<--- Back to Details
First PageDocument Content
Polynomials / Abstract algebra / Equations / Algebraic numbers / Complex numbers / Cubic function / Root of unity / Nth root / Quadratic equation / Mathematics / Algebra / Elementary algebra
Date: 2006-09-13 12:17:44
Polynomials
Abstract algebra
Equations
Algebraic numbers
Complex numbers
Cubic function
Root of unity
Nth root
Quadratic equation
Mathematics
Algebra
Elementary algebra

Add to Reading List

Source URL: www.mindspring.com

Download Document from Source Website

File Size: 39,59 KB

Share Document on Facebook

Similar Documents

Algebraic geometry / Geometry / Abstract algebra / Algebraic curves / Divisor / Projective variety / Theta divisor / Abelian variety / Prym variety / Resolution of singularities / Ample line bundle / Hyperelliptic curve

Singularities of divisors on abelian varieties Olivier Debarre March 20, 2006 This is joint work with Christopher Hacon. We work over the complex numbers. Let D be an effective divisor on an abelian variety A of dimensio

DocID: 1xViY - View Document

Abstract algebra / Algebra / Geometry / Algebraic geometry / Fano variety / Birational geometry / Divisor / Projective variety / Coherent sheaf / Hodge structure / Cohomology / Ample line bundle

CURVES OF LOW DEGREES IN FANO VARIETIES OLIVIER DEBARRE Abstract. We work over the complex numbers. Fano manifolds are smooth projective varieties whose canonical bundle is antiample. In dimensions at most 3, they are al

DocID: 1xTWm - View Document

Classroom Voting Questions: Precalculus The Trigonometric Form of Complex Numbers 1. Find |7 − 4i|. (a) (b) (c)

DocID: 1vdvK - View Document

Quiz 2: Complex Numbers II

DocID: 1v4x9 - View Document

ALGEBRAIC COGROUPS AND NORI MOTIVES JAVIER FRESÁN AND PETER JOSSEN Abstract. We introduce the notion of algebraic cogroup over a subfield k of the complex numbers and use it to prove that every Nori motive over k is iso

DocID: 1uT4Q - View Document