ALG1.MATH.10.D
Rewrite polynomial expressions of degree one and degree two in equivalent forms using the distributive property.
Algebra I · Texas Essential Knowledge and Skills (TEKS) · TEKS 2012
Standard Unwrapping
AI-generated as a starting point — sign in to edit.Vocabulary
polynomial expressionsdegree onedegree twoequivalent formsdistributive property
Skills
- identify (degree one and degree two polynomial expressions) #dok1
- rewrite (polynomial expressions using the distributive property) #dok2
- recognize (equivalent forms of polynomial expressions) #dok2
- apply (the distributive property to rewrite polynomial expressions) #dok2
- justify (steps in rewriting polynomials using the distributive property) #dok3
Learning Targets
- I can identify polynomial expressions of degree one and degree two. #dok1
- I can apply the distributive property to polynomial expressions. #dok2
- I can rewrite polynomial expressions of degree one and degree two in equivalent forms. #dok2
- I can recognize when two polynomial expressions are equivalent. #dok2
- I can justify each step when rewriting polynomial expressions using the distributive property. #dok3
Big Ideas
- The distributive property is a fundamental tool for rewriting polynomial expressions in equivalent forms.
- Recognizing and producing equivalent forms of polynomials supports simplifying expressions and solving algebraic problems.
Essential Questions
- How do you use the distributive property to rewrite polynomial expressions?
- Why is it important to recognize equivalent forms of polynomial expressions?
- What steps are involved in rewriting a polynomial using the distributive property?
- How can you prove that two polynomial expressions are equivalent?
- In what situations is rewriting polynomials in equivalent forms useful?