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Is a sector of a circle is a region bounded by a central angle and its corresponding center?
No. A sector is bounded by part two radii and part of the circumference.
Is A of a circle is a region bounded by an arc of a circle and radii to the end points of the arc?
A sector of a circle would fit the given description
What is a region bounded by two arcs of a circle and two radii?
Circular Ring Sector.
What is a region bounded by an arc and two radii to the arcs endpoint?
The region bounded by an arc and two radii to the arc's endpoints is known as a sector of a circle. It resembles a "slice" of the circle, with the arc serving as the curved edge and the two radii as the straight edges extending from the center of the circle to the endpoints of the arc. The area of this sector can be calculated based on the angle subtended by the arc at the center and the radius of the circle.
What is the region bounded by an arc and it's two radii?
The region bounded by an arc and its two radii is known as a sector of a circle. This sector represents a "slice" of the circle, defined by the two radii that extend from the center of the circle to the endpoints of the arc. The area of this sector can be calculated using the formula ( \frac{1}{2} r^2 \theta ), where ( r ) is the radius and ( \theta ) is the angle in radians.
What is the region of a circle bounded by a central angle and its corresponding arc called?
It is called a sector.
Is a sector of a circle is a region bounded by a central angle and its corresponding center?
No. A sector is bounded by part two radii and part of the circumference.
A of a circle is a region bounded by an arc of a circle and radii to the endpoints of the arc?
sector
Is A of a circle is a region bounded by an arc of a circle and radii to the end points of the arc?
A sector of a circle would fit the given description
What is a region bounded by two arcs of a circle and two radii?
Circular Ring Sector.
What is a region bounded by an arc and two radii to the arcs endpoint?
The region bounded by an arc and two radii to the arc's endpoints is known as a sector of a circle. It resembles a "slice" of the circle, with the arc serving as the curved edge and the two radii as the straight edges extending from the center of the circle to the endpoints of the arc. The area of this sector can be calculated based on the angle subtended by the arc at the center and the radius of the circle.
What is the region bounded by an arc and it's two radii?
The region bounded by an arc and its two radii is known as a sector of a circle. This sector represents a "slice" of the circle, defined by the two radii that extend from the center of the circle to the endpoints of the arc. The area of this sector can be calculated using the formula ( \frac{1}{2} r^2 \theta ), where ( r ) is the radius and ( \theta ) is the angle in radians.
What is the area of the region bounded by its inscribe and circumscribe circle whose side of a square is 10cm?
If I understand your question correctly, you would need to subtract the area of the inscribed circle from the circumscribed circle. Which would approximately be 78.60cm squared.
What is the region bounded by an arc and a chord?
The region bounded by an arc and a chord is known as a "segment" of a circle. This segment includes the area enclosed by the chord and the arc connecting the endpoints of the chord. The segment can vary in size depending on the length of the chord and the curvature of the arc. If the chord is a diameter, the segment is known as a semicircle.
What is the definition of bounded region?
A bounded region refers to a region in a coordinate plane that can be contained within a finite area and can be enclosed by a finite number of points or curves. In other words, a bounded region has a definite boundary that does not extend infinitely in any direction.
What is the difference between sector and quadrant of a circle in math?
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.
What is a region bounded by an arc of a circle and two radii?
sectorsThis is a "sector" of the circle. We usually visualize it as a wedge of pie. But by the definition, it can be a quarter of the disk, a half of the disk, or as close to the full disk as you want, but just not the whole disk.
