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Proposition 46 - constructing & proving a square from Book 1 of The Elements [Bonus material: proving the regular pentagon!] Brought to you by: François, Frank & Zack
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Euclid: Book 1, Proposition 46 “To Construct A Square With A Given Side”
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Constructing the Square
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Step 1 Let AB be the given straight line (Postulate 1). AB
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Step 2 Draw AC at right angles to given line AB from point A (Proposition 11). AB C
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Step 3 Make a point D on line AC so that AD=AB (Proposition 3). AB C D
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Step 4 Draw DE from point D parallel to AB (Proposition 31). AB C D E
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Step 5 Draw BE from point B Parallel to AD (Proposition 31). AB C DE
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Step 6 and Step 7 Since ADEB is a parallelogram, AB=DE and AD=BE (Proposition 34). Since in “Step 2” we said lines AD=AB, then lines AD=DE=AB=BE make ADEB an equilateral parallelogram (Common Notion 1). AB C D E
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Step 8 Since line AD falls upon parallels AB and DE, BAD+ ADE=2 right angles (Proposition 29). AB C D E < <
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Step 9 Since BAD is a right angle as stated in “Step 1”, ADE must also be another right angle. AB C D E < <
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Step 10 AB C D E < < In “parallelogrammic” areas, the opposite sides and angles are =, so each of the opposite angles of ABE and BED are also right. As a result, ADEB is right angled (Proposition 34).
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Step 11 Since we proved ADEB is equilateral and right angled, it is therefore a square, and it is described along line AB (Definition 22). AB C D E
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The Pentagon! (Book IV, Proposition 11) F D E A B C G H **Where triangle FGH is isosceles and where angles G and H are each double that size of angle F. (Book 4, Prop 10) Given: Circle ABCDE
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(1) Inscribe triangle FGH into the circle, where triangle ACD is equiangular with triangle FGH (Book IV Prop. 2) - F D E A B C G H
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Bisect the angles ACD and ADC using straight lines CE and DB. D E A B C Angles ACD and CDA are double the size of angle CAD. -But they have been bisected, therefore these five angles, DAC, ACE, ECD, CDB and BDA are all equal to each other.
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Circumferences AB, BC, CD, DE, EA are equal D E A B C Equal angles stand on equal circumferences, so all five circumferences are equal (AB, BC, CD, DE, EA). (Book III, Prop. 26)
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Equilateral as Lines AB, BC, CD, DE, and EA are equal. D E A B C Straight lines that cut off equal circumferences are equal, so lines AB, BC, CD, DE, and EA are equal. (Book III, Prop. 29) Therefore pentagon ABCDE is equilateral.
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Equiangular D E A B C Circumference AB = DE Add BCD to each so: AB + BCD = DE + BCD (CN 2) Therefore ABCD = EDCB. Angle AED is on circumference ABCD, and angle BAE is on circumference EDCB (Book III, Prop 27) therefore angle BAE = angle AED. Same applies for the rest of the angles so all angles are equal and it is Equiangular.
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Equilateral Pentagon + Equiangular Pentagon = Regular Pentagon
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THE END
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