A transformation maps ZOWE onto LFMA. Does the transformation appear to be an isometry? Explain.
What is the image of ZE?
z e What is the preimage of M?
Quadrilateral ZOWE is within similar quadrilateral LFMA.
To determine if the transformation from ZOWE to LFMA is an isometry, we need to compare the distances between corresponding points in the original and transformed quadrilaterals.
If we can show that all corresponding sides and angles in the two quadrilaterals are congruent, then the transformation is an isometry.
To determine the image of ZE, we need to apply the transformation to the point ZE. Unfortunately, the point E is not given or specified, so we cannot determine its image.
To find the preimage of M, we need to determine the point in the original quadrilateral (ZOWE) that maps onto M in the transformed quadrilateral (LFMA). However, we are not given enough information to determine the precise location of the point in the original quadrilateral that corresponds to M.
Therefore, without more information or details about the angles and sides of the quadrilaterals, it is not possible to determine if the transformation from ZOWE to LFMA is an isometry.