Determine the validity of an argument: A polygon is regular or a polygon has a side which is longer than another side of the polygon. If a polygon is regular then all the sides of the polygon are congruent. If a polygon has one side which is longer than another side of the polygon, then an interior angle of the polygon has measure greater than one of the interior angles of the polygon. Therefore, either the polygon have congruent sides or an interior angle of the polygon has a measure greater than one of the interior angles of the polygon.
Determine the validity of an argument: A polygon is regular or a polygon has a side which is longer than another side of the polygon. If a polygon is regular then all the sides of the polygon are congruent. If a polygon has one side which is longer than another side of the polygon, then an interior angle of the polygon has measure greater than one of the interior angles of the polygon. Therefore, either the polygon have congruent sides or an interior angle of the polygon has a measure greater than one of the interior angles of the polygon.
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 1E: a What is true of any pair of corresponding angles of two similar polygons? b What is true of any...
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![Problem 9
Determine the validity of an argument: A polygon is regular or a polygon has a side
which is longer than another side of the polygon. If a polygon is regular then all the sides of
the polygon are congruent. If a polygon has one side which is longer than another side of
the polygon, then an interior angle of the polygon has measure greater than one of the
interior angles of the polygon. Therefore, either the polygon have congruent sides or an
interior angle of the polygon has a measure greater than one of the interior angles of the
polygon.
What is the argument? *
[(pvq) ^ (pr) ^ (q→s)] → (rvs)
O [(pvq) ^ (pr)]^(q→s) → (rvs)
O [(pvq) ^ [(pr) ^ (q→s)]] → (rvs)
0 points](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2F5cfee121-48f5-473c-a535-8d02e8348708%2F9e0d08fd-97c1-41b5-8163-ec8817e86817%2F6aidbgg_processed.png&w=3840&q=75)
Transcribed Image Text:Problem 9
Determine the validity of an argument: A polygon is regular or a polygon has a side
which is longer than another side of the polygon. If a polygon is regular then all the sides of
the polygon are congruent. If a polygon has one side which is longer than another side of
the polygon, then an interior angle of the polygon has measure greater than one of the
interior angles of the polygon. Therefore, either the polygon have congruent sides or an
interior angle of the polygon has a measure greater than one of the interior angles of the
polygon.
What is the argument? *
[(pvq) ^ (pr) ^ (q→s)] → (rvs)
O [(pvq) ^ (pr)]^(q→s) → (rvs)
O [(pvq) ^ [(pr) ^ (q→s)]] → (rvs)
0 points
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