.10
It would be helpful to know " ... and 10" WHAT! Without that information the question cannot be answered.
The length of the arc of ABC is 22pi. You can get this answer by completing this equation 330/360*24pi, which will give you 22pi.
It will be 1/3 of the circle's circumference
A central angle of 120 is one third of the circle, so the arc length of 28.61 is one third of the circumference. 28.61 X 3 = 85.83
The radius of a circle has no bearing on the angular measure of the arc: the radius can have any positive value.
The triangle ABC is an equallateral triangle since angle ABC is one sixth of 360 degress of the circle and the angles BAC and BCA are equal of the remaining 180-60=120 degrees. With radius BC (or BA) being 6; the areaof the circle is pi (r)squared; 36 piArea of the circle is 36piMalcolm Lowe
The length of an arc of a circle refers to the product of the central angle and the radius of the circle.
circumference of the circle = 2*pi*10 = 20pi units of measurement length of arc = (120/360)*20pi = 20.944 units (rounded to 3 decimal places)
That will depend on the length of the arc but an arc radian of a circle is about 57.3 degrees
the fraction of the circle covered by the arc