Jove
Visualize
Contact Us

Related Concept Videos

Introduction to Polynomial Functions01:26

Introduction to Polynomial Functions

500
Polynomial functions are fundamental elements in algebra and calculus, defined by expressions that combine variables and constants through addition, subtraction, and multiplication, with the variable raised to nonnegative integer exponents. A general polynomial function of degree n is given byWhere an ≠ 0. The term anxn is the leading term, and an is the leading coefficient, while a0 is referred to as the constant term.Characteristics and ClassificationPolynomials are categorized by their...
500
Routh-Hurwitz Criterion II01:19

Routh-Hurwitz Criterion II

1.3K
In the application of the Routh-Hurwitz criterion, two specific scenarios can arise that complicate stability analysis.
The first scenario occurs when a singular zero appears in the first column of the Routh table. This situation creates a division by zero issues. To resolve this, a small positive or negative number, denoted as epsilon (∈), is substituted for the zero. The stability analysis proceeds by assuming a sign for ∈. If ∈ is positive, any sign change in the first...
1.3K
Fundamental Theorem of Algebra01:30

Fundamental Theorem of Algebra

496
The Fundamental Theorem of Algebra is central to the study of polynomial equations, asserting that every non-constant polynomial with complex coefficients has at least one complex zero. This means that a polynomial of degree n ≥ 1, written as:  with an ≠ 0, has at least one solution in the complex number system. Since the set of real numbers is a subset of complex numbers, this theorem applies equally to polynomials with real coefficients.Building on this result, the...
496
Long Division of Polynomials01:26

Long Division of Polynomials

732
Polynomial division is an essential algebraic process to simplify expressions and solve equations. Just as numerical division separates a number into quotient and remainder, polynomial long division partitions a polynomial into simpler components; in this context, the dividend is the polynomial being divided, the divisor is the expression dividing it, and the result is expressed in terms of a quotient and a remainder.The division begins by arranging the dividend and divisor in standard...
732
Real Zeros of Polynomials01:27

Real Zeros of Polynomials

327
Polynomials are algebraic expressions of terms with variables raised to non-negative integer powers. A central aspect of analyzing polynomial functions is determining their real zeros—values of the variable for which the polynomial evaluates to zero. These values represent the x-intercepts of the polynomial’s graph.The Rational Zeros Theorem lists possible rational solutions for a polynomial equation with integer coefficients. If f(x)=anxn+....+a0​, then every rational zero is...
327
Complex Zeros01:29

Complex Zeros

422
Complex zeros are the solutions to polynomial equations that include imaginary numbers, specifically, numbers of the form a + bi, where a and b are real numbers and i is the imaginary unit defined by i2=-1. These zeros satisfy the equation P(x) = 0, where P(x) is a polynomial with real or complex coefficients. Since the complex number system includes all real numbers, it provides a complete framework for analyzing all possible roots of a polynomial.Every polynomial of degree n≥1 can be...
422

You might also read

Related Articles

Articles linked to this work by shared authors, journal, and citation graph.

Sort by
Same journal

Opportunities and Challenges of Integrating Ethiopian Traditional Medicine System Into Modern Medicine: A Narrative Review.

TheScientificWorldJournal·2026
Same journal

Exploring the Antiparasitic Activity of the Sea Cucumber Isostichopus sp. aff. badionotus From the Northern Coast of Colombia Against Trypanosoma cruzi.

TheScientificWorldJournal·2026
Same journal

Kalanchoe ceratophylla (Crassulaceae): The True Identity of Sidingin, a Medicinal Plant From Sumatra, Based on Morphological and Molecular Evidence.

TheScientificWorldJournal·2026
Same journal

Genetic Variation of Chicken Growth Differentiation Factor-9 Gene and Association With Egg Characteristics: A Systematic Review.

TheScientificWorldJournal·2026
Same journal

Applied Research on the Effect of Risks on Public Health Building Projects' Performance: Empirical Results From Tanzania.

TheScientificWorldJournal·2026
Same journal

Projected Impacts of Climate and Land Use/Land Cover Change on Sediment Yield and Surface Runoff in the Baro River Sub-Basin, Ethiopia.

