8. Suppose the sides of quadrilateral EFGH have the 7 4' 7 4 following slopes: MEF = +, MFG = -· MGH = 7 4 MHE 4 7 7 Is EFGH a rectangle? If so, what other information is needed to prove EFGH is a square? ' and Quadrilateral EFGH is not a rectangle because it is not a parallelogram. Quadrilateral EFGH is a rectangle because its opposite sides are parallel and its consecutive sides are perpendicular. The length of each pair of opposite sides must be found congruent to prove the rectangle is a square. Quadrilateral EFGH is a rectangle because its opposite sides are parallel and congruent. No other information is needed to prove EFGH is a square because it has been proven to be a rectangle. Quadrilateral EFGH is a rectangle because its opposite sides are parallel and its consecutive sides are perpendicular. The length of each side must be found congruent to prove the rectangle is a square.
8. Suppose the sides of quadrilateral EFGH have the 7 4' 7 4 following slopes: MEF = +, MFG = -· MGH = 7 4 MHE 4 7 7 Is EFGH a rectangle? If so, what other information is needed to prove EFGH is a square? ' and Quadrilateral EFGH is not a rectangle because it is not a parallelogram. Quadrilateral EFGH is a rectangle because its opposite sides are parallel and its consecutive sides are perpendicular. The length of each pair of opposite sides must be found congruent to prove the rectangle is a square. Quadrilateral EFGH is a rectangle because its opposite sides are parallel and congruent. No other information is needed to prove EFGH is a square because it has been proven to be a rectangle. Quadrilateral EFGH is a rectangle because its opposite sides are parallel and its consecutive sides are perpendicular. The length of each side must be found congruent to prove the rectangle is a square.
Elementary Geometry For College Students, 7e
7th Edition
ISBN:9781337614085
Author:Alexander, Daniel C.; Koeberlein, Geralyn M.
Publisher:Alexander, Daniel C.; Koeberlein, Geralyn M.
Chapter5: Similar Triangles
Section5.2: Similar Polygons
Problem 11E: a Does the similarity relationship have a reflexive property for triangles and polygons in general?...
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