1In the context of the course notation, what does the expression {P, 60} * {AB}(C) = D represent?
2According to the class transcript, which of the following transformations are particularly useful for problems involving equilateral triangles?
3If two lines m and n intersect at point X with an angle of 35 degrees between them, what is the net transformation of reflecting a figure over line m and then line n?
4What is the net result of reflecting a figure over two parallel lines that are a distance 'd' apart?
5Which properties are true regarding the composition of two rotations about different centers Y and Z with angles alpha and beta respectively?
6In a square ABCD (labeled counter-clockwise with A at top right), which point is the result of the transformation {C, -90}(B)?
7A spiral similarity is defined as the composition of which two transformations sharing the same center?
8What is the specific term used in the transcript for a transformation that maps every point in the plane to itself?
9In the problem involving triangle ABC and squares with centers P, Q, and R, the composition {P, 90} * {Q, 90} was shown to be equivalent to what?
10According to the transcript, how long should you typically spend looking for a transformational solution to an Olympiad problem before trying a different approach?