About the Book
Please note that the content of this book primarily consists of articles available from Wikipedia or other free sources online. Pages: 121. Chapters: Binary operation, Tensor product, If and only if, Identity element, Union, Addition, Multiplication, Convolution, Associativity, Logical conjunction, Logical disjunction, Product topology, Division, Exponentiation, Entailment, Exclusive or, Commutator, Power associativity, Outer product, Subtraction, Product of group subsets, Distributivity, Product of rings, Matrix multiplication, Magma, Matrix addition, Wreath product, Complement, Inverse element, Cross product, Seven-dimensional cross product, Tetration, Light's associativity test, Tensor product of modules, Commutativity, Poisson bracket, Ext functor, Cartesian product, Connected sum, Logical biconditional, Material conditional, Minkowski addition, Function composition, Logic alphabet, Circular convolution, Courant bracket, Join and meet, Frolicher-Nijenhuis bracket, Discrete logarithm, Cup product, Lie bracket of vector fields, Mediant, Schouten-Nijenhuis bracket, Logical NOR, Intersection, External, Symmetric difference, Box topology, Icosian Calculus, Anticommutativity, Logical equality, Pointwise product, Iterated binary operation, Tor functor, Pentation, Smash product, Dirichlet convolution, Graph product, Proofs involving the addition of natural numbers, Wedge sum, Nijenhuis-Richardson bracket, Cap product, Absorbing element, Lagrange bracket, Pythagorean addition, Alternativity, Band sum, Negacyclic convolution. Excerpt: Exponentiation is a mathematical operation, written as a, involving two numbers, the base a and the exponent n. When n is a positive integer, exponentiation corresponds to repeated multiplication; in other words, a product of n factors of a: just as multiplication by a positive integer corresponds to repeated addition: The exponent is usually shown as a superscript to the right of the base. The exponentiation a can be read as: a raised t...
