Related Questions in Mathematics

Q : Where would we be without stochastic Where would we be without stochastic or Ito^ calculus?

Q : Define Big-O notation Big-O notation : Big-O notation: If f(n) and g(n) are functions of a natural number n, we write f(n) is O(g(n)) and we say f is big-O of g if there is a constant C (independent of n) such that f

Q : Who derived the Black–Scholes Equation Who derived the Black–Scholes Equation?

Q : Who had find Monte Carlo and finite Who had find Monte Carlo and finite differences of the binomial model?

Q : Examples of groups Examples of groups: Examples of groups: We now start to survey a wide range of examples of groups (labelled by (A), (B), (C), . . . ). Most of these come from number theory. In all cases, the group axioms should be checked. This is easy for almost all of the examples, an

Q : Define terms Terms : Terms are defined Terms: Terms are defined inductively by the following clauses.               (i) Every individual variable and every individual constant is a term. (Such a term is called atom

Q : What is the definition of a group Group Group: Let G be a set. When we say that o is a binary operation on G, we mean that o is a function from GxG into G. Informally, o takes pairs of elements of G as input and produces single elements of G as output. Examples are the operations + and x of

Q : What is limit x tends to 0 log(1+x)/x What is limit x tends to 0  log(1+x)/x to the base a?

Q : Define Well-formed formulas or Wffs Wffs (Well-formed formulas): These are defined inductively by the following clauses:    (i) If  P  is an n-ary predicate and  t1, …, tn are terms, then P(t1, …, t

Q : How to calculate area of pyramid Calculate area of pyramid, prove equation?