0
If Kite ABCD is reflected across the x-axis what are the resulting coordinates of point A?
(-3,1)
progress learning/ usatestprep
What else can I help you with?
True or false a point is reflected across the y-axis the new point has a negative x cordinate?
True. When a point is reflected across the y-axis, its x-coordinate changes sign, resulting in a negative x-coordinate if the original x-coordinate was positive. For example, a point (3, 2) would be reflected to (-3, 2).
How do you reflect a figure across xa?
To reflect a figure across the line ( y = x ), you swap the coordinates of each point in the figure. For a point ((a, b)), its reflection would be ((b, a)). This process is applied to every point in the figure, resulting in the entire figure being mirrored across the line ( y = x ).
When the point 2-5 is reflected in the x-axis what are the coordinates of its image?
(2,-5) turns into 2,5
What do you need to use the point slope formula?
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.
How doe the reflection across the x axis change the coordinates pf a point?
If your points are (p,f), they become (p,-f).
How do you do the reflection across yx?
To reflect a point across the line ( y = x ), swap its x and y coordinates. For example, if the original point is ( (a, b) ), the reflected point will be ( (b, a) ). This transformation can also be applied to entire shapes by swapping the coordinates of each vertex.
When the point (-3 2) is reflected across the x-axis what is the resulting image?
When the point (-3, 2) is reflected across the x-axis, the y-coordinate changes sign while the x-coordinate remains the same. Thus, the resulting image of the point after the reflection is (-3, -2).
What happens to the coordinates when a point is reflected over the y-axis?
When a point is reflected over the y-axis, the x-coordinate changes its sign while the y-coordinate remains the same. For example, if a point has the coordinates (x, y), after reflection over the y-axis, its new coordinates will be (-x, y). This transformation effectively mirrors the point across the y-axis.
The point T(-3-6) is reflected over the line y -x. What are the coordinates of the resulting point T and acirc and 128 and sup2?
The image is at (6, 3).
True or false a point is reflected across the y-axis the new point has a negative x cordinate?
True. When a point is reflected across the y-axis, its x-coordinate changes sign, resulting in a negative x-coordinate if the original x-coordinate was positive. For example, a point (3, 2) would be reflected to (-3, 2).
What happens to a coordinate reflected across y equals x?
The x and y coordinates swap places. Thus, the point (a,b) becomes (b, a).
How do the coordinates of a point change when it is reflected over the y-axis?
me no no
Which point is the image of (-7 1) reflected across the y-axis?
To find the image of the point (-7, 1) reflected across the y-axis, you need to change the sign of the x-coordinate while keeping the y-coordinate the same. Therefore, the x-coordinate of -7 becomes 7, resulting in the reflected point being (7, 1).
How are the coordinates of a point affected by a reflection of the point over the x-axis?
When a point with coordinates ((x, y)) is reflected over the x-axis, its x-coordinate remains the same while the y-coordinate changes sign. Thus, the new coordinates of the reflected point become ((x, -y)). This transformation effectively flips the point vertically, moving it to the opposite side of the x-axis.
What is the rule for a reflection across the origin?
To reflect a point across the origin, you simply change the sign of both the x- and y-coordinates of the point. This transformation involves multiplying the coordinates by -1.
What coordinates will the point 3-2 reflected over the line yx have?
To reflect a point over the line ( y = x ), you swap its x-coordinate and y-coordinate. For the point ( (3, -2) ), the reflection over the line ( y = x ) results in the point ( (-2, 3) ). Therefore, the coordinates of the reflected point are ( (-2, 3) ).
When the point 2-5 is reflected in the x-axis what are the coordinates of its image?
(2,-5) turns into 2,5
