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A point is located at 2,-3 if you reflected that over the x-axis what would the new coordinates be?
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What else can I help you with?
When solving a system of equations by elimination What would you want to get?
The coordinates (x,y). It is the point of intersection.
How the Triangle ABC is shown on the graph. What are the coordinates of the image of point B after the triangle is rotated 270 and deg about the origin?
That would depend on its original coordinates and in which direction clockwise or anti clockwise of which information has not been given.
In which quadrant would the point 8 0 be located?
The point (8,0) is on an axis (abscissa axis or x-axis) and is therefore not in a quadrant.
Where is 23 N 82 W?
Havana, Cuba
If a figure is reflected across line m and then across line n the transformation would be?
chicken wings
If abc is reflected across the y-axis what are the coordinates of a?
If point ( a ) has coordinates ((x, y)), its reflection across the y-axis would change the x-coordinate to its negative, resulting in the new coordinates ((-x, y)). Therefore, the coordinates of point ( a ) after reflection across the y-axis would be ((-x, y)).
If a2 5 is reflected over the y-axis what are the coordinates of a?
Your new coordinates would be -2,5.
Triangle 2 is a reflection over the x-axis of triangle 1. Point A of triangle 1 is (-6 -1). What would be the coordinates of point A'?
To find the coordinates of point A' of triangle 2, which is a reflection of point A over the x-axis, you need to change the sign of the y-coordinate while keeping the x-coordinate the same. Since point A is at (-6, -1), the reflected point A' will have coordinates (-6, 1).
How do the coordinates change when an object is reflected across the x axis?
When an object is reflected across the x-axis, the y-coordinate of each point changes sign while the x-coordinate remains the same. For example, a point with coordinates (x, y) would be reflected to (x, -y). This transformation effectively flips the object over the x-axis, creating a mirror image of the original object in the opposite half of the coordinate plane.
What is the coordinates when reflect over x axis?
When a point with coordinates ((x, y)) is reflected over the x-axis, its new coordinates become ((x, -y)). This means that the x-coordinate remains the same while the y-coordinate changes its sign. For example, if the original point is ((3, 4)), its reflection over the x-axis would be ((3, -4)).
What are the coordinates of point W on the final image?
To provide the coordinates of point W on the final image, I would need specific details about the image or a description of the context in which point W is located. Please share additional information or a reference to the image, and I’d be glad to help!
What are the coordinates of point a after being dilated by a factor of 3?
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.
Which translation matrix would leave a point where it is currently located?
A translation matrix that would leave a point where it is currently located is the identity translation matrix, which adds zero to the coordinates of the point. In a 2D space, this matrix can be represented as: [ \begin{pmatrix} 1 & 0 & 0 \ 0 & 1 & 0 \ 0 & 0 & 1 \end{pmatrix} ] For a point ((x, y)), applying this matrix results in the same coordinates ((x, y)).
When a line is reflected over the Y Axis the result is?
When a line is reflected over the Y-axis, the x-coordinates of all points on the line change sign, while the y-coordinates remain the same. For example, a point (x, y) would become (-x, y) after reflection. This transformation effectively flips the line horizontally, maintaining its slope but altering its position in the Cartesian plane.
Which quadrant would these coordinates be located (3-2)?
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What city is 2s37e?
The coordinates "2s37e" do not correspond to a city. Instead, they are geographical coordinates that specify a location on the Earth's surface, indicating a point 2 degrees south latitude and 37 degrees east longitude. You would need additional information to determine the city located at those coordinates.
How do you find coordinate's dilated?
To find the coordinates of a point after dilation, you multiply the original coordinates by the scale factor. If the point is represented as ( (x, y) ) and the scale factor is ( k ), the new coordinates become ( (kx, ky) ). If the dilation is from a center point other than the origin, you would first subtract the center coordinates from the point, apply the scale factor, and then add the center coordinates back to the result.
