A2.6
Factor polynomials using common factoring techniques, and use the factored form of a polynomial to reveal the zeros of the function it defines.
Example Problems
Factor completely:
Factor completely:
Factor completely:
Khan Academy ResourcesFactoring quadratics in any formFactoring quadratics: Difference of squaresFactoring quadratics: Perfect squaresFactoring by groupingFactoring quadratics: leading coefficient = 1Factoring simple quadratics reviewFactoring quadratics: leading coefficient ≠ 1Factoring quadratics introFactor quadratics by groupingPerfect squares introFactoring quadratics with a common factorGCF factoring introductionFactoring quadratics as (x+a)(x+b) (example 2)Factoring perfect squaresMore examples of factoring quadratics as (x+a)(x+b)Intro to groupingFactoring quadratics by groupingFactoring quadratics: common factor + groupingFactoring quadratics: negative common factor + groupingFactoring perfect squares: negative common factorPerfect square factorization introFactoring quadratics as (x+a)(x+b)Factoring difference of squares: shared factorsFactoring perfect squares: shared factorsStrategy in factoring quadratics (part 1 of 2)Factoring difference of squares: analyzing factorizationFactoring difference of squares: leading coefficient ≠ 1Strategy in factoring quadratics (part 2 of 2)Factoring quadratics with a common factorFactoring completely with a common factor
1-on-1 AI tutoring aligned to A2.6. Instant help for students, real-time insights for teachers.
Used in classrooms by 100,000+ students at Baltimore County, Plano ISD, Deer Valley USD, KIPP, and districts nationwide.
Free for teachers, forever →