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2. Characterizations of the exponential function - Wikipedia

   en.wikipedia.org/wiki/Characterizations_of_the...

   The six most common definitions of the exponential function ⁡ = for real values are as follows.. Product limit. Define by the limit: = (+).; Power series. Define e x as the value of the infinite series = =! = + +! +! +! + (Here n! denotes the factorial of n.

3. Exponentiation - Wikipedia

   en.wikipedia.org/wiki/Exponentiation

   Exponentiation with negative exponents is defined by the following identity, which holds for any integer n and nonzero b: =. [1] Raising 0 to a negative exponent is undefined but, in some circumstances, it may be interpreted as infinity (). [22]

4. Exponential function - Wikipedia

   en.wikipedia.org/wiki/Exponential_function

   Exponential functions with bases 2 and 1/2. In mathematics, the exponential function is the unique real function which maps zero to one and has a derivative equal to its value. . The exponential of a variable ⁠ ⁠ is denoted ⁠ ⁡ ⁠ or ⁠ ⁠, with the two notations used interchangeab

5. Power associativity - Wikipedia

   en.wikipedia.org/wiki/Power_associativity

   Over a field of characteristic 0, an algebra is power-associative if and only if it satisfies [,,] = and [,,] =, where [,,]:= () is the associator (Albert 1948). Over an infinite field of prime characteristic p > 0 {\displaystyle p>0} there is no finite set of identities that characterizes power-associativity, but there are infinite independent ...

6. Matrix exponential - Wikipedia

   en.wikipedia.org/wiki/Matrix_exponential

   The matrix exponential satisfies the following properties. [2] We begin with the properties that are immediate consequences of the definition as a power series: e 0 = I; exp(X T) = (exp X) T, where X T denotes the transpose of X. exp(X ∗) = (exp X) ∗, where X ∗ denotes the conjugate transpose of X. If Y is invertible then e YXY −1 = Ye ...

7. Legendre's formula - Wikipedia

   en.wikipedia.org/wiki/Legendre's_formula

   Since ! is the product of the integers 1 through n, we obtain at least one factor of p in ! for each multiple of p in {,, …,}, of which there are ⌊ ⌋.Each multiple of contributes an additional factor of p, each multiple of contributes yet another factor of p, etc. Adding up the number of these factors gives the infinite sum for (!

8. Exponential map (Lie theory) - Wikipedia

   en.wikipedia.org/wiki/Exponential_map_(Lie_theory)

   In the theory of Lie groups, the exponential map is a map from the Lie algebra of a Lie group to the group, which allows one to recapture the local group structure from the Lie algebra. The existence of the exponential map is one of the primary reasons that Lie algebras are a useful tool for studying Lie groups.

9. Tetration - Wikipedia

   en.wikipedia.org/wiki/Tetration

   There is no standard notation for tetration, though Knuth's up arrow notation and the left-exponent x b are common. Under the definition as repeated exponentiation, n a {\displaystyle {^{n}a}} means a a ⋅ ⋅ a {\displaystyle {a^{a^{\cdot ^{\cdot ^{a}}}}}} , where n copies of a are iterated via exponentiation, right-to-left, i.e. the ...