Calculus Examples

$\int \frac{x^{2}}{1 - x} d x$

Step 1

Reorder $1$ and $- x$ .

$\int \frac{x^{2}}{- x + 1} d x$

Step 2

Divide $x^{2}$ by $- x + 1$ .

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Step 2.1

Set up the polynomials to be divided. If there is not a term for every exponent, insert one with a value of $0$ .

$x$

$1$

$x^{2}$

$0 x$

$0$

Step 2.2

Divide the highest order term in the dividend $x^{2}$ by the highest order term in divisor $- x$ .

				-	$x$
-	$x$	+	$1$		$x^{2}$	+	$0 x$	+	$0$

Step 2.3

Multiply the new quotient term by the divisor.

				-	$x$
-	$x$	+	$1$		$x^{2}$	+	$0 x$	+	$0$
				+	$x^{2}$	-	$x$

Step 2.4

The expression needs to be subtracted from the dividend, so change all the signs in $x^{2} - x$

				-	$x$
-	$x$	+	$1$		$x^{2}$	+	$0 x$	+	$0$
				-	$x^{2}$	+	$x$

Step 2.5

After changing the signs, add the last dividend from the multiplied polynomial to find the new dividend.

				-	$x$
-	$x$	+	$1$		$x^{2}$	+	$0 x$	+	$0$
				-	$x^{2}$	+	$x$
						+	$x$

Step 2.6

Pull the next terms from the original dividend down into the current dividend.

				-	$x$
-	$x$	+	$1$		$x^{2}$	+	$0 x$	+	$0$
				-	$x^{2}$	+	$x$
						+	$x$	+	$0$

Step 2.7

Divide the highest order term in the dividend $x$ by the highest order term in divisor $- x$ .

				-	$x$	-	$1$
-	$x$	+	$1$		$x^{2}$	+	$0 x$	+	$0$
				-	$x^{2}$	+	$x$
						+	$x$	+	$0$

Step 2.8

Multiply the new quotient term by the divisor.

				-	$x$	-	$1$
-	$x$	+	$1$		$x^{2}$	+	$0 x$	+	$0$
				-	$x^{2}$	+	$x$
						+	$x$	+	$0$
						+	$x$	-	$1$

Step 2.9

The expression needs to be subtracted from the dividend, so change all the signs in $x - 1$

				-	$x$	-	$1$
-	$x$	+	$1$		$x^{2}$	+	$0 x$	+	$0$
				-	$x^{2}$	+	$x$
						+	$x$	+	$0$
						-	$x$	+	$1$

Step 2.10

After changing the signs, add the last dividend from the multiplied polynomial to find the new dividend.

				-	$x$	-	$1$
-	$x$	+	$1$		$x^{2}$	+	$0 x$	+	$0$
				-	$x^{2}$	+	$x$
						+	$x$	+	$0$
						-	$x$	+	$1$
								+	$1$

Step 2.11

The final answer is the quotient plus the remainder over the divisor.

$\int - x - 1 + \frac{1}{- x + 1} d x$

Step 3

Split the single integral into multiple integrals.

$\int - x d x + \int - 1 d x + \int \frac{1}{- x + 1} d x$

Step 4

Since $- 1$ is constant with respect to $x$ , move $- 1$ out of the integral.

$- \int x d x + \int - 1 d x + \int \frac{1}{- x + 1} d x$

Step 5

By the Power Rule, the integral of $x$ with respect to $x$ is $\frac{1}{2} x^{2}$ .

$- (\frac{1}{2} x^{2} + C) + \int - 1 d x + \int \frac{1}{- x + 1} d x$

Step 6

Apply the constant rule.

$- (\frac{1}{2} x^{2} + C) - x + C + \int \frac{1}{- x + 1} d x$

Step 7

Combine $\frac{1}{2}$ and $x^{2}$ .

$- (\frac{x^{2}}{2} + C) - x + C + \int \frac{1}{- x + 1} d x$

Step 8

Let $u = - x + 1$ . Then $d u = - d x$ , so $- d u = d x$ . Rewrite using $u$ and $d$ $u$ .

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Step 8.1

Let $u = - x + 1$ . Find $\frac{d u}{d x}$ .

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Step 8.1.1

Rewrite.

$\frac{- 1}{1}$

Step 8.1.2

Divide $- 1$ by $1$ .

$- 1$

Step 8.2

Rewrite the problem using $u$ and $d u$ .

$- (\frac{x^{2}}{2} + C) - x + C + \int \frac{- 1}{u} d u$

Step 9

Move the negative in front of the fraction.

$- (\frac{x^{2}}{2} + C) - x + C + \int - \frac{1}{u} d u$

Step 10

Since $- 1$ is constant with respect to $u$ , move $- 1$ out of the integral.

$- (\frac{x^{2}}{2} + C) - x + C - \int \frac{1}{u} d u$

Step 11

The integral of $\frac{1}{u}$ with respect to $u$ is $\ln (| u |)$ .

$- (\frac{x^{2}}{2} + C) - x + C - (\ln (| u |) + C)$

Step 12

Simplify.

$- \frac{1}{2} x^{2} - x - \ln (| u |) + C$

Step 13

Replace all occurrences of $u$ with $- x + 1$ .

$- \frac{1}{2} x^{2} - x - \ln (| - x + 1 |) + C$