Calculus Examples

$y = - 7 x^{2} + 21 x$ , $y = 3 x$

To find the volume of the solid, first define the area of each slice then integrate across the range. The area of each slice is the area of a circle with radius $f (x)$ and $A = π r^{2}$ .

$V = π \int_{0}^{2.\overline{571428}} {(f (x))}^{2} - {(g (x))}^{2} d x$ where $f (x) = - 7 x^{2} + 21 x$ and $g (x) = 3 x$

Simplify the integrand.

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Simplify each term.

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Rewrite ${(- 7 x^{2} + 21 x)}^{2}$ as $(- 7 x^{2} + 21 x) (- 7 x^{2} + 21 x)$ .

$V = (- 7 x^{2} + 21 x) (- 7 x^{2} + 21 x) - {(3 x)}^{2}$

Expand $(- 7 x^{2} + 21 x) (- 7 x^{2} + 21 x)$ using the FOIL Method.

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Apply the distributive property.

$V = - 7 x^{2} (- 7 x^{2} + 21 x) + 21 x (- 7 x^{2} + 21 x) - {(3 x)}^{2}$

Apply the distributive property.

$V = - 7 x^{2} (- 7 x^{2}) - 7 x^{2} (21 x) + 21 x (- 7 x^{2} + 21 x) - {(3 x)}^{2}$

Apply the distributive property.

$V = - 7 x^{2} (- 7 x^{2}) - 7 x^{2} (21 x) + 21 x (- 7 x^{2}) + 21 x (21 x) - {(3 x)}^{2}$

Simplify and combine like terms.

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Simplify each term.

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Rewrite using the commutative property of multiplication.

$V = - 7 \cdot (- 7 (x^{2} x^{2})) - 7 x^{2} (21 x) + 21 x (- 7 x^{2}) + 21 x (21 x) - {(3 x)}^{2}$

Multiply $x^{2}$ by $x^{2}$ by adding the exponents.

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Use the power rule $a^{m} a^{n} = a^{m + n}$ to combine exponents.

$V = - 7 \cdot (- 7 x^{2 + 2}) - 7 x^{2} (21 x) + 21 x (- 7 x^{2}) + 21 x (21 x) - {(3 x)}^{2}$

Add $2$ and $2$ .

$V = - 7 \cdot (- 7 x^{4}) - 7 x^{2} (21 x) + 21 x (- 7 x^{2}) + 21 x (21 x) - {(3 x)}^{2}$

Multiply $- 7$ by $- 7$ .

$V = 49 x^{4} - 7 x^{2} (21 x) + 21 x (- 7 x^{2}) + 21 x (21 x) - {(3 x)}^{2}$

Rewrite using the commutative property of multiplication.

$V = 49 x^{4} - 7 \cdot (21 (x^{2} x)) + 21 x (- 7 x^{2}) + 21 x (21 x) - {(3 x)}^{2}$

Multiply $x^{2}$ by $x$ by adding the exponents.

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Multiply $x^{2}$ by $x$ .

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Raise $x$ to the power of $1$ .

$V = 49 x^{4} - 7 \cdot (21 (x^{2} x)) + 21 x (- 7 x^{2}) + 21 x (21 x) - {(3 x)}^{2}$

Use the power rule $a^{m} a^{n} = a^{m + n}$ to combine exponents.

$V = 49 x^{4} - 7 \cdot (21 x^{2 + 1}) + 21 x (- 7 x^{2}) + 21 x (21 x) - {(3 x)}^{2}$

Add $2$ and $1$ .

$V = 49 x^{4} - 7 \cdot (21 x^{3}) + 21 x (- 7 x^{2}) + 21 x (21 x) - {(3 x)}^{2}$

Multiply $- 7$ by $21$ .

$V = 49 x^{4} - 147 x^{3} + 21 x (- 7 x^{2}) + 21 x (21 x) - {(3 x)}^{2}$

Rewrite using the commutative property of multiplication.

$V = 49 x^{4} - 147 x^{3} + 21 \cdot (- 7 (x \cdot x^{2})) + 21 x (21 x) - {(3 x)}^{2}$

Multiply $x$ by $x^{2}$ by adding the exponents.

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Multiply $x$ by $x^{2}$ .

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Raise $x$ to the power of $1$ .

$V = 49 x^{4} - 147 x^{3} + 21 \cdot (- 7 (x \cdot x^{2})) + 21 x (21 x) - {(3 x)}^{2}$

Use the power rule $a^{m} a^{n} = a^{m + n}$ to combine exponents.

