# Difference between revisions of "Pythagorean theorem"

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<math>a^2+b^2=c^2</math> or, <math>c=\sqrt{a^2+b^2}</math> | <math>a^2+b^2=c^2</math> or, <math>c=\sqrt{a^2+b^2}</math> | ||

− | This identity | + | This identity only holds true for a right triangle drawn on a flat ([[Euclid|Euclidean]]) plane |

− | The Pythagorean Theorem was developed by the [[Greece|Greek]] mathematician [[Pythagoras]] | + | The Pythagorean Theorem was developed by the [[Greece|Greek]] mathematician [[Pythagoras]]. The theorem describes a mathematical relationship between the lengths of the sides of a right triangle which can be illustrated as follows: |

[[Image:Pythagorean_Theorem.png|left|350px|Pythagorean Theorem]] | [[Image:Pythagorean_Theorem.png|left|350px|Pythagorean Theorem]] | ||

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− | Many different proofs of the Pythagorean theorem have been devised. Euclid's proof is one of the most complicated and least intuitive. | + | Many different proofs of the Pythagorean theorem have been devised. Euclid's proof is one of the most complicated and least intuitive. |

One proof, below, appeared in an ancient manuscript with no explanation other than the word "look!" Essentially, the triangles in the large square, the hypotenuses of which form the border of the small square, form the two congruent rectangles in the upper right hand and lower left hand corners of the diagram. Therefore, the other two sections of the large square in this portion of the diagram possess the same area as the smaller square in the first diagram. The area of one the two small squares in the second portion of the diagram is given by <math>a^2</math>, and the other by <math>b^2</math>, therefore, the area of the small square in the first portion of the diagram is given by <math>a^2+b^2=c^2</math>, the Pythagorean theorem. | One proof, below, appeared in an ancient manuscript with no explanation other than the word "look!" Essentially, the triangles in the large square, the hypotenuses of which form the border of the small square, form the two congruent rectangles in the upper right hand and lower left hand corners of the diagram. Therefore, the other two sections of the large square in this portion of the diagram possess the same area as the smaller square in the first diagram. The area of one the two small squares in the second portion of the diagram is given by <math>a^2</math>, and the other by <math>b^2</math>, therefore, the area of the small square in the first portion of the diagram is given by <math>a^2+b^2=c^2</math>, the Pythagorean theorem. | ||

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<br> | <br> | ||

<center>[[image:Pythagoras.gif]]</center> | <center>[[image:Pythagoras.gif]]</center> |

## Revision as of 21:36, 10 May 2013

The **Pythagorean theorem** is possibly the most well known mathematical theorem. It states that squaring the lengths of the two smaller sides of a right triangle and adding them together will get the length of the hypotenuse squared. This is expressed mathematically as:

or,

This identity only holds true for a right triangle drawn on a flat (Euclidean) plane

The Pythagorean Theorem was developed by the Greek mathematician Pythagoras. The theorem describes a mathematical relationship between the lengths of the sides of a right triangle which can be illustrated as follows:

Many different proofs of the Pythagorean theorem have been devised. Euclid's proof is one of the most complicated and least intuitive.

One proof, below, appeared in an ancient manuscript with no explanation other than the word "look!" Essentially, the triangles in the large square, the hypotenuses of which form the border of the small square, form the two congruent rectangles in the upper right hand and lower left hand corners of the diagram. Therefore, the other two sections of the large square in this portion of the diagram possess the same area as the smaller square in the first diagram. The area of one the two small squares in the second portion of the diagram is given by , and the other by , therefore, the area of the small square in the first portion of the diagram is given by , the Pythagorean theorem.