The rule for this transformation is (x+a, y+b).

Write the coordinates of S(-3, -6) after being translated 3 units left and 5 units down, THEN reflected across the y-axis.

**(Final is S'')**

Triangle ABC with A(–3, 4), B(–2, –2), C(5, 1) has been transformed so that triangle A’B’C’ has coordinates  A’(–4, –3), B’(2, –2), C’(–1, 5).

Point M was translated 4 units to the left and 9 units up, then rotated 180° counterclockwise about the origin, followed by a reflection across the x-axis, and finally rotated 270° counterclockwise about the origin.
The result has coordinates M’’’’(–4, 6). Find the coordinates of M.

What is the measure the hypotenuse of triangle ABC where C is the right angle, if AC=3 and CB=4.

Reflection of point M(–2, –6) across the line y = x to obtain M ’, and then a dilation with a scale factor = 1/2 to obtain M ’’, finally a rotation 90° counterclockwise about the origin to obtain M ’’’.

Triangle ABC has coordinates  
A(–4, –3), B(2, –2), C(–1, 5). Then triangle ABC is transformed to obtain triangle A’B’C’ with A’(1, –6), B’(7, –5), C’(4, 2).

Point D has been rotated 270º counterclockwise about the origin, reflected across the origin, and finally translated 5 units left and 7 units up. The result has coordinates D’’’(–9, 2).
Find the coordinates of D.

What is the axis of symmetry of the following quadratic equation:

2x²-12x+5

The rule for this transformation is (-y, x).

Rotation of point C(5, –2) 90° clockwise about the origin to obtain C’, and then a translation 2 units right and 4 units up to obtain
C ’’, finally a reflection across the origin to obtain C ’’’.

This transformation is the composite of successive reflections over two intersecting lines.

Point E has been reflected across the x-axis, translated 4 units right and 3 units down, dilated with a scale factor = 4, and finally rotated 90° counterclockwise about the origin. The result has coordinates E’’’(24, –8). Find the coordinates of E.

Factor completely:

4x²-81y⁴