Calculus Examples

$y = x + \sin (x)$ , $0 \leq x \leq 2 π$

Step 1

Find the critical points.

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Step 1.1

Find the first derivative.

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Step 1.1.1

Find the first derivative.

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Step 1.1.1.1

Differentiate.

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Step 1.1.1.1.1

By the Sum Rule, the derivative of $x + \sin (x)$ with respect to $x$ is $\frac{d}{d x} [x] + \frac{d}{d x} [\sin (x)]$ .

$\frac{d}{d x} [x] + \frac{d}{d x} [\sin (x)]$

Step 1.1.1.1.2

Differentiate using the Power Rule which states that $\frac{d}{d x} [x^{n}]$ is $n x^{n - 1}$ where $n = 1$ .

$1 + \frac{d}{d x} [\sin (x)]$

Step 1.1.1.2

The derivative of $\sin (x)$ with respect to $x$ is $\cos (x)$ .

$f' (x) = 1 + \cos (x)$

Step 1.1.2

The first derivative of $f (x)$ with respect to $x$ is $1 + \cos (x)$ .

$1 + \cos (x)$

Step 1.2

Set the first derivative equal to $0$ then solve the equation $1 + \cos (x) = 0$ .

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Step 1.2.1

Set the first derivative equal to $0$ .

$1 + \cos (x) = 0$

Step 1.2.2

Subtract $1$ from both sides of the equation.

$\cos (x) = - 1$

Step 1.2.3

Take the inverse cosine of both sides of the equation to extract $x$ from inside the cosine.

$x = \arccos (- 1)$

Step 1.2.4

Simplify the right side.

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Step 1.2.4.1

The exact value of $\arccos (- 1)$ is $π$ .

$x = π$

Step 1.2.5

The cosine function is negative in the second and third quadrants. To find the second solution, subtract the reference angle from $2 π$ to find the solution in the third quadrant.

$x = 2 π - π$

Step 1.2.6

Subtract $π$ from $2 π$ .

$x = π$

Step 1.2.7

Find the period of $\cos (x)$ .

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Step 1.2.7.1

The period of the function can be calculated using $\frac{2 π}{| b |}$ .

$\frac{2 π}{| b |}$

Step 1.2.7.2

Replace $b$ with $1$ in the formula for period.

$\frac{2 π}{| 1 |}$

Step 1.2.7.3

The absolute value is the distance between a number and zero. The distance between $0$ and $1$ is $1$ .

$\frac{2 π}{1}$

Step 1.2.7.4

Divide $2 π$ by $1$ .

$2 π$

Step 1.2.8

The period of the $\cos (x)$ function is $2 π$ so values will repeat every $2 π$ radians in both directions.

$x = π + 2 π n$ , for any integer $n$

Step 1.3

Find the values where the derivative is undefined.

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Step 1.3.1

The domain of the expression is all real numbers except where the expression is undefined. In this case, there is no real number that makes the expression undefined.

Step 1.4

Evaluate $x + \sin (x)$ at each $x$ value where the derivative is $0$ or undefined.

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Step 1.4.1

Evaluate at $x = π$ .

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Step 1.4.1.1

Substitute $π$ for $x$ .

$(π) + \sin (π)$

Step 1.4.1.2

Simplify.

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Step 1.4.1.2.1

Simplify each term.

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Step 1.4.1.2.1.1

Apply the reference angle by finding the angle with equivalent trig values in the first quadrant.

$π + \sin (0)$

Step 1.4.1.2.1.2

The exact value of $\sin (0)$ is $0$ .

$π + 0$

Step 1.4.1.2.2

Add $π$ and $0$ .

$π$

Step 1.4.2

Evaluate at $x = 3 π$ .

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Step 1.4.2.1

Substitute $3 π$ for $x$ .

$(3 π) + \sin (3 π)$

Step 1.4.2.2

Simplify.

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Step 1.4.2.2.1

Simplify each term.

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Step 1.4.2.2.1.1

Subtract full rotations of $2 π$ until the angle is greater than or equal to $0$ and less than $2 π$ .

$3 π + \sin (π)$

Step 1.4.2.2.1.2

Apply the reference angle by finding the angle with equivalent trig values in the first quadrant.

$3 π + \sin (0)$

Step 1.4.2.2.1.3

The exact value of $\sin (0)$ is $0$ .

