what is the cross section of a circle vertically
The cross section of a circle vertically, also known as a vertical cross section, is a representation of the circle when it is sliced vertically through its center. This results in a straight line segment that passes through the center of the circle. The cross section is perpendicular to the horizon and appears as a chord or diameter of the circle when viewed from the side.
The cross section of a circle vertically is a line segment (or a point) that is perpendicular to the base and passes through the center of the circle. When a vertical plane intersects a circle, the resulting cross section is a straight line that passes through the center of the circle, regardless of its position or angle of intersection.
The cross section of a circle taken vertically is a line segment. To understand this concept, you can imagine slicing through a circle from top to bottom with a vertical plane. The resulting shape would be a line segment that starts at the top of the circle and ends at the bottom, passing through its center.
To determine the length of the line segment, you can use basic geometry. The length would be equal to the diameter of the circle since the line segment passes through the center. If you know the radius (half the diameter) of the circle, you can use it to calculate the length of the line segment by multiplying the radius by 2.
In summary, the cross section of a circle taken vertically is a line segment, and its length is equal to twice the radius of the circle.