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Answer:
Statement 1: A polygon is a square if and only if the polygon has exactly four sides. FALSE
Statement 2: A polygon has exactly five sides if and only if the polygon is a pentagon. TRUE
Statement 3: A polygon has exactly four sides if and only if the polygon is a rectangle. FALSE
Step-by-step explanation:
In order to prove if a biconditional statement is true if both the conditionals are true, otherwise is false.
In this case you have to use geometry shapes definitions to determine if the conditionals are true or false.
The statement 1 is false because by definition a polygon is a square if the polygon has four sides of the same size forming rect angles. A polygon with four sides is not necessary a square.
The statement 2 is true because by definition a pentagon is a polygon with five sides .
The statement 3 is false because there are differents polygons with four sides (quadrilaterals). For example a square, rhombus. Not all the quatrilaterals are rectangles.
Answer:
Statement 1: A polygon is a square if and only if the polygon has exactly four sides. FALSE
Statement 2: A polygon has exactly five sides if and only if the polygon is a pentagon. TRUE
Statement 3: A polygon has exactly four sides if and only if the polygon is a rectangle. FALSE
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