what are the coordinates of the image of vertex d after a reflection across the x - axis?\n(5, 3)\n(-5…

what are the coordinates of the image of vertex d after a reflection across the x - axis?\n(5, 3)\n(-5, -3)\n(-3, 5)\n(3, -5)\ne(1, -2) d(5, -3) f(3, 4)

what are the coordinates of the image of vertex d after a reflection across the x - axis?\n(5, 3)\n(-5, -3)\n(-3, 5)\n(3, -5)\ne(1, -2) d(5, -3) f(3, 4)

Answer

Answer:

(5, 3)

Explanation:

Step1: Recall reflection rule

When reflecting a point $(x,y)$ across the $x - axis$, the rule is $(x,y)\to(x, - y)$.

Step2: Identify original coordinates

The original coordinates of vertex D are $(5,-3)$.

Step3: Apply the rule

Using the rule $(x,y)\to(x, - y)$ with $x = 5$ and $y=-3$, we get $(5,-(-3))=(5,3)$.