$V = 49 x^{4} - 147 x^{3} + 21 \cdot (- 7 x^{1 + 2}) + 21 x (21 x) - {(3 x)}^{2}$

Add $1$ and $2$ .

$V = 49 x^{4} - 147 x^{3} + 21 \cdot (- 7 x^{3}) + 21 x (21 x) - {(3 x)}^{2}$

Multiply $21$ by $- 7$ .

$V = 49 x^{4} - 147 x^{3} - 147 x^{3} + 21 x (21 x) - {(3 x)}^{2}$

Multiply $x$ by $x$ .

$V = 49 x^{4} - 147 x^{3} - 147 x^{3} + 21 \cdot (21 x^{2}) - {(3 x)}^{2}$

Multiply $21$ by $21$ .

$V = 49 x^{4} - 147 x^{3} - 147 x^{3} + 441 x^{2} - {(3 x)}^{2}$

Subtract $147 x^{3}$ from $- 147 x^{3}$ .

$V = 49 x^{4} - 294 x^{3} + 441 x^{2} - {(3 x)}^{2}$

Apply the product rule to $3 x$ .

$V = 49 x^{4} - 294 x^{3} + 441 x^{2} - (3^{2} x^{2})$

Raise $3$ to the power of $2$ .

$V = 49 x^{4} - 294 x^{3} + 441 x^{2} - (9 x^{2})$

Multiply $9$ by $- 1$ .

$V = 49 x^{4} - 294 x^{3} + 441 x^{2} - 9 x^{2}$

Subtract $9 x^{2}$ from $441 x^{2}$ .

$V = 49 x^{4} - 294 x^{3} + 432 x^{2}$

Split the single integral into multiple integrals.

$V = π (\int_{0}^{2.\overline{571428}} 49 x^{4} d x + \int_{0}^{2.\overline{571428}} - 294 x^{3} d x + \int_{0}^{2.\overline{571428}} 432 x^{2} d x)$

Since $49$ is constant with respect to $x$ , move $49$ out of the integral.

$V = π (49 \int_{0}^{2.\overline{571428}} x^{4} d x + \int_{0}^{2.\overline{571428}} - 294 x^{3} d x + \int_{0}^{2.\overline{571428}} 432 x^{2} d x)$

By the Power Rule, the integral of $x^{4}$ with respect to $x$ is $\frac{1}{5} x^{5}$ .

$V = π (49 (\frac{1}{5} x^{5}]_{0}^{2.\overline{571428}}) + \int_{0}^{2.\overline{571428}} - 294 x^{3} d x + \int_{0}^{2.\overline{571428}} 432 x^{2} d x)$

Combine $\frac{1}{5}$ and $x^{5}$ .

$V = π (49 (\frac{x^{5}}{5}]_{0}^{2.\overline{571428}}) + \int_{0}^{2.\overline{571428}} - 294 x^{3} d x + \int_{0}^{2.\overline{571428}} 432 x^{2} d x)$

Since $- 294$ is constant with respect to $x$ , move $- 294$ out of the integral.

$V = π (49 (\frac{x^{5}}{5}]_{0}^{2.\overline{571428}}) - 294 \int_{0}^{2.\overline{571428}} x^{3} d x + \int_{0}^{2.\overline{571428}} 432 x^{2} d x)$

By the Power Rule, the integral of $x^{3}$ with respect to $x$ is $\frac{1}{4} x^{4}$ .

$V = π (49 (\frac{x^{5}}{5}]_{0}^{2.\overline{571428}}) - 294 (\frac{1}{4} x^{4}]_{0}^{2.\overline{571428}}) + \int_{0}^{2.\overline{571428}} 432 x^{2} d x)$

Combine $\frac{1}{4}$ and $x^{4}$ .

$V = π (49 (\frac{x^{5}}{5}]_{0}^{2.\overline{571428}}) - 294 (\frac{x^{4}}{4}]_{0}^{2.\overline{571428}}) + \int_{0}^{2.\overline{571428}} 432 x^{2} d x)$

Since $432$ is constant with respect to $x$ , move $432$ out of the integral.

$V = π (49 (\frac{x^{5}}{5}]_{0}^{2.\overline{571428}}) - 294 (\frac{x^{4}}{4}]_{0}^{2.\overline{571428}}) + 432 \int_{0}^{2.\overline{571428}} x^{2} d x)$

By the Power Rule, the integral of $x^{2}$ with respect to $x$ is $\frac{1}{3} x^{3}$ .

