Elementary function mathematics , an elementary function is a function of a single variable composed of particular simple functions. sum , product , and/or composition of finitely many polynomials , rational functions , trigonometric and exponential functions , and their inverse functions .Joseph Liouville in a series of papers from 1833 to 1841. An algebraic treatment of elementary functions was started by Joseph Fels Ritt in the 1930s.Examples Basic examples The elementary functions include: Constant functions: etc. Powers of : etc. Roots of etc. Exponential functions: Logarithms: Trigonometric functions: etc. Inverse trigonometric functions: etc. Hyperbolic functions: etc. Inverse hyperbolic functions: etc. All functions obtained by adding, subtracting, multiplying or dividing any of the previous functions All functions obtained by composing previously listed functions inverse trigonometric functions , are not entire functions and may be multivalued .Composite examples Examples of elementary functions include: Addition, e.g. Multiplication, e.g. Polynomial functions equal to , the inverse cosine , in the entire complex plane .absolute value function , for real, is also elementary as it can be expressed as the composition of a power and root of :.Non-elementary functions An example of a function that is not elementary is the error function Risch algorithm .closed under arithmetic operations and composition. The elementary functions are closed under differentiation . They are not closed under limits and infinite sums . Importantly, the elementary functions are closed under integration , as shown by Liouville's theorem , see Nonelementary integral. The Liouvillian functions are defined as the elementary functions and, recursively, the integrals of the Liouvillian functions.Differential algebra The mathematical definition of an elementary function , or a function in elementary form, is considered in the context of differential algebra . A differential algebra is an algebra with the extra operation of derivation. Using the derivation operation new equations can be written and their solutions used in extensions of the algebra. By starting with the field of rational functions , two special types of transcendental extensions can be added to the field building a tower containing elementary functions.differential field F is a field F 0 together with a derivation map u → ∂u . The derivation captures the properties of differentiation, so that for any two elements of the base field , the derivation is linearLeibniz product rule h is a constant if ∂h = 0 . If the base field is over the rationals , care must be taken when extending the field to add the needed transcendental constants.u of a differential extension F of a differential field F is an elementary function over F if the function u is algebraic over F , or is an exponential u = u ∂a for a ∈ F , or is a logarithm , that is, ∂u = ∂a / a for a ∈ F .
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