use the box method to distribute and simplify $(-x - x^3 + 1 - x^2)(-x - 3)$. drag and drop the terms to the correct locations of the table. $(-x - x^3 + 1 - x^2)(-x - 3)$ rows: 0 columns: 0

Question

Accepted Answer

# Explanation:
## Step1: Rearrange polynomials by degree
First polynomial: $-x^3 -x^2 -x + 1$
Second polynomial: $-x - 3$
## Step2: Set up box dimensions
Rows = number of terms in first polynomial = 4
Columns = number of terms in second polynomial = 2
## Step3: Fill box with products
|  | $-x$ | $-3$ |
|---|---|---|
| $-x^3$ | $(-x^3)(-x)=x^4$ | $(-x^3)(-3)=3x^3$ |
| $-x^2$ | $(-x^2)(-x)=x^3$ | $(-x^2)(-3)=3x^2$ |
| $-x$ | $(-x)(-x)=x^2$ | $(-x)(-3)=3x$ |
| $1$ | $(1)(-x)=-x$ | $(1)(-3)=-3$ |
## Step4: Combine like terms
$x^4 + (3x^3+x^3) + (3x^2+x^2) + (3x-x) -3$
$=x^4 + 4x^3 + 4x^2 + 2x -3$

# Answer:
### Box setup:
Rows: 4, Columns: 2
### Filled table:
|  | $-x$ | $-3$ |
|---|---|---|
| $-x^3$ | $x^4$ | $3x^3$ |
| $-x^2$ | $x^3$ | $3x^2$ |
| $-x$ | $x^2$ | $3x$ |
| $1$ | $-x$ | $-3$ |
### Simplified polynomial:
$x^4 + 4x^3 + 4x^2 + 2x - 3$

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QUESTION IMAGE

Question

Explanation:

Step1: Rearrange polynomials by degree

Step2: Set up box dimensions

Step3: Fill box with products

Step4: Combine like terms

Answer:

Box setup:

Filled table:

Simplified polynomial:

	$-x$	$-3$
$-x^2$	$(-x^2)(-x)=x^3$	$(-x^2)(-3)=3x^2$
$-x$	$(-x)(-x)=x^2$	$(-x)(-3)=3x$
$1$	$(1)(-x)=-x$	$(1)(-3)=-3$