ΔTRY if T(1, 2), R(4, 4) and Y(2, -3) is reflected in the x-axis then the y-axis. Find the coordinates of the new vertices. Type your new coordinates using proper notation.

When a point is reflected in the x-axis, the x-coordinate stays the same but the y-coordinate becomes its opposite. So, reflecting T(1, 2) in the x-axis gives T'(1, -2), reflecting R(4, 4) in the x-axis gives R'(4, -4), and reflecting Y(2, -3) in the x-axis gives Y'(2, 3).

When a point is then reflected in the y-axis, the y-coordinate stays the same but the x-coordinate becomes its opposite. So, reflecting T'(1, -2) in the y-axis gives T''(-1, -2), reflecting R'(4, -4) in the y-axis gives R''(-4, -4), and reflecting Y'(2, 3) in the y-axis gives Y''(-2, 3).

Therefore, the new vertices are T''(-1, -2), R''(-4, -4), and Y''(-2, 3).

Final Answer: T''(-1, -2), R''(-4, -4), and Y''(-2, 3)

Consider the pre-image triangle with vertices A(1,2), B(3,1), and C(1,1). Rotate the pre-image triangle ABC 90 degrees counterclockwise about the origin. Then, reflect the image over the x-axis.

*Hint: Copy and paste the below notASation for answer. All you need to do is replace the x,y with the appropriate points.

A''(x,y), B''(x,y), C''(x,y)

When a point is rotated 90 degrees counterclockwise about the origin, the new x-coordinate is equal to the original y-coordinate, and the new y-coordinate is the opposite of the original x-coordinate. So, rotated A is A'(-2,1), rotated B is B'(-1,-3), and rotated C is C'(-1,-1).

When a point is reflected over the x-axis, the x-coordinate stays the same but the y-coordinate becomes its opposite. So, reflecting A'(-2,1) gives A''(-2,-1), reflecting B'(-1,-3) gives B''(-1,3), and reflecting C'(-1,-1) gives C''(-1,1).

Therefore, the new vertices are A''(-2,-1), B''(-1,3), and C''(-1,1).

Final Answer: A''(-2,-1), B''(-1,3), and C''(-1,1).