The translated figure will have all points shifted 3 units to the left. So, we need to subtract 3 from the x-coordinate of each point.
The translated figure would have the following points:
V: (-1, 6)
W: (1, 1)
X: (-4, -2)
Y: (-4, 3)
Z: (0, -5)
Therefore, the vertices in the translated figure would be:
(-1, 6)
(-4, -2)
(-4, 3)
Translate the figure VWXYZ
3 units to the left. Which one of the following would be a vertex in the translated figure? Select all that apply.
(2 points)
Responses
(2,6)
open paren 2 comma 6 close paren
(4,−5)
open paren 4 comma negative 5 close paren
(−1,−2)
open paren negative 1 comma negative 2 close paren
(−1,3)
open paren negative 1 comma 3 close paren
(3,1)
open paren 3 comma 1 close paren
(1,1)
5 answers
this is wrong
Apologies for the previous incorrect response. Let's correct it.
To translate the figure VWXYZ 3 units to the left, we need to subtract 3 from the x-coordinate of each point.
The translated figure would have the following points:
V: (Vx - 3, Vy)
W: (Wx - 3, Wy)
X: (Xx - 3, Xy)
Y: (Yx - 3, Yy)
Z: (Zx - 3, Zy)
Now, let's check which of the given points match the translated coordinates.
(2, 6): This point would become (-1, 6) after shifting 3 units to the left.
(4, -5): This point would become (1, -5) after shifting 3 units to the left.
(-1, -2): This point would become (-4, -2) after shifting 3 units to the left.
(-1, 3): This point would become (-4, 3) after shifting 3 units to the left.
(3, 1): This point would become (0, 1) after shifting 3 units to the left.
(1, 1): This point does not match any of the translated coordinates.
Therefore, the correct vertices in the translated figure would be:
(-1, 6)
(1, -5)
(-4, -2)
(-4, 3)
(0, 1)
To translate the figure VWXYZ 3 units to the left, we need to subtract 3 from the x-coordinate of each point.
The translated figure would have the following points:
V: (Vx - 3, Vy)
W: (Wx - 3, Wy)
X: (Xx - 3, Xy)
Y: (Yx - 3, Yy)
Z: (Zx - 3, Zy)
Now, let's check which of the given points match the translated coordinates.
(2, 6): This point would become (-1, 6) after shifting 3 units to the left.
(4, -5): This point would become (1, -5) after shifting 3 units to the left.
(-1, -2): This point would become (-4, -2) after shifting 3 units to the left.
(-1, 3): This point would become (-4, 3) after shifting 3 units to the left.
(3, 1): This point would become (0, 1) after shifting 3 units to the left.
(1, 1): This point does not match any of the translated coordinates.
Therefore, the correct vertices in the translated figure would be:
(-1, 6)
(1, -5)
(-4, -2)
(-4, 3)
(0, 1)
its wrong
Apologies for the confusion. Let's correct it:
To translate the figure VWXYZ 3 units to the left, we need to subtract 3 from the x-coordinate of each point.
The translated figure would have the following points:
V: (Vx - 3, Vy)
W: (Wx - 3, Wy)
X: (Xx - 3, Xy)
Y: (Yx - 3, Yy)
Z: (Zx - 3, Zy)
Now let's check which of the given points match the translated coordinates:
(2, 6): This point does not match any of the translated coordinates.
(4, -5): This point does not match any of the translated coordinates.
(-1, -2): This point does not match any of the translated coordinates.
(-1, 3): This point does not match any of the translated coordinates.
(3, 1): This point does not match any of the translated coordinates.
(1, 1): This point would become (-2, 1) after shifting 3 units to the left.
Therefore, the correct vertex in the translated figure would be:
(-2, 1)
To translate the figure VWXYZ 3 units to the left, we need to subtract 3 from the x-coordinate of each point.
The translated figure would have the following points:
V: (Vx - 3, Vy)
W: (Wx - 3, Wy)
X: (Xx - 3, Xy)
Y: (Yx - 3, Yy)
Z: (Zx - 3, Zy)
Now let's check which of the given points match the translated coordinates:
(2, 6): This point does not match any of the translated coordinates.
(4, -5): This point does not match any of the translated coordinates.
(-1, -2): This point does not match any of the translated coordinates.
(-1, 3): This point does not match any of the translated coordinates.
(3, 1): This point does not match any of the translated coordinates.
(1, 1): This point would become (-2, 1) after shifting 3 units to the left.
Therefore, the correct vertex in the translated figure would be:
(-2, 1)
1 answer