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2. Exponentiation - Wikipedia

   en.wikipedia.org/wiki/Exponentiation

   Raising 0 to a negative exponent is undefined but, in some circumstances, it may be interpreted as infinity (). [ 22 ] This definition of exponentiation with negative exponents is the only one that allows extending the identity b m + n = b m ⋅ b n {\displaystyle b^{m+n}=b^{m}\cdot b^{n}} to negative exponents (consider the case m = − n ...

3. Reciprocal rule - Wikipedia

   en.wikipedia.org/wiki/Reciprocal_rule

   The reciprocal rule can be used to show that the power rule holds for negative exponents if it has already been established for positive exponents. Also, one can readily deduce the quotient rule from the reciprocal rule and the product rule .

4. Power of two - Wikipedia

   en.wikipedia.org/wiki/Power_of_two

   Two to the exponent of n, written as 2 n, is the number of ways the bits in a binary word of length n can be arranged. A word, interpreted as an unsigned integer, can represent values from 0 (000...000 2) to 2 n − 1 (111...111 2) inclusively. Corresponding signed integer values can be positive, negative and zero; see signed number ...

5. Almost perfect number - Wikipedia

   en.wikipedia.org/wiki/Almost_perfect_number

   Demonstration, with Cuisenaire rods, that the number 8 is almost perfect, and deficient.. In mathematics, an almost perfect number (sometimes also called slightly defective or least deficient number) is a natural number n such that the sum of all divisors of n (the sum-of-divisors function σ(n)) is equal to 2n − 1, the sum of all proper divisors of n, s(n) = σ(n) − n, then being equal to ...

6. Root of unity - Wikipedia

   en.wikipedia.org/wiki/Root_of_unity

   Φ 8 (z) = (z 8 − 1)⋅(z 4 − 1) −1 = z 4 + 1. If p is a prime number, then all the p th roots of unity except 1 are primitive p th roots. Therefore, [6] = = =. Substituting any positive integer ≥ 2 for z, this sum becomes a base z repunit. Thus a necessary (but not sufficient) condition for a repunit to be prime is that its length be ...

7. Hyperoperation - Wikipedia

   en.wikipedia.org/wiki/Hyperoperation

   The parameters of the hyperoperation hierarchy are sometimes referred to by their analogous exponentiation term; [15] so a is the base, b is the exponent (or hyperexponent), [12] and n is the rank (or grade), [6] and moreover, (,) is read as "the bth n-ation of a", e.g. (,) is read as "the 9th tetration of 7", and (,) is read as "the 789th 123 ...