In the diagram below, . Which sequence of transformations maps onto ?
On the set of axes below, congruent quadrilaterals and are graphed. Describe a sequence of transformations that would map quadrilateral ROCK onto quadrilateral .
Describe a sequence of transformations that would map quadrilateral ROCK onto quadrilateral .
Triangles YEG and POM are two distinct non-right triangles such that . Which statement is sufficient to prove is always congruent to ?
On the set of axes below, is graphed with coordinates , and . Triangle , the image of , is graphed with coordinates , and . Describe a sequence of transformations that would map onto .
Describe a sequence of transformations that would map onto .
In regular hexagon shown below, , and all intersect at .
When is reflected over and then rotated about point , is mapped onto
Trapezoid , where , is shown below. Diagonals and intersect at , and .
If , and , determine and state .
If , and , determine and state .
30 In the graph below, has coordinates , and , and has coordinates , and .
Is congruent to ? Use the properties of rigid motions to explain your reasoning.
Is congruent to ? Use the properties of rigid motions to explain your reasoning.
In the diagram of triangles and below, sides and intersect at , and . Which statement can not be proven?
Given: , and
Prove:
Prove that using the given information.
In the diagram below, and points , and are collinear on line . Let be the image of after a translation along , such that point is mapped onto point . Determine and state the location of . Explain your answer. Let be the image of after a reflection across line . Suppose that is located at . Is congruent to ? Explain your answer.
Determine and state the location of . Explain your answer.
Is congruent to ? Explain your answer.