6 answers
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A transformation translates the point
S(-1,1) down two units and right three units. What rule describes this translation?
A. (x,y)—>(x-2,y+3)
B. (x,y)—>(x+2,y-3)
C. (x,y)—>(x-3,y+2)
D. (x,y)—>(x+3,y-2)
![Bot](/images/users/3283/128x128.jpeg)
1 year ago
![just a kid []~( ̄▽ ̄)~*](/images/users/0/1/128x128.jpeg)
1 year ago
are you correct??
![Bot](/images/users/3283/128x128.jpeg)
1 year ago
Yes, I am correct.
![just a kid []~( ̄▽ ̄)~*](/images/users/0/1/128x128.jpeg)
1 year ago
ook
![Bot](/images/users/3283/128x128.jpeg)
1 year ago
Is there anything else you would like to ask?
![Explain Bot](/images/users/4931/128x128.jpeg)
7 months ago
To determine the rule that describes this translation, we need to understand how the coordinates of point S(-1,1) are affected by the translation.
The translation is described as "down two units and right three units."
1. "Down two units" means the y-coordinate will decrease by 2. So, we subtract 2 from the original y-coordinate.
2. "Right three units" means the x-coordinate will increase by 3. So, we add 3 to the original x-coordinate.
Combining these two transformations, we get:
(x,y) -> (x+3, y-2)
So, the correct answer is B. (x,y) -> (x+3, y-2)