by GlazeHer April 26, 2014
Get the arithmedick mug.Arithmedick- A math equation used to identify if a female is a HOE (Horizontally Orientated Entertainer) the equation is as follows.
Number of Males said female has slept with X 6 (For average number of times each male penetrated Slot-C)= Z you then take Z and place a platform at that height and if a fall from the platform is fatal she is a HOE. Example: Debbie slept with 15 guys her freshman year so 15guys X 6 = 90 or 90feet a fall from 90 feet is fatal concluding Debbie is a Horizontally Orientated Expert.
Number of Males said female has slept with X 6 (For average number of times each male penetrated Slot-C)= Z you then take Z and place a platform at that height and if a fall from the platform is fatal she is a HOE. Example: Debbie slept with 15 guys her freshman year so 15guys X 6 = 90 or 90feet a fall from 90 feet is fatal concluding Debbie is a Horizontally Orientated Expert.
Tammy slept with 6 guys so by the arithmedick equation 6X6 equals 36 so if she fell from a platform of 36 feet it's not fatal so Tammy isn't a hoe....yet.
by JohnnyBadGood July 18, 2016
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The mental process of estimating the respective weights of the other passengers in an elevator. Then comparing it to the maximum weight posted next to the fire inspection sign to see if its safe.
After that big fat guy and the kid in the wheel chair got on, I redid the Elevator Arithmetic and decided I was going to take the stairs.
by Ben Faulding April 4, 2006
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Get the chinese arithmetic mug.by Areeyan February 7, 2007
Get the arithmetic mug.The fundamental theorem of arithmetic states that {n: n is an element of N > 1} (the set of natural numbers, or positive integers, except the number 1) can be represented uniquely apart from rearrangement as the product of one or more prime numbers (a positive integer that's divisible only by 1 and itself). This theorem is also called the unique factorization theorem and is a corollary to Euclid's first theorem, or Euclid's principle, which states that if p is a prime number and p/ab is given (a does not equal 0; b does not equal 0), then p is divisible by a or p is divisible by b.
Proof: First prove that every integer n > 1 can be written as a product of primes by using inductive reasoning. Let n = 2. Since 2 is prime, n is a product of primes. Suppose n > 2, and the above proposition is true for N < n. If n is prime, then n is a product of primes. If n is composite, then n = ab, where a < n and b < n. Therefore, a and b are products of primes. Hence, n = ab is also a product of primes. Since that has been established, we can now prove that such a product is unique (except for order). Suppose n = p sub1 * p sub2 * ... * p subk = q sub1 * q sub2 * ... * q subr, where the p's and q's are primes. If so, then p sub1 is divisible by (q sub1 * ... * q subr) by Euclid's first theorem. What is the relationship between p sub1 and one of the q's? If the r in q subr equals 1, then p sub1 = q sub1 since the only divisors of q are + or - 1 and + or - q and p > 1, making p = q. What about the other factors in the divisor? If p does not divide q, then the greatest common denominator of p and q is 1 since the only divisors of p are + or - 1 and + or - p. Thus there are integers m and n so that 1 = am + bn. Multiplying by q subr yieds q subr = amq subr + bnq subr. Since we are saying that p is divisible by q, let's say the q sub1 * q subr = cp. Then q subr = amq subr + bnq subr = amq subr + bcm = m(aq subr + bc). Therefore, p is divisible by q sub1 of q sub2 * ... * q subr. If p sub1 is divisible by q sub1, then p sub1 = q sub 1. If this does not work the first time, then repeat the argument until you find an equality. Therefore, one of the p's must equal one of the q's. In any case, rearrange the q's so that p sub1 = q sub1, then p sub1 * p sub2 * ... * p subk= p sub1 * q sub2 * ... * q subr and p sub2 * ... * p subk = q sub2 * ... * q subr, and so on. By the same argument, we can rearrange the remaining q's so that p sub2 = q sub2. Thus n can be expressed uniquely as a product of primes regardless of order, making the fundamental theorem of arithmetic true.
by some punk kid September 6, 2005
Get the Fundamental Theorem of Arithmetic mug.by Carl Pickens March 23, 2007
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