Question
If (a, b) is reflected in the line y = x, its image is the point_________.
- (b, a)
- (-a, b)
- (a, -b)
- (-a, -b)
Hint:
General synopsis of reflection of a point with respect to a line y=x.
The correct answer is: (b, a)
* In Geometry, a reflection is known as a flip. A reflection is a mirror image of the shape. An image will reflect through a line, known as the line of reflection.
*It is a type of transformation that produces mirror image of the shape.
The reflection transformation can be done in many ways.
*Reflection over X-axis
*Reflection over Y-axis
*Reflection over Y = X
Given That:
If (a, b) is reflected in the line y = x, its image is the point
>>>when a point in the plane is being reflected on the line y=x, the point shifts to the opposite quadrant.
>>>>Therefore, the coordinates of the points changes.
>>>Hence, when the point (a, b) is reflected in the line y=x, its image becomes (b, a).
If (a, b) is reflected in the line y = x, its image is the point (b, a).
Related Questions to study
Graph the image of the triangle ABC, if A (-4,0), B (-3,3) and C (-1,2), which is reflected along y-axis.
If (a, b) is reflected in the y-axis, its image is the point (-a, b).
(a, b) → (-a, b)
A (-4, 0) → A’ (4, 0)
B (-3, 3) → B’ (3, 3)
C (-1, 2) → C’ (1, 2)
Image coordinates of the triangle ABC are A’ (4, 0), B’ (3, 3) and C’ (1, 2).
Graph the image of the triangle ABC, if A (-4,0), B (-3,3) and C (-1,2), which is reflected along y-axis.
If (a, b) is reflected in the y-axis, its image is the point (-a, b).
(a, b) → (-a, b)
A (-4, 0) → A’ (4, 0)
B (-3, 3) → B’ (3, 3)
C (-1, 2) → C’ (1, 2)
Image coordinates of the triangle ABC are A’ (4, 0), B’ (3, 3) and C’ (1, 2).
Find the image coordinates of the triangle ABC, if A (-4, 0), B (-3, 3) and C (-1, 2), which is reflected along y = x.
If (a, b) is reflected in the line y = x, its image is the point (b, a).
(a, b) → (b, a)
A (-4, 0) → A’ (0, -4)
B (-3, 3) → B’ (3, -3)
C (-1, 2) → C’ (2, -1)
Image coordinates of the triangle ABC are A’ (0, -4), B’ (3, -3) and C’ (2, -1).
Find the image coordinates of the triangle ABC, if A (-4, 0), B (-3, 3) and C (-1, 2), which is reflected along y = x.
If (a, b) is reflected in the line y = x, its image is the point (b, a).
(a, b) → (b, a)
A (-4, 0) → A’ (0, -4)
B (-3, 3) → B’ (3, -3)
C (-1, 2) → C’ (2, -1)
Image coordinates of the triangle ABC are A’ (0, -4), B’ (3, -3) and C’ (2, -1).
Find the image coordinates of the line AB, if A (2,3) and B (2,5), which is reflected along x-axis.
If (a, b) is reflected in the x-axis, its image is the point (a, -b).
A (2,3) → A’ (2, -3)
B (2,5) → B’ (2, -5)
Image of the points A’ (2, -3), B’ (2, -5)
Find the image coordinates of the line AB, if A (2,3) and B (2,5), which is reflected along x-axis.
If (a, b) is reflected in the x-axis, its image is the point (a, -b).
A (2,3) → A’ (2, -3)
B (2,5) → B’ (2, -5)
Image of the points A’ (2, -3), B’ (2, -5)
Graph the reflection of the polygon in the given line: x= -1
Point A is 5 units to the left of the line, so its reflection is 5 units to the right of the line at A’ (4, -4).
Point B is 4 units to the left of the line, so its reflection is 4 units to the right of the line at B’ (3, -1).
Point C is 2 units to the left of the line, so its reflection is 2 units to the right of the line at C’ (1, -2).
>>>Plot the points to obtain the graph.
Graph the reflection of the polygon in the given line: x= -1
Point A is 5 units to the left of the line, so its reflection is 5 units to the right of the line at A’ (4, -4).
Point B is 4 units to the left of the line, so its reflection is 4 units to the right of the line at B’ (3, -1).
Point C is 2 units to the left of the line, so its reflection is 2 units to the right of the line at C’ (1, -2).
>>>Plot the points to obtain the graph.
The vertices of a triangle are A (2,3), B (6,1) and C (7,5). Graph the reflection of the triangle ABC in the line x = 3.
The result of flipping a triangle on a line of reflection based on a coordinate system is a figure known as a triangle reflection. Therefore, it's crucial to understand the following terminology when researching and working on the reflection of polygons, such as the triangle:
Pre-image: The primary image, in this case, is a triangle, which is reflected across a line.
Image: The triangle being reflected and the result after being reflected again. To reflect a triangle, you must first reflect the three points that make up each triangle over the line of reflection and then use the algebraic reflection properties on each coordinate.
¶In a triangle reflection, the pre-point image and the image's point are at the same distance from the line of reflection. Something is one method of doing this correctly.
The vertices of a triangle are A (2,3), B (6,1) and C (7,5). Graph the reflection of the triangle ABC in the line x = 3.
The result of flipping a triangle on a line of reflection based on a coordinate system is a figure known as a triangle reflection. Therefore, it's crucial to understand the following terminology when researching and working on the reflection of polygons, such as the triangle:
Pre-image: The primary image, in this case, is a triangle, which is reflected across a line.
Image: The triangle being reflected and the result after being reflected again. To reflect a triangle, you must first reflect the three points that make up each triangle over the line of reflection and then use the algebraic reflection properties on each coordinate.
¶In a triangle reflection, the pre-point image and the image's point are at the same distance from the line of reflection. Something is one method of doing this correctly.
Graph the reflection of the polygon in the given line: x- axis.
If (a, b) is reflected in the x-axis, its image is the point (a, -b).
A (2,3) → A’ (2, -3)
B (6,1) → B’ (6, -1)
C (7,5) → C’ (7, -5)
>>>Therefore, the points of reflection of the given polygon are: (2,-3); (6,-1); (7,-5).
Graph the reflection of the polygon in the given line: x- axis.
If (a, b) is reflected in the x-axis, its image is the point (a, -b).
A (2,3) → A’ (2, -3)
B (6,1) → B’ (6, -1)
C (7,5) → C’ (7, -5)
>>>Therefore, the points of reflection of the given polygon are: (2,-3); (6,-1); (7,-5).
If (a, b) is reflected in the y-axis, its image is the point _____.
If (a, b) is reflected in the y-axis, its image is the point (-a, b)
If (a, b) is reflected in the y-axis, its image is the point _____.
If (a, b) is reflected in the y-axis, its image is the point (-a, b)
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