A General Strategy for Factoring a Polynomial
... A General Strategy for Factoring a Polynomial 1. Do all the terms in the polynomial have a common factor? If so, factor out the Greatest Common Factor. Make sure that you don’t forget it in your final answer. Example: 24x 4 - 6x 2 = 6x 2 (4x 2 - 1). Also look to see if the other polynomial factor an ...
... A General Strategy for Factoring a Polynomial 1. Do all the terms in the polynomial have a common factor? If so, factor out the Greatest Common Factor. Make sure that you don’t forget it in your final answer. Example: 24x 4 - 6x 2 = 6x 2 (4x 2 - 1). Also look to see if the other polynomial factor an ...
a * b - St. Cloud State University
... • We stated that two integers a and b are relatively prime if their only common positive integer factor is 1; this is equivalent to saying that a and b are relatively prime if gcd(a,b) = 1 8 and 15 are relatively prime because the positive divisors of 8 are 1, 2, 4, and 8, and the positive divisors ...
... • We stated that two integers a and b are relatively prime if their only common positive integer factor is 1; this is equivalent to saying that a and b are relatively prime if gcd(a,b) = 1 8 and 15 are relatively prime because the positive divisors of 8 are 1, 2, 4, and 8, and the positive divisors ...
![CS 173 [A]: Discrete Structures, Fall 2012 Homework 2 Solutions](http://s1.studyres.com/store/data/014319362_1-2d95c2465d9d64c0e0b410399f5b1da5-300x300.png)
CS 173 [A]: Discrete Structures, Fall 2012 Homework 2 Solutions
... Recall the definition of divides: for integers a, b, a | b if and only if b = ak for some integer k. Let a, b, c ∈ Z. Prove using the definition of divides that if a | b and a | c, then a | b2 +10c. Solution: Let a, b, c be integers and suppose that a | b and a | c. Since a | b, there is an integer ...
... Recall the definition of divides: for integers a, b, a | b if and only if b = ak for some integer k. Let a, b, c ∈ Z. Prove using the definition of divides that if a | b and a | c, then a | b2 +10c. Solution: Let a, b, c be integers and suppose that a | b and a | c. Since a | b, there is an integer ...
PDF Section 3.11 Polynomial Rings Over Commutative Rings
... DEFINITION: An integral domain, R, with unit element is a unique factorization domain if (a) Any nonzero element in R is either a unit or can be written as the product of a finite number of irreducible elements of R. (b) The decomposition in part (a) is unique up to the order and associates of the i ...
... DEFINITION: An integral domain, R, with unit element is a unique factorization domain if (a) Any nonzero element in R is either a unit or can be written as the product of a finite number of irreducible elements of R. (b) The decomposition in part (a) is unique up to the order and associates of the i ...
COURSE OBJECTIVES Fall 2013
... Simplify a numerical expression using the rules for order of operations. Find the Least Common Multiple of two or more numbers. Simplify a rational number and add, subtract, multiply, and divide two rational numbers (, no variables involved). Simplify a numerical expression containing one or more sq ...
... Simplify a numerical expression using the rules for order of operations. Find the Least Common Multiple of two or more numbers. Simplify a rational number and add, subtract, multiply, and divide two rational numbers (, no variables involved). Simplify a numerical expression containing one or more sq ...
Checking Polynomial Identities over any Field: Towards a
... results in learning theory, and sparse multivariate polynomial interpolation also rely on checking polynomial identities [Zip79, GKS90, CDGK91, RB91]. Clearly, the problem is easy if the input polynomials are given as lists of coefficients (known as standard reduced form). However, in many cases the ...
... results in learning theory, and sparse multivariate polynomial interpolation also rely on checking polynomial identities [Zip79, GKS90, CDGK91, RB91]. Clearly, the problem is easy if the input polynomials are given as lists of coefficients (known as standard reduced form). However, in many cases the ...
Week7_1
... GF(q). Meaning that the elements in the codeword must be from GF(q). • The requirement is that the length of the code n must be n=qm-1 for some m. • Given m and n, suppose is a primitive element of GF(qm) with order n. • Get d-1elements: • The generator polynomial is the least common multiple of the ...
... GF(q). Meaning that the elements in the codeword must be from GF(q). • The requirement is that the length of the code n must be n=qm-1 for some m. • Given m and n, suppose is a primitive element of GF(qm) with order n. • Get d-1elements: • The generator polynomial is the least common multiple of the ...
solutions for the practice test
... rest is white.) If you want to make 15 gallons of 55% red paint, how much paint of each type should you mix? Let’s let x be the number of gallons of 20% red paint we use, and let y be the number of gallons of 80% red paint we use. When we mix these together, we get x + y gallons of paint, and we wan ...
... rest is white.) If you want to make 15 gallons of 55% red paint, how much paint of each type should you mix? Let’s let x be the number of gallons of 20% red paint we use, and let y be the number of gallons of 80% red paint we use. When we mix these together, we get x + y gallons of paint, and we wan ...
Factorization of Polynomials over Finite Fields
... a = p11 p22 · · · perr , where p1, . . . , pr are (zero or more) distinct prime elements of R. The representation is unique, except for multiplication with units and the order in which the primes occur. ...
... a = p11 p22 · · · perr , where p1, . . . , pr are (zero or more) distinct prime elements of R. The representation is unique, except for multiplication with units and the order in which the primes occur. ...
Rings of Fractions
... (1) Theorem 11 (Cancellation Law) tells us that if ab = ac and a is neither 0 nor a zero divisor, then b = c. (2) Zero divisors are never units. One upshot of the above is that ring elements that are not zero divisors possess some of the behavior of units. The goal of this section is to prove that e ...
... (1) Theorem 11 (Cancellation Law) tells us that if ab = ac and a is neither 0 nor a zero divisor, then b = c. (2) Zero divisors are never units. One upshot of the above is that ring elements that are not zero divisors possess some of the behavior of units. The goal of this section is to prove that e ...
Euclidean Algebra - Rosshall Academy
... First use the Euclidean algorithm to find the greatest common divisor ...
... First use the Euclidean algorithm to find the greatest common divisor ...
Rational Root Theorem
... For higher degree polynomials, finding the complex roots (real and imaginary) is easier if we know one of the roots. Descartes’ Rule of Signs can help get you started. Complete the table below: ...
... For higher degree polynomials, finding the complex roots (real and imaginary) is easier if we know one of the roots. Descartes’ Rule of Signs can help get you started. Complete the table below: ...