Yes
In mathematics, a sector of a circle is a region bounded by two radii and the arc between them, resembling a "slice" of the circle. It is defined by a central angle and represents a portion of the circle's area. A quadrant, on the other hand, specifically refers to one of the four equal sections of a circle, each created by dividing it with two perpendicular diameters. Essentially, while all quadrants are sectors, not all sectors are quadrants.
they are called sectors :)
45 degrees.
shaded sectors do not appear on listings
A sector in a circle is a portion of the circle defined by two radii and the arc that lies between them. It resembles a "slice" of the circle and is often described in terms of its central angle, which is the angle formed by the two radii. The area of a sector can be calculated using the formula ( A = \frac{\theta}{360} \times \pi r^2 ), where ( \theta ) is the central angle in degrees and ( r ) is the radius of the circle. Sectors are commonly used in geometry and various applications, such as in pie charts.
Two sectors - leaving out the possibility that the sector equals the whole circle.
shaded sectors do not appear on listings
In mathematics, a sector of a circle is a region bounded by two radii and the arc between them, resembling a "slice" of the circle. It is defined by a central angle and represents a portion of the circle's area. A quadrant, on the other hand, specifically refers to one of the four equal sections of a circle, each created by dividing it with two perpendicular diameters. Essentially, while all quadrants are sectors, not all sectors are quadrants.
they are called sectors :)
A circle, semicircle, segments or sectors of circle, ellipse, segments or sectors of ellipses, cardiods, closed convex wriggly shapes.
45 degrees.
shaded sectors do not appear on listings
it is a circle graph
Track
Data collected and collated into sectors of a circle
Data collected and collated into sectors of a circle
A circular sector is formed by two radii and an arc. And the angle formed due to the two radii is central angle(Θ). Area of a sector = (Θ/360) πr2.If we divide a circle into seven sectors having equal central angles then the circle is divided into seven equal parts.Angle of the whole circle is 360o. So we should divide the whole angle into 7 equal parts each measuring 360o/7 and then forming the corresponding sectors.