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crystal1
If the sum of interior angles of a polygon is more than 180°, then the polygon is not a triangle.” The converse of the statement is If the sum of the interior angles of a polygon is not more than 180°, then the polygon is a triangle. If the polygon is a triangle, then the sum of the interior angles of the polygon is not more than 180°. If the sum of the interior angles of a polygon is equal to 180°, then the polygon is a triangle. If the polygon is not a triangle, then the sum of the interior angles of the polygon is more than 180°.
If the sum of interior angles of a polygon is more than 180°, then the polygon is not a triangle.” --------- p: sum of interior angles of polygon> 180 q: ~ a triangle Implication: p => q Converse of p => q is q => p. If a polygon is not a triangle, then the sum of the interior angles is more than 180. (last option) Note: The converse is not a true statement but it is still the converse of the given implication.
I don't see any letters. My work supports this option If the polygon is not a triangle, then the sum of the interior angles of the polygon is more than 180°. That may be d.