$V = π (49 (\frac{x^{5}}{5}]_{0}^{2.\overline{571428}}) - 294 (\frac{x^{4}}{4}]_{0}^{2.\overline{571428}}) + 432 (\frac{1}{3} x^{3}]_{0}^{2.\overline{571428}}))$

Simplify the answer.

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Combine $\frac{1}{3}$ and $x^{3}$ .

$V = π (49 (\frac{x^{5}}{5}]_{0}^{2.\overline{571428}}) - 294 (\frac{x^{4}}{4}]_{0}^{2.\overline{571428}}) + 432 (\frac{x^{3}}{3}]_{0}^{2.\overline{571428}}))$

Substitute and simplify.

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Evaluate $\frac{x^{5}}{5}$ at $2.\overline{571428}$ and at $0$ .

$V = π (49 ((\frac{{2.\overline{571428}}^{5}}{5}) - \frac{0^{5}}{5}) - 294 (\frac{x^{4}}{4}]_{0}^{2.\overline{571428}}) + 432 (\frac{x^{3}}{3}]_{0}^{2.\overline{571428}}))$

Evaluate $\frac{x^{4}}{4}$ at $2.\overline{571428}$ and at $0$ .

$V = π (49 (\frac{{2.\overline{571428}}^{5}}{5} - \frac{0^{5}}{5}) - 294 (\frac{{2.\overline{571428}}^{4}}{4} - \frac{0^{4}}{4}) + 432 (\frac{x^{3}}{3}]_{0}^{2.\overline{571428}}))$

Evaluate $\frac{x^{3}}{3}$ at $2.\overline{571428}$ and at $0$ .

$V = π (49 (\frac{{2.\overline{571428}}^{5}}{5} - \frac{0^{5}}{5}) - 294 (\frac{{2.\overline{571428}}^{4}}{4} - \frac{0^{4}}{4}) + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Simplify.

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Raise $2.\overline{571428}$ to the power of $5$ .

$V = π (49 (\frac{112.42744094}{5} - \frac{0^{5}}{5}) - 294 (\frac{{2.\overline{571428}}^{4}}{4} - \frac{0^{4}}{4}) + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Raising $0$ to any positive power yields $0$ .

$V = π (49 (\frac{112.42744094}{5} - \frac{0}{5}) - 294 (\frac{{2.\overline{571428}}^{4}}{4} - \frac{0^{4}}{4}) + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Cancel the common factor of $0$ and $5$ .

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Factor $5$ out of $0$ .

$V = π (49 (\frac{112.42744094}{5} - \frac{5 (0)}{5}) - 294 (\frac{{2.\overline{571428}}^{4}}{4} - \frac{0^{4}}{4}) + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Cancel the common factors.

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Factor $5$ out of $5$ .

$V = π (49 (\frac{112.42744094}{5} - \frac{5 \cdot 0}{5 \cdot 1}) - 294 (\frac{{2.\overline{571428}}^{4}}{4} - \frac{0^{4}}{4}) + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Cancel the common factor.

$V = π (49 (\frac{112.42744094}{5} - \frac{5 \cdot 0}{5 \cdot 1}) - 294 (\frac{{2.\overline{571428}}^{4}}{4} - \frac{0^{4}}{4}) + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Rewrite the expression.

$V = π (49 (\frac{112.42744094}{5} - \frac{0}{1}) - 294 (\frac{{2.\overline{571428}}^{4}}{4} - \frac{0^{4}}{4}) + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Divide $0$ by $1$ .

$V = π (49 (\frac{112.42744094}{5} - 0) - 294 (\frac{{2.\overline{571428}}^{4}}{4} - \frac{0^{4}}{4}) + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Multiply $- 1$ by $0$ .

$V = π (49 (\frac{112.42744094}{5} + 0) - 294 (\frac{{2.\overline{571428}}^{4}}{4} - \frac{0^{4}}{4}) + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Add $\frac{112.42744094}{5}$ and $0$ .

$V = π (49 (\frac{112.42744094}{5}) - 294 (\frac{{2.\overline{571428}}^{4}}{4} - \frac{0^{4}}{4}) + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Combine $49$ and $\frac{112.42744094}{5}$ .

