The vertices of ^ABC are A (2,-5), B(-3,5) AND c(3,-3) The Triangle is reflected over the x-axis.
I think the answer would be A(2,-5), B(-3,5), C(3,-3) ->(-2,-5), (3,5), (-3,-3)
If a point is reflected in the x-axis, its x value stays the same, but its y value becomes opposite
Make a sketch to see how this happens
e.g. A(2,-5) ---> A' (2,5)
do this with the other two points.
Seananners is 100% correct!!!!
WHO IS SEANANNERS I NEED THE UNIT TEST HELP PLZ
To reflect a point over the x-axis, we simply negate the y-coordinate of the point while keeping the x-coordinate the same. The given coordinates of triangle ABC are:
A(2,-5)
B(-3,5)
C(3,-3)
To reflect the triangle over the x-axis, we need to negate the y-coordinate of each point. Here are the new coordinates after reflecting:
A(2, -(-5)) = (2, 5)
B(-3, -5) = (-3, -5)
C(3, -(-3)) = (3, 3)
So, the reflected triangle would have the following vertices:
A'(2, 5)
B'(-3, -5)
C'(3, 3)
Therefore, your answer is incorrect. The correct coordinates for the reflected triangle are A'(2, 5), B'(-3, -5), and C'(3, 3).