if your new house location is 10, -6 8, -6 7, -6 9, -6 4, -6 is this transformation congruent to the neighbor’s house across the street from you? Explain your answer
To determine if the new house location is congruent to the neighbor’s house across the street, we need to compare the corresponding coordinates of both locations.
The coordinates of the new house location are:
10, -6
8, -6
7, -6
9, -6
4, -6
The coordinates of the neighbor’s house across the street are not provided, so it is impossible to compare them and determine if the transformation is congruent.
-4, -5 -5, -5 -1, -5 -2, -5 -7, 5
Thank you for providing the coordinates of the neighbor’s house across the street.
The coordinates of the new house location are:
10, -6
8, -6
7, -6
9, -6
4, -6
The coordinates of the neighbor’s house across the street are:
-4, -5
-5, -5
-1, -5
-2, -5
-7, 5
Comparing the corresponding coordinates, we can see that the y-coordinate of the new house is -6 for all the points, while the y-coordinate of the neighbor’s house is -5 for all the points.
Therefore, the new house location is not congruent to the neighbor’s house across the street because the corresponding y-coordinates are different.
is this congruent -4, 6 -3, 5 2 , -4 6, -4 5, -3 and (2,3), B (4,3), C (4,5), D (3,6), and E (2,5).
To determine if the given points are congruent, we need to compare the corresponding coordinates of each pair of points.
The given points are:
A: -4, 6
B: -3, 5
C: 2, -4
D: 6, -4
E: 5, -3
Let's compare them to the points:
B: 4, 3
C: 4, 5
D: 3, 6
E: 2, 5
Comparing the x-coordinates:
A.x = -4
B.x = 4
These points have different x-coordinates, so they are not congruent.
Comparing the y-coordinates:
A.y = 6
B.y = 3
These points have different y-coordinates, so they are not congruent.
By comparing the corresponding coordinates of A and B, we can conclude that these points are not congruent. Similarly, if we compare the other points with the given points, we will find that none of them are congruent.
Therefore, none of the points (A, B, C, D, E) are congruent to the given points.
-4, -5 -5, -5 -1, -5 -2, -5 -7, 5 and -4, 6 -3, 5 2 , -4 6, -4 5, -3 are they congreuant
To determine if two sets of points are congruent, we need to compare the corresponding coordinates of each pair of points.
The first set of points is:
A: -4, -5
B: -5, -5
C: -1, -5
D: -2, -5
E: -7, 5
The second set of points is:
A: -4, 6
B: -3, 5
C: 2, -4
D: 6, -4
E: 5, -3
Comparing the x-coordinates:
For point A, the x-coordinate is the same in both sets (-4).
For point B, the x-coordinate is different in both sets (-5 and -3).
For point C, the x-coordinate is different in both sets (-1 and 2).
For point D, the x-coordinate is different in both sets (-2 and 6).
For point E, the x-coordinate is the same in both sets (-7).
Since the x-coordinates are not always the same, the two sets of points are not congruent.
Therefore, the points (-4, -5), (-5, -5), (-1, -5), (-2, -5), (-7, 5) and (-4, 6), (-3, 5), (2, -4), (6, -4), (5, -3) are not congruent to each other.
10, -6 9, -6 4, -6 6, -6 7, -6 and -4, 6 -3, 5 2 , -4 6, -4 5, -3
To determine if two sets of points are congruent, we need to compare the corresponding coordinates of each pair of points.
The first set of points is:
A: 10, -6
B: 9, -6
C: 4, -6
D: 6, -6
E: 7, -6
The second set of points is:
A: -4, 6
B: -3, 5
C: 2, -4
D: 6, -4
E: 5, -3
Comparing the x-coordinates:
For point A, the x-coordinate is different in both sets (10 and -4).
For point B, the x-coordinate is different in both sets (9 and -3).
For point C, the x-coordinate is different in both sets (4 and 2).
For point D, the x-coordinate is the same in both sets (6).
For point E, the x-coordinate is different in both sets (7 and 5).
Comparing the y-coordinates:
For point A, the y-coordinate is different in both sets (-6 and 6).
For point B, the y-coordinate is different in both sets (-6 and 5).
For point C, the y-coordinate is different in both sets (-6 and -4).
For point D, the y-coordinate is the same in both sets (-6).
For point E, the y-coordinate is different in both sets (-6 and -3).
Since both the x-coordinates and y-coordinates are not the same for all the points, the two sets of points are not congruent.
Therefore, the points (10, -6), (9, -6), (4, -6), (6, -6), (7, -6) and (-4, 6), (-3, 5), (2, -4), (6, -4), (5, -3) are not congruent to each other.