$V = π (\frac{49 \cdot 112.42744094}{5} - 294 (\frac{{2.\overline{571428}}^{4}}{4} - \frac{0^{4}}{4}) + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Multiply $49$ by $112.42744094$ .

$V = π (\frac{5508.94460641}{5} - 294 (\frac{{2.\overline{571428}}^{4}}{4} - \frac{0^{4}}{4}) + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Raise $2.\overline{571428}$ to the power of $4$ .

$V = π (\frac{5508.94460641}{5} - 294 (\frac{43.72178259}{4} - \frac{0^{4}}{4}) + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Raising $0$ to any positive power yields $0$ .

$V = π (\frac{5508.94460641}{5} - 294 (\frac{43.72178259}{4} - \frac{0}{4}) + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Cancel the common factor of $0$ and $4$ .

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Factor $4$ out of $0$ .

$V = π (\frac{5508.94460641}{5} - 294 (\frac{43.72178259}{4} - \frac{4 (0)}{4}) + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Cancel the common factors.

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Factor $4$ out of $4$ .

$V = π (\frac{5508.94460641}{5} - 294 (\frac{43.72178259}{4} - \frac{4 \cdot 0}{4 \cdot 1}) + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Cancel the common factor.

$V = π (\frac{5508.94460641}{5} - 294 (\frac{43.72178259}{4} - \frac{4 \cdot 0}{4 \cdot 1}) + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Rewrite the expression.

$V = π (\frac{5508.94460641}{5} - 294 (\frac{43.72178259}{4} - \frac{0}{1}) + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Divide $0$ by $1$ .

$V = π (\frac{5508.94460641}{5} - 294 (\frac{43.72178259}{4} - 0) + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Multiply $- 1$ by $0$ .

$V = π (\frac{5508.94460641}{5} - 294 (\frac{43.72178259}{4} + 0) + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Add $\frac{43.72178259}{4}$ and $0$ .

$V = π (\frac{5508.94460641}{5} - 294 (\frac{43.72178259}{4}) + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Combine $- 294$ and $\frac{43.72178259}{4}$ .

$V = π (\frac{5508.94460641}{5} + \frac{- 294 \cdot 43.72178259}{4} + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Multiply $- 294$ by $43.72178259$ .

$V = π (\frac{5508.94460641}{5} + \frac{- 12854.20408163}{4} + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Move the negative in front of the fraction.

$V = π (\frac{5508.94460641}{5} - \frac{12854.20408163}{4} + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

To write $\frac{5508.94460641}{5}$ as a fraction with a common denominator, multiply by $\frac{4}{4}$ .

$V = π (\frac{5508.94460641}{5} \cdot \frac{4}{4} - \frac{12854.20408163}{4} + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

To write $- \frac{12854.20408163}{4}$ as a fraction with a common denominator, multiply by $\frac{5}{5}$ .

$V = π (\frac{5508.94460641}{5} \cdot \frac{4}{4} - \frac{12854.20408163}{4} \cdot \frac{5}{5} + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Write each expression with a common denominator of $20$ , by multiplying each by an appropriate factor of $1$ .

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Multiply $\frac{5508.94460641}{5}$ and $\frac{4}{4}$ .

$V = π (\frac{5508.94460641 \cdot 4}{5 \cdot 4} - \frac{12854.20408163}{4} \cdot \frac{5}{5} + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Multiply $5$ by $4$ .

$V = π (\frac{5508.94460641 \cdot 4}{20} - \frac{12854.20408163}{4} \cdot \frac{5}{5} + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Multiply $\frac{12854.20408163}{4}$ and $\frac{5}{5}$ .

$V = π (\frac{5508.94460641 \cdot 4}{20} - \frac{12854.20408163 \cdot 5}{4 \cdot 5} + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Multiply $4$ by $5$ .

$V = π (\frac{5508.94460641 \cdot 4}{20} - \frac{12854.20408163 \cdot 5}{20} + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Combine the numerators over the common denominator.

$V = π (\frac{5508.94460641 \cdot 4 - 12854.20408163 \cdot 5}{20} + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Multiply $5508.94460641$ by $4$ .

$V = π (\frac{22035.77842565 - 12854.20408163 \cdot 5}{20} + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Multiply $- 12854.20408163$ by $5$ .

$V = π (\frac{22035.77842565 - 64271.02040816}{20} + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Subtract $64271.02040816$ from $22035.77842565$ .

$V = π (\frac{- 42235.2419825}{20} + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Move the negative in front of the fraction.

