How to Prove that a Quadrilateral Is a Rectangle

There are three ways to prove that a quadrilateral is a rectangle. Note that the second and third methods require that you first show (or be given) that the quadrilateral in question is a parallelogram:



  • If all angles in a quadrilateral are right angles, then it’s a rectangle (reverse of the rectangle definition). (Actually, you only need to show that three angles are right angles — if they are, the fourth one is automatically a right angle as well.)



  • If the diagonals of a parallelogram are congruent, then it’s a rectangle (neither the reverse of the definition nor the converse of a property).



  • If a parallelogram contains a right angle, then it’s a rectangle (neither the reverse of the definition nor the converse of a property).


    Tip: Do the following to visualize why this method works: Take an empty cereal box and push in the top flaps. If you then look into the empty box, the top of the box makes a rectangular shape, right? Now, start to crush the top of the box — you know, like you want to make it flat before putting it in the trash. As you start to crush the top of the box, you see a parallelogram shape. Now, after you’ve crushed it a bit, if you take this parallelogram and make one of the angles a right angle, the whole top has to become a rectangle again. You can’t make one of the angles a right angle without the other three also becoming right angles.




Before looking at any of these proof methods in action, here’s a useful little theorem that you need to do the upcoming proof.


Congruent supplementary angles are right angles: If two angles are both supplementary and congruent, then they’re right angles. This idea makes sense because 90° + 90° = 180°.


Okay, so here’s the proof:


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image1.jpg

Statement 1:


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Reason for statement 1: Given.


Statement 2:


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Reason for statement 2: If same-side exterior angles are supplementary, then lines are parallel.


Statement 3:


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Reason for statement 3: If both pairs of opposite sides of a quadrilateral are parallel, then the quadrilateral is a parallelogram.


Statement 4:


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Reason for statement 4: If two angles are supplementary to the same angle, then they’re congruent.


Statement 5:


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Reason for statement 5: Given.


Statement 6:


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Reason for statement 6: If two angles are both supplementary and congruent, then they’re right angles.


Statement 7:


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Reason for statement 7: If lines form a right angle, then they’re perpendicular.


Statement 8:


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Reason for statement 8: If lines are perpendicular, then they form right angles.


Statement 9:


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Reason for statement 9: If a parallelogram contains a right angle, then it’s a rectangle.


Statement 10:


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Reason for statement 10: The diagonals of a rectangle are congruent.











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Source:http://www.dummies.com/how-to/content/how-to-prove-that-a-quadrilateral-is-a-rectangle.html

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