It depends on where arc AC is.
the measure of a minor arc equals the measure of the central angle that intercepts it.
The angle measure is: 90.01 degrees
30
a minor arc measures less than 180 degrees...
It depends on what measure related to the arc you want to find!
If the measure of minor arc AC is 96 degrees, then the measure of angle ABC, which is inscribed in the circle and subtends arc AC, can be found using the inscribed angle theorem. This theorem states that the measure of an inscribed angle is half the measure of the arc it subtends. Therefore, the measure of angle ABC is 96 degrees / 2 = 48 degrees.
150 degrees
No, arc measure is an ambiguous expression since it could also refer to the angular measure of the arc.
No, arc measure is an ambiguous expression since it could also refer to the angular measure of the arc.
pi x 6 x radius (ab or bc). Circumference is 2pir, 30 degree arc is 1/12 of circumference. In radian measure 30/57.3 ie 0.52 radians.
The measure of an arc is part of the circumference of a circle
Arc measure is the number of radians. Two similar arcs could have the same arc measure. Arc length is particular to the individual arc. One must consider the radius of the arc in question then multiply the arc measure (in radians) times the radius to get the length.
To find the measure of a major arc in a circle, first determine the measure of the corresponding minor arc, which is the smaller arc connecting the same two endpoints. The measure of the major arc is then calculated by subtracting the measure of the minor arc from 360 degrees. For example, if the minor arc measures 120 degrees, the major arc would measure 360 - 120 = 240 degrees.
major arc
the measure of a minor arc equals the measure of the central angle that intercepts it.
No, in order to fine the arc length you need a formula which is: Circumference x arc measure/360 degrees
Yes, they are.