# A rectangle has sides measuring (6x + 4) units and (2x + 11) units. Part A: What is the expression that represents the area of the rectangle? Show your work. (4 points) Part B: What are the degree and classification of the expression obtained in Part A? (3 points) Part C: How does Part A demonstrate the closure property for polynomials? (3 points) LEGIT ANWSERS ONLY NO LINKS

###### Question:

Part A: What is the expression that represents the area of the rectangle? Show your work. (4 points)

Part B: What are the degree and classification of the expression obtained in Part A? (3 points)

Part C: How does Part A demonstrate the closure property for polynomials? (3 points)

LEGIT ANWSERS ONLY NO LINKS

## Answers

A rectangle has sides measuring (6x + 4) units and (2x + 11) units.Area of the rectangle =[tex]12x^2+74x+44[/tex]Degree is 2 and it is a trinomial To find out the area we multiplied two binomials . It demonstrate the closure property Given :A rectangle has sides measuring (6x + 4) units and (2x + 11) units.Area of the rectangle is length times width length is 6x+4 and width is 2x+11We multiply it to find the area [tex]Area =(6x+4)(2x+11)\\Area = 6x\cdot \:2x+6x\cdot \:11+4\cdot \:2x+4\cdot \:11\\combine \; like \; terms\\Area =12x^2+74x+44[/tex]Expression for the area of the rectangle is [tex]12x^2+74x+44[/tex]Degree is the highest exponent In that expression the highest exponent is 2 and it has three terms Degree is 2 and it is a trinomial expression Closure property says that if an operation produces another polynomial then the polynomial will be closed under operation To find out the area we multiplied two binomials [tex]\left(6x+4\right)\left(2x+11\right)[/tex]It demonstrate the closure property Learn more : brainly.com/question/22811803

A rectangle has sides measuring (6x + 4) units and (2x + 11) units. Area of the rectangle = The Degree is 2 and it is a trinomial To find out the area we multiplied two binomials. It demonstrates the closure of property Given : A rectangle has sides measuring (6x + 4) units and (2x + 11) units. The Area of the rectangle is length times width length is 6x+4 and width is 2x+11 We multiply it to find the area Expression for the area of the rectangle is The Degree is the highest exponent In that expression, the highest exponent is 2 and it has three terms The Degree is 2 and it is a trinomial expression Closure property says that if an operation produces another polynomial then the polynomial will be closed under an operation To find out the area we multiplied two binomials It demonstrates the closure of the property(TREAT THIS LIKE THE TUTOR VERIFIED! TO TELL IF ITS RIGHT OR NOT)