$V = π (- \frac{42235.2419825}{20} + 432 ((\frac{{2.\overline{571428}}^{3}}{3}) - \frac{0^{3}}{3}))$

Raise $2.\overline{571428}$ to the power of $3$ .

$V = π (- \frac{42235.2419825}{20} + 432 (\frac{17.00291545}{3} - \frac{0^{3}}{3}))$

Raising $0$ to any positive power yields $0$ .

$V = π (- \frac{42235.2419825}{20} + 432 (\frac{17.00291545}{3} - \frac{0}{3}))$

Cancel the common factor of $0$ and $3$ .

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Factor $3$ out of $0$ .

$V = π (- \frac{42235.2419825}{20} + 432 (\frac{17.00291545}{3} - \frac{3 (0)}{3}))$

Cancel the common factors.

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Factor $3$ out of $3$ .

$V = π (- \frac{42235.2419825}{20} + 432 (\frac{17.00291545}{3} - \frac{3 \cdot 0}{3 \cdot 1}))$

Cancel the common factor.

$V = π (- \frac{42235.2419825}{20} + 432 (\frac{17.00291545}{3} - \frac{3 \cdot 0}{3 \cdot 1}))$

Rewrite the expression.

$V = π (- \frac{42235.2419825}{20} + 432 (\frac{17.00291545}{3} - \frac{0}{1}))$

Divide $0$ by $1$ .

$V = π (- \frac{42235.2419825}{20} + 432 (\frac{17.00291545}{3} - 0))$

Multiply $- 1$ by $0$ .

$V = π (- \frac{42235.2419825}{20} + 432 (\frac{17.00291545}{3} + 0))$

Add $\frac{17.00291545}{3}$ and $0$ .

$V = π (- \frac{42235.2419825}{20} + 432 (\frac{17.00291545}{3}))$

Combine $432$ and $\frac{17.00291545}{3}$ .

$V = π (- \frac{42235.2419825}{20} + \frac{432 \cdot 17.00291545}{3})$

Multiply $432$ by $17.00291545$ .

$V = π (- \frac{42235.2419825}{20} + \frac{7345.25947521}{3})$

To write $- \frac{42235.2419825}{20}$ as a fraction with a common denominator, multiply by $\frac{3}{3}$ .

$V = π (- \frac{42235.2419825}{20} \cdot \frac{3}{3} + \frac{7345.25947521}{3})$

To write $\frac{7345.25947521}{3}$ as a fraction with a common denominator, multiply by $\frac{20}{20}$ .

$V = π (- \frac{42235.2419825}{20} \cdot \frac{3}{3} + \frac{7345.25947521}{3} \cdot \frac{20}{20})$

Write each expression with a common denominator of $60$ , by multiplying each by an appropriate factor of $1$ .

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Multiply $\frac{42235.2419825}{20}$ and $\frac{3}{3}$ .

$V = π (- \frac{42235.2419825 \cdot 3}{20 \cdot 3} + \frac{7345.25947521}{3} \cdot \frac{20}{20})$

Multiply $20$ by $3$ .

$V = π (- \frac{42235.2419825 \cdot 3}{60} + \frac{7345.25947521}{3} \cdot \frac{20}{20})$

Multiply $\frac{7345.25947521}{3}$ and $\frac{20}{20}$ .

$V = π (- \frac{42235.2419825 \cdot 3}{60} + \frac{7345.25947521 \cdot 20}{3 \cdot 20})$

Multiply $3$ by $20$ .

$V = π (- \frac{42235.2419825 \cdot 3}{60} + \frac{7345.25947521 \cdot 20}{60})$

Combine the numerators over the common denominator.

$V = π (\frac{- 42235.2419825 \cdot 3 + 7345.25947521 \cdot 20}{60})$

Multiply $- 42235.2419825$ by $3$ .

$V = π (\frac{- 126705.72594752 + 7345.25947521 \cdot 20}{60})$

Multiply $7345.25947521$ by $20$ .

$V = π (\frac{- 126705.72594752 + 146905.18950437}{60})$

Add $- 126705.72594752$ and $146905.18950437$ .

$V = π (\frac{20199.46355685}{60})$

Combine $π$ and $\frac{20199.46355685}{60}$ .

$V = \frac{π \cdot 20199.46355685}{60}$

Multiply $π$ by $20199.46355685$ .

$V = \frac{63458.48631665}{60}$

Divide $63458.48631665$ by $60$ .

$V = 1057.64143861$

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