Square root of two: Difference between revisions
imported>Catherine Woodgold (→Proof of Irrationality: Essential step in proof: if x^2 is even, then x must be even.) |
imported>Jitse Niesen (→Proof of Irrationality: x = 2 * k, not k = 2 * x; also reformulate) |
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Therefore, <math>\frac{x^2}{y^2} = 2</math> and <math>x^2 = 2 \times y^2</math>, | Therefore, <math>\frac{x^2}{y^2} = 2</math> and <math>x^2 = 2 \times y^2</math>, | ||
Thus, <math>x^2</math> represents an [[even number]]; therefore <math>x</math> must also be even. | Thus, <math>x^2</math> represents an [[even number]]; therefore <math>x</math> must also be even. This means that there is an integer <math>k</math> such that <math>x = 2 \times k</math>. Inserting it back into our previous equation, we find that <math>(2 \times k)^2 = 2 \times y^2</math> | ||
Through simplification, we find that <math>4 \times k^2 = 2 \times y^2</math>, and then that, <math>2 \times k^2 = y^2</math>, | Through simplification, we find that <math>4 \times k^2 = 2 \times y^2</math>, and then that, <math>2 \times k^2 = y^2</math>, |
Revision as of 22:18, 27 April 2007
The square root of two, denoted , is the positive number whose square equals 2. It is approximately 1.4142135623730950488016887242097. It provides a typical example of an irrational number.
In Right Triangles
The square root of two plays an important role in right triangles in that a unit right triangle (where both legs are equal to 1), has a hypotenuse of . Thus, .
Proof of Irrationality
There exists a simple proof by contradiction showing that is irrational:
Suppose is rational. Then there must exist two numbers, , such that and and represent the smallest such integers (i.e., they are mutually prime).
Therefore, and ,
Thus, represents an even number; therefore must also be even. This means that there is an integer such that . Inserting it back into our previous equation, we find that
Through simplification, we find that , and then that, ,
Since is an integer, and therefore also must also be even. However, if and are both even, they share a common factor of 2, making them not mutually prime. And that is a contradiction, so the assumption must be false, and must not be rational.