Examples of complex analysis in the following topics:
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- An analytic function is uniquely extended to a holomorphic function on an open disk in the complex plane.
- This makes the machinery of complex analysis available.
- This result is of fundamental importance in many fields of mathematics (for example, in complex analysis), physics and engineering.
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- In complex analysis, the hyperbolic functions arise as the imaginary parts of sine and cosine.
- When considered defined by a complex variable, the hyperbolic functions are rational functions of exponentials, and are hence meromorphic.
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- Derivatives and their generalizations appear in many fields of mathematics, such as complex analysis, functional analysis, differential geometry, measure theory and abstract algebra.
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- These power series arise primarily in real and complex analysis, but also occur in combinatorics (under the name of generating functions) and in electrical engineering (under the name of the $Z$-transform).
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- Unlike finite summations, infinite series need tools from mathematical analysis, specifically the notion of limits, to be fully understood and manipulated.
- For any sequence of rational numbers, real numbers, complex numbers, functions thereof, etc., the associated series is defined as the ordered formal sum:
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- Unlike finite summations, infinite series need tools from mathematical analysis, and specifically the notion of limits, to be fully understood and manipulated.
- For any infinite sequence of real or complex numbers, the associated series is defined as the ordered formal sum
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- In numerical analysis, Newton's method (also known as the Newton–Raphson method), named after Isaac Newton and Joseph Raphson, is a method for finding successively better approximations to the roots (or zeroes) of a real-valued function.
- The method can also be extended to complex functions and to systems of equations.
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- Formally, an analytic function $ƒ(z)$ of the real or complex variables $z_1, \cdots ,z_n$ is transcendental if $z_1, \cdots ,z_n$, $ƒ(z)$ are algebraically independent, i.e., if $ƒ$ is transcendental over the field $C(z_1, \cdots ,z_n)$.
- In dimensional analysis, transcendental functions are notable because they make sense only when their argument is dimensionless (possibly after algebraic reduction).
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- The limit of a function is a fundamental concept in calculus and analysis concerning the behavior of a function near a particular input.
- The limit of a function is a fundamental concept in calculus and analysis concerning the behavior of that function near a particular input.
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- A function that is equal to its Taylor series in an open interval (or a disc in the complex plane) is known as an analytic function.
- The Taylor series of a real or complex-valued function $f(x)$ that is infinitely differentiable in a neighborhood of a real or complex number $a$ is the power series: