Difference between revisions of "Semiprime"
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==Examples== | ==Examples== | ||
− | *<math>9</math> is an example of a semiprime as it is the product of two threes. <math>3 | + | *<math>9</math> is an example of a semiprime as it is the product of two threes. <math>3*3=9</math>. |
*<math>10</math> is also an example as it is obtained by <math>5*2</math>. | *<math>10</math> is also an example as it is obtained by <math>5*2</math>. | ||
Other examples include: <math>25</math>, <math>15</math>, <math>39</math>, <math>221</math>, <math>437</math>, and <math>1537</math>. | Other examples include: <math>25</math>, <math>15</math>, <math>39</math>, <math>221</math>, <math>437</math>, and <math>1537</math>. | ||
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== Basic Properties== | == Basic Properties== | ||
− | Via the Sieve of Sundaram formulation of: <cmath>2n+1 | + | Via the Sieve of Sundaram formulation of: <cmath>2n+1</cmath> being composite any time <cmath>n=2ab+a+b\quad 0<a,b<n\quad a,b,n\in\mathbb{N}</cmath>, as <math>2n+1=4ab+2a+2b+1=(2a+1)(2b+1)</math>, we can show that if and only if <math>a,b</math> are both not composite producing then <math>2n+1</math> is a semiprime. |
Odd semiprimes, are able to be expressed as a difference of squares, like all other numbers that are products of numbers of same parity. | Odd semiprimes, are able to be expressed as a difference of squares, like all other numbers that are products of numbers of same parity. | ||
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==See Also== | ==See Also== |
Latest revision as of 18:05, 28 May 2020
In mathematics, a semiprime is a number that is the product of two not necessarily distinct primes. These integers are important in many contexts, including cryptography.
Examples
- is an example of a semiprime as it is the product of two threes. .
- is also an example as it is obtained by .
Other examples include: , , , , , and .
Examples of non-semiprimes
- , as it is only a prime number.
- , not a semiprime because it can obtained by or .
Basic Properties
Via the Sieve of Sundaram formulation of: being composite any time , as , we can show that if and only if are both not composite producing then is a semiprime.
Odd semiprimes, are able to be expressed as a difference of squares, like all other numbers that are products of numbers of same parity.
See Also
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