5.4 Part 1 Practice - Factoring Polynomials Completely

Authored by Barnhill Kaitlyn

Mathematics

11th Grade

CCSS covered

Used 4+ times

5.4 Part 1 Practice - Factoring Polynomials Completely

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MATH RESPONSE QUESTION

2 mins • 1 pt

Mathematical Equivalence

Answer explanation

First, factor out the GCF. All terms have an "x" in common, so that is the GCF.
Next, factor the remaining expression using box method or reverse FOIL.
Write your answer as GCF(factor)(factor).

MATH RESPONSE QUESTION

2 mins • 1 pt

Mathematical Equivalence

Answer explanation

First, factor out the GCF. Both terms have an "4k^3" in common, so that is the GCF.
Next, factor the remaining expression using the "difference of squares" formula, box method, or reverse foil.
Write your answer as GCF(factor)(factor).

MATH RESPONSE QUESTION

2 mins • 1 pt

Mathematical Equivalence

Answer explanation

First, factor out the GCF. Both terms have an "3x^3" in common, so that is the GCF.
Next, factor the remaining expression using the "difference of squares" pattern, the box method, or reverse FOIL.
Write your answer as GCF(factor)(factor).

First, factor out the GCF. All terms have an "2m^4" in common, so that is the GCF.
Next, factor the remaining expression using box method or reverse FOIL.
Write your answer as GCF(factor)(factor).

MATH RESPONSE QUESTION

2 mins • 1 pt

Mathematical Equivalence

Answer explanation

First, factor out the GCF. All terms have an "x^2" in common, so that is the GCF.
Next, factor the remaining expression using box method or reverse FOIL.
Write your answer as GCF(factor)(factor).

MATH RESPONSE QUESTION

2 mins • 1 pt

Mathematical Equivalence

Answer explanation

First, factor out the GCF. All terms have an "x^4" in common, so that is the GCF.
Next, factor the remaining expression using box method or reverse FOIL.
Write your answer as GCF(factor)(factor).

MATH RESPONSE QUESTION

2 mins • 1 pt

Mathematical Equivalence

Answer explanation

First, factor out the GCF. All terms have an "w^8" in common, so that is the GCF.
Next, factor the remaining expression using box method or reverse FOIL.
Write your answer as GCF(factor)(factor).

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5.4 Part 1 Practice - Factoring Polynomials Completely

First, factor out the GCF. All terms have an "x" in common, so that is the GCF.Next, factor the remaining expression using box method or reverse FOIL.Write your answer as GCF(factor)(factor).

First, factor out the GCF. Both terms have an "4k^3" in common, so that is the GCF.Next, factor the remaining expression using the "difference of squares" formula, box method, or reverse foil.Write your answer as GCF(factor)(factor).

First, factor out the GCF. Both terms have an "3x^3" in common, so that is the GCF.Next, factor the remaining expression using the "difference of squares" pattern, the box method, or reverse FOIL.Write your answer as GCF(factor)(factor).

First, factor out the GCF. All terms have an "2m^4" in common, so that is the GCF.Next, factor the remaining expression using box method or reverse FOIL.Write your answer as GCF(factor)(factor).

First, factor out the GCF. All terms have an "x^2" in common, so that is the GCF.Next, factor the remaining expression using box method or reverse FOIL.Write your answer as GCF(factor)(factor).

First, factor out the GCF. All terms have an "x^4" in common, so that is the GCF.Next, factor the remaining expression using box method or reverse FOIL.Write your answer as GCF(factor)(factor).

First, factor out the GCF. All terms have an "w^8" in common, so that is the GCF.Next, factor the remaining expression using box method or reverse FOIL.Write your answer as GCF(factor)(factor).

First, factor out the GCF. All terms have an "v^7" in common, so that is the GCF.Next, factor the remaining expression using box method or reverse FOIL.Write your answer as GCF(factor)(factor).

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First, factor out the GCF. All terms have an "x" in common, so that is the GCF.
Next, factor the remaining expression using box method or reverse FOIL.
Write your answer as GCF(factor)(factor).

First, factor out the GCF. Both terms have an "4k^3" in common, so that is the GCF.
Next, factor the remaining expression using the "difference of squares" formula, box method, or reverse foil.
Write your answer as GCF(factor)(factor).

First, factor out the GCF. Both terms have an "3x^3" in common, so that is the GCF.
Next, factor the remaining expression using the "difference of squares" pattern, the box method, or reverse FOIL.
Write your answer as GCF(factor)(factor).

First, factor out the GCF. All terms have an "2m^4" in common, so that is the GCF.
Next, factor the remaining expression using box method or reverse FOIL.
Write your answer as GCF(factor)(factor).

First, factor out the GCF. All terms have an "x^2" in common, so that is the GCF.
Next, factor the remaining expression using box method or reverse FOIL.
Write your answer as GCF(factor)(factor).

First, factor out the GCF. All terms have an "x^4" in common, so that is the GCF.
Next, factor the remaining expression using box method or reverse FOIL.
Write your answer as GCF(factor)(factor).

First, factor out the GCF. All terms have an "w^8" in common, so that is the GCF.
Next, factor the remaining expression using box method or reverse FOIL.
Write your answer as GCF(factor)(factor).

First, factor out the GCF. All terms have an "v^7" in common, so that is the GCF.
Next, factor the remaining expression using box method or reverse FOIL.
Write your answer as GCF(factor)(factor).