Consider triangle ABC with coordinates A \left(-7,6 \right), B \left(5,6 \right), and C \left(-1,12 \right). Consider the following transformations:
A reflection across the line y=x
A translation to the right 4 units and down 7 units
A rotation 270 \degree clockwise about the origin
What prediction can you make about how the segment lengths of the triangle changes when performing the transformations alone or in sequence?
What prediction can you make about how the angle measures of the triangle changes when performing the transformations alone or in sequence?
The triangles in the diagram are congruent.
Identify the transformations that map one triangle to its image.
Complete the congruency statement: \triangle{ABC}\cong \triangle{⬚}.
Consider the two figures on the coordinate grid shown:
Determine whether the figures are congruent. If so, justify their congruency using a sequence of rigid transformations.
Identify any congruent figures on the coordinate plane. Justify your reasoning.
Two figures are congruent if and only if there is a rigid transformation or sequence of rigid transformations that maps one of the figures onto the other.
We can show congruency by identifying a rigid transformation or a sequence of rigid transformations that map one figure onto the other.