The coordinate n-space usually consists of n mutually perpendicular axis which all meet at a point called the origin. The coordinates of any point are the distances of the point along the directions of each of these axes, in order.
In 2-dimensional space, for example, there are two axes which are conventionally called the x and y axis. The x-axis is horizontal and the y-axis is vertical. The coordinates of any point are the ordered pair consisting of the distance of the point from the origin in the horizontal direction and the vertical direction.
In 3-dimensional space, there are 3 axes, and so on.
To find the coordinates of point A after being dilated by a factor of 3, you multiply the original coordinates (x, y) of point A by 3. For example, if point A has coordinates (2, 4), the new coordinates after dilation would be (2 * 3, 4 * 3) or (6, 12). Thus, the coordinates of point A after dilation depend on its original position.
Substitute the coordinates of the point into the equation of the line. If the result is true, then the point is on the line.
The x and y coordinates
If the coordinates of a point, before reflection, were (p, q) then after reflection, they will be (-p, q).
The midpoint B on line segment AC is the point that divides the segment into two equal lengths. To find the coordinates of B, you can use the midpoint formula: B = ((x₁ + x₂)/2, (y₁ + y₂)/2), where (x₁, y₁) are the coordinates of point A and (x₂, y₂) are the coordinates of point C. This point B represents the average of the coordinates of points A and C.
A point has coordinates; an angle does not.
oh my goodness not even dr.sheldon cooper can answer that
Point A has coordinates (x,y). Point B (Point A rotated 270°) has coordinates (y,-x). Point C (horizontal image of Point B) has coordinates (-y,-x).
To find the coordinates of point A after being dilated by a factor of 3, you multiply the original coordinates (x, y) of point A by 3. For example, if point A has coordinates (2, 4), the new coordinates after dilation would be (2 * 3, 4 * 3) or (6, 12). Thus, the coordinates of point A after dilation depend on its original position.
Substitute the coordinates of the point into the equation of the line. If the result is true, then the point is on the line.
The slope of a line and the coordinates of a point on the line.The slope of a line and the coordinates of a point on the line.The slope of a line and the coordinates of a point on the line.The slope of a line and the coordinates of a point on the line.
The x and y coordinates
If the coordinates of a point, before reflection, were (p, q) then after reflection, they will be (-p, q).
The coordinates of a point are in reference to the origin, the point with coordinates (0,0). The existence (or otherwise) of an angle are irrelevant.
The midpoint B on line segment AC is the point that divides the segment into two equal lengths. To find the coordinates of B, you can use the midpoint formula: B = ((x₁ + x₂)/2, (y₁ + y₂)/2), where (x₁, y₁) are the coordinates of point A and (x₂, y₂) are the coordinates of point C. This point B represents the average of the coordinates of points A and C.
If point a has coordinates (x1,y1), and point b has coordinates (x2, y2), then the slope of the line is given by the formula: m = (y2-y1)/(x2-x1).
True