https://www.khanacademy.org/math/algebra-home/alg-polynomials/alg-long-division-of-polynomials/v/dividing-polynomials-1 2020-11-06T18:53:41Z Dividing polynomials: long division Sal divides (x^2-3x+2) by (x-2) and then checks the solution. Sal Khan video https://cdn.kastatic.org/googleusercontent/a9ujl9yhEtZzGrgST401QsCQ28cCWOQRz7omLfnXxpdgoxovxNGC2zzg6-3pjyke15KTC6XMvEmjL784bhluEB02 Dividing polynomials: long division Sal divides (x^2-3x+2) by (x-2) and then checks the solution. https://cdn.kastatic.org/ka-youtube-converted/8Wxw9bpKEGQ.mp4/8Wxw9bpKEGQ.mp4 200 Dividing polynomials https://www.khanacademy.org/math/algebra2/x2ec2f6f830c9fb89:poly-div/x2ec2f6f830c9fb89:remainder-theorem/v/polynomial-remainder-theorem 2023-10-20T17:36:47.087596279Z Intro to the Polynomial Remainder Theorem The Polynomial Remainder Theorem allows us to determine whether a linear expression is a factor of a polynomial expression easily. It tells us the remainder when a polynomial is divided by \[x - a\] is \[f(a)\]. This means if \[x - a\] is a factor of the polynomial, the remainder is zero. It's a neat trick to quickly find remainders without doing long division! video https://cdn.kastatic.org/googleusercontent/A7Mn0-RlnewSTPhArUUEQdaveGrH5a8EdaO7Ns_HHm-WbeGRBt0rbt897PMxuhOGR1V53CjTKN_FYZ8gwjaNjOtI Intro to the Polynomial Remainder Theorem The Polynomial Remainder Theorem allows us to determine whether a linear expression is a factor of a polynomial expression easily. It tells us the remainder when a polynomial is divided by \[x - a\] is \[f(a)\]. This means if \[x - a\] is a factor of the polynomial, the remainder is zero. It's a neat trick to quickly find remainders without doing long division! https://cdn.kastatic.org/ka-youtube-converted/MwG6QD352yc.mp4/MwG6QD352yc.mp4 403 Dividing polynomials https://www.khanacademy.org/math/algebra2/x2ec2f6f830c9fb89:poly-div/x2ec2f6f830c9fb89:remainder-theorem/e/remainder-theorem-of-polynomials 2025-02-27T11:46:16.621461116Z Remainder theorem Use the PRT (Polynomial Remainder Theorem) to determine the factors of polynomials and their remainders when divided by linear expressions. Tomer Gal exercise