find each quotient using long division.
1. $(k^3 - 10k^2 + k + 1) \div (k - 1)$
2. $(x^4 + 4x^3 - 28x^2 - 45x + 26) \div (x + 7)$
3. $(20c^3 + 22c^2 - 7c + 7) \div (5c - 2)$
4. $(3n^4 + 6n^3 - 15n^2 + 32n - 25) \div (n + 4)$

Question

Accepted Answer

# Explanation:
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### Problem 1: $(k^3 - 10k^2 + k + 1) \div (k - 1)$
## Step1: Divide leading terms
$\frac{k^3}{k} = k^2$
Multiply divisor by $k^2$: $k^2(k-1)=k^3 - k^2$
Subtract from dividend:
$(k^3 -10k^2 +k +1)-(k^3 -k^2) = -9k^2 +k +1$

## Step2: Divide new leading term
$\frac{-9k^2}{k} = -9k$
Multiply divisor by $-9k$: $-9k(k-1)=-9k^2 +9k$
Subtract:
$(-9k^2 +k +1)-(-9k^2 +9k) = -8k +1$

## Step3: Divide new leading term
$\frac{-8k}{k} = -8$
Multiply divisor by $-8$: $-8(k-1)=-8k +8$
Subtract:
$(-8k +1)-(-8k +8) = -7$

# Answer for 1:
$k^2 -9k -8 - \frac{7}{k-1}$
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### Problem 2: $(x^4 + 4x^3 -28x^2 -45x +26) \div (x+7)$
## Step1: Divide leading terms
$\frac{x^4}{x} = x^3$
Multiply divisor by $x^3$: $x^3(x+7)=x^4 +7x^3$
Subtract from dividend:
$(x^4 +4x^3 -28x^2 -45x +26)-(x^4 +7x^3) = -3x^3 -28x^2 -45x +26$

## Step2: Divide new leading term
$\frac{-3x^3}{x} = -3x^2$
Multiply divisor by $-3x^2$: $-3x^2(x+7)=-3x^3 -21x^2$
Subtract:
$(-3x^3 -28x^2 -45x +26)-(-3x^3 -21x^2) = -7x^2 -45x +26$

## Step3: Divide new leading term
$\frac{-7x^2}{x} = -7x$
Multiply divisor by $-7x$: $-7x(x+7)=-7x^2 -49x$
Subtract:
$(-7x^2 -45x +26)-(-7x^2 -49x) = 4x +26$

## Step4: Divide new leading term
$\frac{4x}{x} = 4$
Multiply divisor by $4$: $4(x+7)=4x +28$
Subtract:
$(4x +26)-(4x +28) = -2$

# Answer for 2:
$x^3 -3x^2 -7x +4 - \frac{2}{x+7}$
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### Problem 3: $(20c^3 +22c^2 -7c +7) \div (5c-2)$
## Step1: Divide leading terms
$\frac{20c^3}{5c} = 4c^2$
Multiply divisor by $4c^2$: $4c^2(5c-2)=20c^3 -8c^2$
Subtract from dividend:
$(20c^3 +22c^2 -7c +7)-(20c^3 -8c^2) = 30c^2 -7c +7$

## Step2: Divide new leading term
$\frac{30c^2}{5c} = 6c$
Multiply divisor by $6c$: $6c(5c-2)=30c^2 -12c$
Subtract:
$(30c^2 -7c +7)-(30c^2 -12c) = 5c +7$

## Step3: Divide new leading term
$\frac{5c}{5c} = 1$
Multiply divisor by $1$: $1(5c-2)=5c -2$
Subtract:
$(5c +7)-(5c -2) = 9$

# Answer for 3:
$4c^2 +6c +1 + \frac{9}{5c-2}$
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### Problem 4: $(3n^4 +6n^3 -15n^2 +32n -25) \div (n+4)$
## Step1: Divide leading terms
$\frac{3n^4}{n} = 3n^3$
Multiply divisor by $3n^3$: $3n^3(n+4)=3n^4 +12n^3$
Subtract from dividend:
$(3n^4 +6n^3 -15n^2 +32n -25)-(3n^4 +12n^3) = -6n^3 -15n^2 +32n -25$

## Step2: Divide new leading term
$\frac{-6n^3}{n} = -6n^2$
Multiply divisor by $-6n^2$: $-6n^2(n+4)=-6n^3 -24n^2$
Subtract:
$(-6n^3 -15n^2 +32n -25)-(-6n^3 -24n^2) = 9n^2 +32n -25$

## Step3: Divide new leading term
$\frac{9n^2}{n} = 9n$
Multiply divisor by $9n$: $9n(n+4)=9n^2 +36n$
Subtract:
$(9n^2 +32n -25)-(9n^2 +36n) = -4n -25$

## Step4: Divide new leading term
$\frac{-4n}{n} = -4$
Multiply divisor by $-4$: $-4(n+4)=-4n -16$
Subtract:
$(-4n -25)-(-4n -16) = -9$

# Answer for 4:
$3n^3 -6n^2 +9n -4 - \frac{9}{n+4}$

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QUESTION IMAGE

Question

Explanation:

Problem 1: $(k^3 - 10k^2 + k + 1) \div (k - 1)$

Step1: Divide leading terms

Step2: Divide new leading term

Step3: Divide new leading term

Answer:

Problem 2: $(x^4 + 4x^3 -28x^2 -45x +26) \div (x+7)$

Step1: Divide leading terms

Step2: Divide new leading term

Step3: Divide new leading term

Step4: Divide new leading term