$3 π + 0$

Step 1.4.2.2.2

Add $3 π$ and $0$ .

$3 π$

Step 1.4.3

Evaluate at $x = 5 π$ .

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Step 1.4.3.1

Substitute $5 π$ for $x$ .

$(5 π) + \sin (5 π)$

Step 1.4.3.2

Simplify.

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Step 1.4.3.2.1

Simplify each term.

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Step 1.4.3.2.1.1

Subtract full rotations of $2 π$ until the angle is greater than or equal to $0$ and less than $2 π$ .

$5 π + \sin (π)$

Step 1.4.3.2.1.2

Apply the reference angle by finding the angle with equivalent trig values in the first quadrant.

$5 π + \sin (0)$

Step 1.4.3.2.1.3

The exact value of $\sin (0)$ is $0$ .

$5 π + 0$

Step 1.4.3.2.2

Add $5 π$ and $0$ .

$5 π$

Step 1.4.4

Evaluate at $x = 7 π$ .

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Step 1.4.4.1

Substitute $7 π$ for $x$ .

$(7 π) + \sin (7 π)$

Step 1.4.4.2

Simplify.

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Step 1.4.4.2.1

Simplify each term.

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Step 1.4.4.2.1.1

Subtract full rotations of $2 π$ until the angle is greater than or equal to $0$ and less than $2 π$ .

$7 π + \sin (π)$

Step 1.4.4.2.1.2

Apply the reference angle by finding the angle with equivalent trig values in the first quadrant.

$7 π + \sin (0)$

Step 1.4.4.2.1.3

The exact value of $\sin (0)$ is $0$ .

$7 π + 0$

Step 1.4.4.2.2

Add $7 π$ and $0$ .

$7 π$

Step 1.4.5

Evaluate at $x = 9 π$ .

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Step 1.4.5.1

Substitute $9 π$ for $x$ .

$(9 π) + \sin (9 π)$

Step 1.4.5.2

Simplify.

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Step 1.4.5.2.1

Simplify each term.

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Step 1.4.5.2.1.1

Subtract full rotations of $2 π$ until the angle is greater than or equal to $0$ and less than $2 π$ .

$9 π + \sin (π)$

Step 1.4.5.2.1.2

Apply the reference angle by finding the angle with equivalent trig values in the first quadrant.

$9 π + \sin (0)$

Step 1.4.5.2.1.3

The exact value of $\sin (0)$ is $0$ .

$9 π + 0$

Step 1.4.5.2.2

Add $9 π$ and $0$ .

$9 π$

Step 1.4.6

List all of the points.

$(π, π), (3 π, 3 π), (5 π, 5 π), (7 π, 7 π), (9 π, 9 π)$

Step 2

Exclude the points that are not on the interval.

$(π, π)$

Step 3

Evaluate at the included endpoints.

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Step 3.1

Evaluate at $x = 0$ .

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Step 3.1.1

Substitute $0$ for $x$ .

$(0) + \sin (0)$

Step 3.1.2

Simplify.

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Step 3.1.2.1

The exact value of $\sin (0)$ is $0$ .

$0 + 0$

Step 3.1.2.2

Add $0$ and $0$ .

$0$

Step 3.2

Evaluate at $x = 2 π$ .

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Step 3.2.1

Substitute $2 π$ for $x$ .

$(2 π) + \sin (2 π)$

Step 3.2.2

Simplify.

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Step 3.2.2.1

Simplify each term.

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Step 3.2.2.1.1

Subtract full rotations of $2 π$ until the angle is greater than or equal to $0$ and less than $2 π$ .

$2 π + \sin (0)$

Step 3.2.2.1.2

The exact value of $\sin (0)$ is $0$ .

$2 π + 0$

Step 3.2.2.2

Add $2 π$ and $0$ .

$2 π$

Step 3.3

List all of the points.

$(0, 0), (2 π, 2 π)$

Step 4

Compare the $f (x)$ values found for each value of $x$ in order to determine the absolute maximum and minimum over the given interval. The maximum will occur at the highest $f (x)$ value and the minimum will occur at the lowest $f (x)$ value.

Absolute Maximum: $(2 π, 2 π)$

Absolute Minimum: $(0, 0)$

Step 5