ab and bd
A vector.
A line segment has two endpoints and can be represented by two arrows, one pointing in each direction from the endpoints. However, in mathematical notation, a line segment is typically indicated without arrows, while a line is represented with arrows on both ends to show it extends infinitely. Therefore, if you consider arrows as indicators of direction, a line segment effectively has no arrows, but conceptually can be associated with the two endpoints it connects.
The geometric term for the edge of a desk is a "line segment." In geometry, a line segment is a part of a line that is bounded by two distinct endpoints. In this case, the edge of the desk can be represented as a line segment where the two endpoints are where the edge begins and ends.
The symbol for bisect is typically represented by a line segment with a point in the middle, indicating that it divides the segment into two equal parts. In mathematical notation, the term "bisect" may also be denoted using the symbol "∠" for angles, or simply by stating that a segment or angle is bisected. For example, if line segment AB is bisected at point C, it can be expressed as AC = CB.
The length of a line segment can indeed be measured, as it is defined as the distance between its two endpoints. This measurement can be accomplished using various tools, such as a ruler or a measuring tape. However, if the line segment is defined in a mathematical context, such as in abstract geometry, its length may be represented symbolically rather than physically measured. Ultimately, in practical terms, the length of a line segment can always be quantified.
A vector.
Each segment of the circle graph represent a part of the whole.
Since B is located between A and C, you can just add the two lengths together, so AC = m + n.your segment looks like this:A----B----Cwhere AB=m, BC=n, and AC=m+n
A graph drawing in which each edge is represented by a polyline, each segment of which is parallel to a coordinate axis.
The geometric term for the edge of a desk is a "line segment." In geometry, a line segment is a part of a line that is bounded by two distinct endpoints. In this case, the edge of the desk can be represented as a line segment where the two endpoints are where the edge begins and ends.
A line segment is a straight path that connects two points. It is finite in length and does not extend infinitely in both directions, unlike a line. A line segment is commonly represented by a line with a start point and an end point.
A line is a group of points on a straight path that extends to infinity on both sides and is represented by a straight line with arrows on both sides.A line segment is PART OF A LINE that has two endpoints and does not keep on extending. It is represented by a straight line with two points at both ends.A ray is also a PART OF A LINE that has one end point and one end that keeps on extending infinitely. It is represented by a straight line with a point at one end and an arrow on the other.
A line segment in math is a straight line that connects two points. It has a starting point and an ending point, and it does not continue infinitely in both directions like a line does. A line segment is represented by a line with a starting point and an ending point marked with endpoints.
A triangle, with one of the complex numbers represented by a line from the origin to the number, and then move from that point up and over the amount of the next complex number. Then draw a line segment from the origin to the final point.
As long as the line represented on the graph has no vertical segments then it may be represented by a function. * * * * * That is not enough. y = sqrt(x) has no vertical segments but it is not a function in the mathematical sense. A function cannot map an x value to more than one y value. Clearly, the above function maps x to -sqrt(x) and +sqrt(x) and so is not a function. However, there no vertical segment. No matter how close you get to x = 0, there is still a curve and the segment is not vertical.
In mathematics, a 1-dimensional object is an object that can be represented as a line segment. In physics, a particle can be considered as a 1-dimensional object because its position is described by a single coordinate.
Nothing "does" a segment and, being inanimate, a segment does nothing.