An object goes through a variety of transformations, starting at position A, then to position B, then C, and ending at position D. Order the transformations that the object underwent from start to finish

To order the transformations that the object underwent from start to finish, we need to know what specific transformations occurred and their order. Without that information, it is not possible to determine the correct order of the transformations.

Reflection, translation and rotation

If the object underwent the transformations of reflection, followed by translation, and finally rotation, then the correct order of the transformations from start to finish would be:

1. Reflection
2. Translation
3. Rotation

What is the sequence of steps used to move traingle DFG in Quadrant I to the triangle in Quadrant II to show that the triangles are congruent? (1 point) Responses transformation, then translation transformation, then translation reflection, then translation reflection, then translation translation, then rotation translation, then rotation rotation, then translation

To move triangle DFG from Quadrant I to Quadrant II in order to show that the triangles are congruent, the correct sequence of steps would be:

1. Reflection, then translation

This means that we first reflect triangle DFG across the y-axis and then translate it horizontally to the left or right to reach the desired position in Quadrant II.

Pentagon LMNOP undergoes a single transformation to form a congruent pentagon, L′M′N′O′P′ L ′ M ′ N ′ O ′ P ′ . Which of the following best describes the possible transformation that took place?(1 point) Responses a reflection, rotation, or a translation a reflection, rotation, or a translation a reflection only a reflection only a rotation only a rotation only a translation only

Based on the given information, the best description for the possible transformation that took place to form the congruent pentagon L′M′N′O′P′ is:

a reflection only

This means that the pentagon LMNOP was most likely reflected to create its congruent copy.

Which statements will be true if two figures are congruent? Select all that apply.(3 points) Responses The perimeters of the figures will be congruent. The perimeters of the figures will be congruent. The areas of the figures will not be congruent. The areas of the figures will not be congruent. The figures will not have the same number of sides. The figures will not have the same number of sides. Corresponding sides will not be congruent. Corresponding sides will not be congruent. A series of transformations will take one figure to the other figure

If two figures are congruent, the following statements will be true:

1. The perimeters of the figures will be congruent.
2. The areas of the figures will be congruent.
3. Corresponding sides will be congruent.

However, the statement "The figures will not have the same number of sides" is incorrect. Congruent figures have the same number of sides. The statement "A series of transformations will take one figure to the other figure" is also incorrect. Congruent figures are already the same shape and size, so no further transformations are needed to make them congruent.