They are collinear points that lie on the same line
The statement that is true is that both Jax and Chris drew the same line through points A and B. In geometry, a line is defined by two points, so if both individuals drew a line passing through the same two points, it means they have drawn the same line. This is a fundamental concept in geometry where a line is uniquely determined by two distinct points.
Use two line segments (line A and line B) with all points on line A equidistant from all points on line B; in otherwords, use 2 parallel lines. Choose two points on line A (points a and b). Now choose 2 points on line B (x and y) so that the distance of line ab equals the distance of line xy. Connect points a and y with a line segment ab and points b and z with a line segment bz. In simpler words, take two parallel line segments of equal length, and connect their endpoints with two other line segments.
2 lines, I believe.
If the points are (b, 2) and (6, c) then to satisfy the straight line equations it works out that b = -2 and c = 4 which means that the points are (-2, 2) and (6, 4)
1:5
We use the word "collinear" to mean points on the same line.
Points on the same line are collinear (co-linear) points.
Collinear.
The thre points A, B, and C are collinear if they are in the same line.
If points A, B, and C are not on the same line, they determine a single plane.
The statement that is true is that both Jax and Chris drew the same line through points A and B. In geometry, a line is defined by two points, so if both individuals drew a line passing through the same two points, it means they have drawn the same line. This is a fundamental concept in geometry where a line is uniquely determined by two distinct points.
Alternates are fill-in-the-blank version of this Q. are the same distance from a point and a line
Yes, straight line AB is the same as straight line BA. Both represent the same geometric line segment connecting points A and B, regardless of the order of the points. The direction does not change the line itself; thus, AB and BA are equivalent.
Three noncollinear points A, B, and C determine exactly three lines. Each pair of points can be connected to form a line: line AB between points A and B, line AC between points A and C, and line BC between points B and C. Thus, the total number of lines determined by points A, B, and C is three.
Use two line segments (line A and line B) with all points on line A equidistant from all points on line B; in otherwords, use 2 parallel lines. Choose two points on line A (points a and b). Now choose 2 points on line B (x and y) so that the distance of line ab equals the distance of line xy. Connect points a and y with a line segment ab and points b and z with a line segment bz. In simpler words, take two parallel line segments of equal length, and connect their endpoints with two other line segments.
If points B and C are collinear, it means that they lie on the same straight line. To determine if points B and C are collinear, you would need to know the coordinates or have a visual representation of the points.
If you have two points, a and b, you can draw only one line that will go through both points. Or in other words, two points define a line.