Composite Numbers: Definition, Examples, And The Fundamental Theorem Of Arithmetic

the fundamental theorem of algebra

any polynomial with complex coefficients has at least one complex root

The fundamental theorem of algebra states that every non-constant polynomial equation with complex coefficients has at least one complex root.

In other words, if we define a polynomial equation with complex coefficients:

p(z) = a_n * z^n + a_{n-1} * z^{n-1} + … + a_2 * z^2 + a_1 * z + a_0

where a_n, a_{n-1}, …, a_2, a_1, and a_0 are complex numbers and n is a positive integer, then there exists at least one complex number z such that:

p(z) = 0

This means that any polynomial of degree greater than or equal to 1 can be factored into linear factors, each of which has a complex root. For example, a quadratic equation x^2 + bx + c = 0 can always be factored into:

(x – z1)(x – z2) = 0

where z1 and z2 are complex numbers.

The fundamental theorem of algebra is a cornerstone of complex analysis and is a fundamental result in algebraic number theory. It has many applications in physics, engineering, and computer science, including signal processing, control systems, data analysis, and cryptography.

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