Square ABCD is transformed by a combined transformation of a reflection in the line $x = -1$ followed by a rotation - Edexcel - GCSE Maths - Question 25 - 2019 - Paper 2

One possible rotation that keeps two vertices of square ABCD invariant is a rotation of 180° about the center of the square.

To clarify, let's identify the coordinates of the vertices of square ABCD:

• A (1, 5)
• B (5, 5)
• C (5, 1)
• D (1, 1)

The center of the square, which is the point about which we will rotate, is given by: ext{Center} = igg( rac{x_A + x_C}{2}, rac{y_A + y_C}{2} igg) = igg( rac{1+5}{2}, rac{5+1}{2} igg) = (3, 3)

When rotating 180° about this center, the new positions of the vertices can be determined as follows:

• The point A (1, 5) will move to (5, 1).
• The point B (5, 5) will move to (1, 1).
• The point C (5, 1) will move to (1, 5).
• The point D (1, 1) will move to (5, 5).

In this case, the vertices A (1, 5) and C (5, 1) are invariant under reflection in the line $x = -1$ before the rotation. Thus, a rotation of 180° about (3, 3) after the reflection keeps those vertices the same.