Drag the locator, which represents the complex number z. The gray dots represent the n solutions of the equation β^n = z. As you drag z notice these n roots are always the vertices of a regular polygon. You can explore the powers of β_n for each of the n choices of βComponente Curricular::Educação Superior::Ciências Exatas e da Terra::Matemátic
Abstract. Given any complex number a, we prove that there are infinitely many simple roots of the eq...
An example of finding the cube roots of a complex number by first converting the number from Cartesi...
This illustrates complex power functions acting on the unit circle. Each line joins a point z to z^a...
Drag the locator, which represents the complex number z. The gray dots represent the n solutions of...
For a polynomial p(z), the roots of p'(z) (red) always lie within the convex hull of the roots of p...
Deduces de formula for finding the roots of a complex number using as an example the cube roots of u...
textThis master’s report seeks to increase knowledge of complex numbers and how to identify complex ...
Four points in the complex plane can be the roots of a complex polynomial of degree four. Solid line...
Presents program that will evalute complex expressions, find the n th roots of a complex number (n <...
Complex numbers, roots of a polynomial, Argument PrincipleIn the complex plane, consider the image o...
Imagine a sphere with its equator inscribed in an equilateral triangle. This Saturn-like figure will...
The graph of a polynomial with roots c_1, c_2, c_3... meets the x axis at those roots. At a simple r...
The roots of a cubic polynomial depend on the coefficients of the cubic in a complicated way. In thi...
We will explore various numeric methods of finding roots of an analytic function over some open set ...
Knowledge about complex analysis, complex numbers and exponents and logarithmsRaise complex numbers ...
Abstract. Given any complex number a, we prove that there are infinitely many simple roots of the eq...
An example of finding the cube roots of a complex number by first converting the number from Cartesi...
This illustrates complex power functions acting on the unit circle. Each line joins a point z to z^a...
Drag the locator, which represents the complex number z. The gray dots represent the n solutions of...
For a polynomial p(z), the roots of p'(z) (red) always lie within the convex hull of the roots of p...
Deduces de formula for finding the roots of a complex number using as an example the cube roots of u...
textThis master’s report seeks to increase knowledge of complex numbers and how to identify complex ...
Four points in the complex plane can be the roots of a complex polynomial of degree four. Solid line...
Presents program that will evalute complex expressions, find the n th roots of a complex number (n <...
Complex numbers, roots of a polynomial, Argument PrincipleIn the complex plane, consider the image o...
Imagine a sphere with its equator inscribed in an equilateral triangle. This Saturn-like figure will...
The graph of a polynomial with roots c_1, c_2, c_3... meets the x axis at those roots. At a simple r...
The roots of a cubic polynomial depend on the coefficients of the cubic in a complicated way. In thi...
We will explore various numeric methods of finding roots of an analytic function over some open set ...
Knowledge about complex analysis, complex numbers and exponents and logarithmsRaise complex numbers ...
Abstract. Given any complex number a, we prove that there are infinitely many simple roots of the eq...
An example of finding the cube roots of a complex number by first converting the number from Cartesi...
This illustrates complex power functions acting on the unit circle. Each line joins a point z to z^a...