You are making plans for a larger home. You are giving the builder instructions. You tell him that you want your new house to be twice as big as your original house with coordinates A (2,2), B (4,2), C (4,4), D (3,5), and E (2,4). Apply a scale factor of 2 and plot your new house. Hint dilation rule (x,y) ---> {2x, 2y}
To the builder,
I would like my new house to be twice as big as my original house, with the given coordinates:
A (2,2), B (4,2), C (4,4), D (3,5), and E (2,4).
To apply a scale factor of 2 and plot the new house, we need to multiply the x and y coordinates of each point by 2, following the dilation rule: (x,y) ---> {2x, 2y}.
Using this rule, the new coordinates for the house will be:
A' (2x2, 2x2) = (4, 4)
B' (4x2, 2x2) = (8, 4)
C' (4x2, 4x2) = (8, 8)
D' (3x2, 5x2) = (6, 10)
E' (2x2, 4x2) = (4, 8)
Please plot the new house using these coordinates, ensuring that the size is doubled compared to the original house.
Thank you!
Note: I can provide a visual representation of the new house upon request.
Suppose a tornado picked up your old house that was located at A(2,2), B (4,2), C (4,4), D (3,5), and (2,4) and it rotated it counter clockwise 180 degrees, where would the new location be on the graph. Plot the new location. Hint. 180° clockwise and counterclockwise rotation: ( x, y) becomes (−x, −y
If the old house, with coordinates A(2,2), B(4,2), C(4,4), D(3,5), and E(2,4), undergoes a 180-degree counter-clockwise rotation, each point's coordinates will be transformed using the rule (x, y) becomes (-x, -y).
Applying the rule to each point, we get the new coordinates:
A' (-2, -2)
B' (-4, -2)
C' (-4, -4)
D' (-3, -5)
E' (-2, -4)
These new coordinates represent the location of the house after the 180-degree counter-clockwise rotation. Please plot the new location of the house using these coordinates on the graph.
Please note that the plotted points will be the mirror image of the original house, as the rotation is around the origin.
Let me know if you need any further assistance!
Your house is located at A (2,2), B (4,2), C (4,4), D (3,5), and (2,4). A flood moves your house.
If a flood moves your house, the new location of your house will depend on the direction and distance in which it has been moved. Without specific information about the movement, I cannot accurately determine the new location and plot it on a graph.
If you can provide more details about the direction and distance of the flood's movement, I will be able to assist you in determining the new location of your house.
Your house is located at A (2,2), B (4,2), C (4,4), D (3,5), and (2,4). A flood moves your house.
Using the translation rule (x,y) ---> {x -4, y-2} Plot the new location of your house.
If a flood moves your house using the translation rule (x,y) ---> {x -4, y-2}, we need to subtract 4 from the x-coordinate and 2 from the y-coordinate of each point.
Applying the translation rule to each point, we get the new coordinates:
A' (2-4, 2-2) = (-2, 0)
B' (4-4, 2-2) = (0, 0)
C' (4-4, 4-2) = (0, 2)
D' (3-4, 5-2) = (-1, 3)
E' (2-4, 4-2) = (-2, 2)
Please plot the new location of the house using these coordinates on the graph. The translation rule has shifted the house 4 units to the left (negative x-direction) and 2 units down (negative y-direction) on the graph.
If you need any further assistance or clarification, I'm here to help!