Lecture 9 - MyCourses
... that is, the length of the private exponent a is less than about one fourth of the length of n, then a can be computed in polynomial time with respect to the length of n. Proof. We show that k /a is a convergent of b/n. If this is the case, then k /a can be computed in polynomial time using Euclid’s ...
... that is, the length of the private exponent a is less than about one fourth of the length of n, then a can be computed in polynomial time with respect to the length of n. Proof. We show that k /a is a convergent of b/n. If this is the case, then k /a can be computed in polynomial time using Euclid’s ...
Hypergeometric Solutions of Linear Recurrences with Polynomial
... sums . Since algorithm Hyper can be used to obtain a basis for the space of solutions of (1 .2) belonging to C(HK), the combination of Zeilberger's algorithm with Hyper, followed by solving a system of linear algebraic equations gives an algorithm for deciding whether (1 .4) is a linear combination ...
... sums . Since algorithm Hyper can be used to obtain a basis for the space of solutions of (1 .2) belonging to C(HK), the combination of Zeilberger's algorithm with Hyper, followed by solving a system of linear algebraic equations gives an algorithm for deciding whether (1 .4) is a linear combination ...
w (n/2)
... Theorem1: for any set {(x0, y0),…,(xn-\, yn-1)} on n distinct points there is a unique polynomial C(x) with degree less than n such that yi = C(xi) for i = 0,1,…, n-1. n 1 ...
... Theorem1: for any set {(x0, y0),…,(xn-\, yn-1)} on n distinct points there is a unique polynomial C(x) with degree less than n such that yi = C(xi) for i = 0,1,…, n-1. n 1 ...
Practice Assignment 6 - GUC MET
... • even positive numbers • odd positive numbers Note that a number X is even if the value of 2∗ the integer value of X/2 is equal to X, and is odd otherwise (except for the zero value). Example: Testing whether the number 7 is even or odd: INT(7/2) ∗ 2 = 3 ∗ 2 = 6. Since 6 6= 7, then 7 is an odd numb ...
... • even positive numbers • odd positive numbers Note that a number X is even if the value of 2∗ the integer value of X/2 is equal to X, and is odd otherwise (except for the zero value). Example: Testing whether the number 7 is even or odd: INT(7/2) ∗ 2 = 3 ∗ 2 = 6. Since 6 6= 7, then 7 is an odd numb ...
SectionGroups
... Example 9: Determine if Z m is an abelian group under the addition operator. Solution: For a, b, c Z m , we show it satisfies the 4 properties for a group. To do this, let the binary operation m denote the addition modulo m (for example, a m b can be thought of computationally as finding the i ...
... Example 9: Determine if Z m is an abelian group under the addition operator. Solution: For a, b, c Z m , we show it satisfies the 4 properties for a group. To do this, let the binary operation m denote the addition modulo m (for example, a m b can be thought of computationally as finding the i ...
09 finite fields - Math User Home Pages
... factor of x, all elements of L are roots of xp − x = 0. Thus, with L sitting inside the fixed algebraic closure E of Fp , since a degree pn equation has at most pn roots in E, the elements of L must be just the field K constructed earlier. [5] This proves uniqueness (up to isomorphism). [6] Inside a ...
... factor of x, all elements of L are roots of xp − x = 0. Thus, with L sitting inside the fixed algebraic closure E of Fp , since a degree pn equation has at most pn roots in E, the elements of L must be just the field K constructed earlier. [5] This proves uniqueness (up to isomorphism). [6] Inside a ...
REMARKS ON WILMSHURST`S THEOREM 1. Introduction Suppose
... We state the counterexamples in Section 2 and prove this estimate on the number of zeros. In Section 3, we give an alternative proof of Wilmshurst’s theorem that relies more heavily on real algebraic geometry and readily generalizes to harmonic vector fields in higher dimensions but with a weaker co ...
... We state the counterexamples in Section 2 and prove this estimate on the number of zeros. In Section 3, we give an alternative proof of Wilmshurst’s theorem that relies more heavily on real algebraic geometry and readily generalizes to harmonic vector fields in higher dimensions but with a weaker co ...
Add, Subtract, Multiply Polynomials
... The constant term is the term without a variable. The degree is 3. ...
... The constant term is the term without a variable. The degree is 3. ...
Fermat`s and Euler`s Theorem
... Questions for Section 20: Fermat’s and Euler’s Theorem 1. Some preliminaries: let us carefully work out the addition and multiplication table for the ring Z/nZ. By definition, this set consists of the cosets [a] = a + nZ = {a + nk : k ∈ Z}. We will define [a] + [b] = [a + b] and [a][b] = [ab]. We mu ...
... Questions for Section 20: Fermat’s and Euler’s Theorem 1. Some preliminaries: let us carefully work out the addition and multiplication table for the ring Z/nZ. By definition, this set consists of the cosets [a] = a + nZ = {a + nk : k ∈ Z}. We will define [a] + [b] = [a + b] and [a][b] = [ab]. We mu ...
Curriculum Map: Algebra 1 - Merrillville Community School
... i. From “y =” , introduce ”f(x) =” as function notation 1. Create tables and plot points from generated tables 2. Reinforce the independent and dependent variables in table 3. Show (x, f(x)) as an infinite number of points from table as the independent variable determines the dependent variable ii. ...
... i. From “y =” , introduce ”f(x) =” as function notation 1. Create tables and plot points from generated tables 2. Reinforce the independent and dependent variables in table 3. Show (x, f(x)) as an infinite number of points from table as the independent variable determines the dependent variable ii. ...
Parallel lines: Application for a multiphase flow
... INTERNATIONAL JOURNAL of MATHEMATICS AND COMPUTERS IN SIMULATION ...
... INTERNATIONAL JOURNAL of MATHEMATICS AND COMPUTERS IN SIMULATION ...
PDF
... We already saw an example of a ring (and a domain) that was not a UFD. Here is an example of a ring that is not a PID. Consider a field K and look at the ring of polynomials on two variables X, Y over this field. This is denoted by K[X, Y ]. In this field, look at the ideal generated by X and Y. Tha ...
... We already saw an example of a ring (and a domain) that was not a UFD. Here is an example of a ring that is not a PID. Consider a field K and look at the ring of polynomials on two variables X, Y over this field. This is denoted by K[X, Y ]. In this field, look at the ideal generated by X and Y. Tha ...
Unit 5 Home Work Packet ~ Polynomial Functions
... a. Determine the number of turning points _________________________ b. Identify all relative minimum/maximum points. _____________________________________________ c. Identify all absolute minimum/maximum points. _____________________________________________ d. Over what intervals is f(x) Decreasing_ ...
... a. Determine the number of turning points _________________________ b. Identify all relative minimum/maximum points. _____________________________________________ c. Identify all absolute minimum/maximum points. _____________________________________________ d. Over what intervals is f(x) Decreasing_ ...