distance
APEX mayo:)
The line is x=0 otherwise known as the y-axis.
coplaner points- are points lying on his the same plane,.. solution: plane R contains XY XY contains X and Y...
In geometry, a line segment denoted as XY refers to the straight path connecting two points, X and Y, in a two-dimensional space. It has a definite length and can be represented mathematically by the coordinates of its endpoints. If extended infinitely in both directions, it can be referred to as a line, which has no endpoints and continues indefinitely. In coordinate geometry, the equation of line XY can be determined using the slope-intercept form or point-slope form based on the coordinates of points X and Y.
The change in the x-coordinates of any two points along a line in the xy-plane is referred to as the "horizontal distance" between those points. This change can be represented as Δx = x2 - x1, where x1 and x2 are the x-coordinates of the two points. This difference is crucial for determining the slope of the line, which is calculated as the change in the y-coordinates (Δy) divided by the change in the x-coordinates (Δx). A constant Δx along a line indicates a linear relationship between the x and y coordinates.
(x-1, y)
The distance postulate is such: the shortest distance between two points is a line.(xy, x-y) The distance postulate is such: the shortest distance between two points is a line.(xy, x-y)
To determine the length of XY, you need specific information such as the coordinates of points X and Y or the context in which XY is defined (like a geometric figure). Without that data, it's impossible to calculate the exact length. Please provide the necessary details for a precise answer.
The line is x=0 otherwise known as the y-axis.
Z is halfway between X and Y.
coplaner points- are points lying on his the same plane,.. solution: plane R contains XY XY contains X and Y...
In geometry, a line segment denoted as XY refers to the straight path connecting two points, X and Y, in a two-dimensional space. It has a definite length and can be represented mathematically by the coordinates of its endpoints. If extended infinitely in both directions, it can be referred to as a line, which has no endpoints and continues indefinitely. In coordinate geometry, the equation of line XY can be determined using the slope-intercept form or point-slope form based on the coordinates of points X and Y.
run
The change in the x-coordinates of any two points along a line in the xy-plane is referred to as the "horizontal distance" between those points. This change can be represented as Δx = x2 - x1, where x1 and x2 are the x-coordinates of the two points. This difference is crucial for determining the slope of the line, which is calculated as the change in the y-coordinates (Δy) divided by the change in the x-coordinates (Δx). A constant Δx along a line indicates a linear relationship between the x and y coordinates.
RUN!
[object Object]
The rule (XY)(-Xy) represents a transformation involving both reflection and rotation in the coordinate plane. The term (XY) indicates a combination of variables, while (-Xy) suggests a reflection across the x-axis due to the negative sign before X. Overall, this transformation alters the positions of the points based on the given algebraic expressions.
Using: x - 2y = 8 y = (x - 8)/2 Substituting in: xy = 24 => x(x - 8)/2 = 24 => x2 - 8x = 48 => x2 - 8x - 48 = 0 => (x - 12)(x + 4) = 0 => x = 12 or -4 => y = 2 or -6 respectively (since xy = 24) ie the points (12, 2) and (-4, -6)