TheScientificWorldJournal·2026
See all related articles
JoVE
x logofacebook logolinkedin logoyoutube logo
ABOUT JoVE
OverviewLeadershipBlogJoVE Help Center
AUTHORS
Publishing ProcessEditorial BoardScope & PoliciesPeer ReviewFAQSubmit
LIBRARIANS
TestimonialsSubscriptionsAccessResourcesLibrary Advisory BoardFAQ
RESEARCH
JoVE JournalMethods CollectionsJoVE Encyclopedia of ExperimentsArchive
EDUCATION
JoVE CoreJoVE BusinessJoVE Science EducationJoVE Lab ManualFaculty Resource CenterFaculty Site
Terms & Conditions of Use
Privacy Policy
Policies

Related Experiment Video

Updated: Apr 23, 2026

Generation and Coherent Control of Pulsed Quantum Frequency Combs
06:42

Generation and Coherent Control of Pulsed Quantum Frequency Combs

Published on: June 8, 2018

8.9K

The trigonometric polynomial like Bernstein polynomial.

Xuli Han1

  • 1School of Mathematics and Statistics, Central South University, Changsha 410083, China.

Thescientificworldjournal
|October 3, 2014
PubMed
Summary
This summary is machine-generated.

This study introduces a symmetric basis for trigonometric polynomials, enabling the construction of novel symmetric polynomial approximants. These approximants demonstrate uniform convergence and derivative convergence, advancing approximation theory.

More Related Videos

Optimization of Processing of Tiebangchui with Highland Barley Wine Based on the Box-Behnken Design Combined with the Entropy Method
09:12

Optimization of Processing of Tiebangchui with Highland Barley Wine Based on the Box-Behnken Design Combined with the Entropy Method

Published on: May 19, 2023

1.2K

Related Experiment Videos

Last Updated: Apr 23, 2026

Generation and Coherent Control of Pulsed Quantum Frequency Combs
06:42

Generation and Coherent Control of Pulsed Quantum Frequency Combs

Published on: June 8, 2018

8.9K
Optimization of Processing of Tiebangchui with Highland Barley Wine Based on the Box-Behnken Design Combined with the Entropy Method
09:12

Optimization of Processing of Tiebangchui with Highland Barley Wine Based on the Box-Behnken Design Combined with the Entropy Method

Published on: May 19, 2023

1.2K

Area of Science:

  • Mathematics
  • Approximation Theory
  • Numerical Analysis

Background:

  • Trigonometric polynomials are fundamental in Fourier analysis and signal processing.
  • Existing approximation methods may lack symmetry properties crucial for certain applications.
  • The need for symmetric basis functions in trigonometric polynomial spaces is recognized.

Purpose of the Study:

  • To present a novel symmetric basis for trigonometric polynomial spaces.
  • To construct symmetric trigonometric polynomial approximants analogous to Bernstein polynomials.
  • To analyze the convergence properties of these new approximants and their derivatives.

Main Methods:

  • Development of a symmetric basis for trigonometric polynomial spaces.
  • Construction of symmetric trigonometric polynomial approximants using the new basis.
  • Application of specific node sets to demonstrate uniform convergence.
  • Analysis of the convergence of the derivatives of the constructed polynomials.
  • Creation of trigonometric quasi-interpolants for reproducing trigonometric polynomials.

Main Results:

  • A new symmetric basis for trigonometric polynomial spaces is successfully established.
  • Symmetric trigonometric polynomial approximants, including analogs of Bernstein polynomials, are constructed.
  • Uniform convergence of the trigonometric polynomial sequence is proven using specific node distributions.
  • Convergence of the derivatives of the trigonometric polynomials is demonstrated.
  • Trigonometric quasi-interpolants with reproducing properties are developed.

Conclusions:

  • The presented symmetric basis provides a powerful tool for constructing symmetric trigonometric polynomial approximants.
  • The established convergence properties ensure the reliability and applicability of these approximants.
  • The work contributes to the field of approximation theory by extending symmetric polynomial constructions to trigonometric spaces.