a triangle on a coordinate plane is translated according to the rule $t_{-8,4}(x,y)$. which is another way…

a triangle on a coordinate plane is translated according to the rule $t_{-8,4}(x,y)$. which is another way to write this rule?\n$(x,y)\to(x + 4,y - 8)$\n$(x,y)\to(x - 4,y - 8)$\n$(x,y)\to(x - 8,y + 4)$\n$(x,y)\to(x + 8,y - 4)$

a triangle on a coordinate plane is translated according to the rule $t_{-8,4}(x,y)$. which is another way to write this rule?\n$(x,y)\to(x + 4,y - 8)$\n$(x,y)\to(x - 4,y - 8)$\n$(x,y)\to(x - 8,y + 4)$\n$(x,y)\to(x + 8,y - 4)$

Answer

Explanation:

Step1: Understand translation rule

The rule $T_{- 8,4}(x,y)$ means a translation. The first number -8 represents the horizontal (x - direction) translation and the second number 4 represents the vertical (y - direction) translation.

Step2: Apply translation to coordinates

A negative number in the x - direction means a shift to the left. So for the x - coordinate, we subtract 8 from the original x - coordinate. A positive number in the y - direction means a shift up. So for the y - coordinate, we add 4 to the original y - coordinate. So the rule is $(x,y)\to(x - 8,y + 4)$.

Answer:

$(x,y)\to(x - 8,y + 4)$ (the third option)