Write a rule to describe the translation of a point from (-3, 3) to (-3, 3).
A (x,y) > (x - 1, y + 1) !!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!
B (x, y) > (x + 1, y + 1)
C (x, y) > (x - 1, y - 1)
D (x, y) > (x + 1, y - 1)
hmmm -3-1 = -3?
I think not!
I suspect a typo, since (-3,3) is identical to (-3,3)
yes i didnt why they put that in the qc
To describe the translation of a point from (-3, 3) to (-3, 3), we need to determine how the coordinates of the point are changed during the translation.
Let's analyze the options given:
A (x, y) > (x - 1, y + 1): This rule translates the point by subtracting 1 from the x-coordinate and adding 1 to the y-coordinate. However, since the original point and the translated point have the same coordinates, this option does not accurately describe the translation.
B (x, y) > (x + 1, y + 1): This rule translates the point by adding 1 to both the x-coordinate and the y-coordinate. Since both the original point (-3, 3) and the translated point (-3, 3) have the same coordinates, this option accurately describes the translation.
C (x, y) > (x - 1, y - 1): This rule translates the point by subtracting 1 from both the x-coordinate and the y-coordinate. However, since the original point and the translated point have the same coordinates, this option does not accurately describe the translation.
D (x, y) > (x + 1, y - 1): This rule translates the point by adding 1 to the x-coordinate and subtracting 1 from the y-coordinate. However, since the original point and the translated point have the same coordinates, this option does not accurately describe the translation.
Based on the analysis, the correct rule to describe the translation of the point from (-3, 3) to (-3, 3) is option B: (x, y) > (x + 1, y + 1).