Approximation theory is a branch of mathematics, and a quantitative part of
functional analysis.
Diophantine approximation deals with approximations of
real numbers by
rational numbers. Approximation usually occurs when an exact form or an exact numerical number is unknown or difficult to obtain. However some known form may exist and may be able to represent the real form so that no significant deviation can be found. For example, 1.5 × 106 means that the true value of something being measured is 1,500,000 to the nearest hundred thousand (so the actual value is somewhere between 1,450,000 and 1,550,000); this is in contrast to the notation 1.500 × 106, which means that the true value is 1,500,000 to the nearest thousand (implying that the true value is somewhere between 1,499,500 and 1,500,500).
Numerical approximations sometimes result from using a small number of
significant digits. Calculations are likely to involve
rounding errors and other
approximation errors.
Log tables, slide rules and calculators produce approximate answers to all but the simplest calculations. The results of computer calculations are normally an approximation expressed in a limited number of significant digits, although they can be programmed to produce more precise results. Approximation can occur when a decimal number cannot be expressed in a finite number of binary digits. Related to approximation of functions is the
asymptotic value of a function, i.e. the value as one or more of a function's parameters becomes arbitrarily large. For example, the sum is asymptotically equal to
k. No consistent notation is used throughout mathematics and some texts use ≈ to mean approximately equal and ~ to mean asymptotically equal whereas other texts use the symbols the other way around.
Typography (1892) The
approximately equals sign,
≈, was introduced (in a slightly different version) by the British mathematician
Alfred Greenhill in 1892, in his book
Applications of Elliptic Functions.
LaTeX symbols Typical meanings of
LaTeX symbols. • \approx (\approx) : approximate equality, like \pi \approx 3.14. • \not\approx (\not\approx) : inequality, despite any approximation (1 \not\approx 2). • \simeq (\simeq) : function asymptotic equivalence, like f(n) \simeq 3n^2 . • Thus, \pi \simeq 3.14 is wrong under this definition, despite wide use. • \sim (\sim) : function proportionality; the f(n) used in \simeq is f(n) \sim n^2 . • \cong (\cong) : figure congruence, like \Delta ABC \cong \Delta A'B'C' . • \eqsim (\eqsim) : equal up to a constant. • \lessapprox (\lessapprox) and \gtrapprox (\gtrapprox) : either an inequality holds or approximate equality.
Unicode Approximate equalities denoted by wavy or dotted symbols. }} == Science ==