Trigonometry Examples

sin (7 x)

$\sin (7 x)$

Step 1

A good method to expand

$\sin (7 x)$ is by using De Moivre's theorem

$(r {(\cos (x) + i \cdot \sin (x))}^{n} = r^{n} (\cos (n x) + i \cdot \sin (n x)))$ . When

$r = 1$ ,

$\cos (n x) + i \cdot \sin (n x) = {(\cos (x) + i \cdot \sin (x))}^{n}$ .

$\cos (n x) + i \cdot \sin (n x) = {(\cos (x) + i \cdot \sin (x))}^{n}$

Step 2

Expand the right hand side of

$\cos (n x) + i \cdot \sin (n x) = {(\cos (x) + i \cdot \sin (x))}^{n}$ using the binomial theorem.

Expand:

${(\cos (x) + i \cdot \sin (x))}^{7}$

Step 3

Use the Binomial Theorem.

$\cos^{7} (x) + 7 \cos^{6} (x) (i \sin (x)) + 21 \cos^{5} (x) {(i \sin (x))}^{2} + 35 \cos^{4} (x) {(i \sin (x))}^{3} + 35 \cos^{3} (x) {(i \sin (x))}^{4} + 21 \cos^{2} (x) {(i \sin (x))}^{5} + 7 \cos (x) {(i \sin (x))}^{6} + {(i \sin (x))}^{7}$

Step 4

Simplify terms.

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Step 4.1

Simplify each term.

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Step 4.1.1

Apply the product rule to

$i \sin (x)$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) + 21 \cos^{5} (x) (i^{2} \sin^{2} (x)) + 35 \cos^{4} (x) {(i \sin (x))}^{3} + 35 \cos^{3} (x) {(i \sin (x))}^{4} + 21 \cos^{2} (x) {(i \sin (x))}^{5} + 7 \cos (x) {(i \sin (x))}^{6} + {(i \sin (x))}^{7}$

Step 4.1.2

Rewrite using the commutative property of multiplication.

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) + 21 \cdot i^{2} \cos^{5} (x) \sin^{2} (x) + 35 \cos^{4} (x) {(i \sin (x))}^{3} + 35 \cos^{3} (x) {(i \sin (x))}^{4} + 21 \cos^{2} (x) {(i \sin (x))}^{5} + 7 \cos (x) {(i \sin (x))}^{6} + {(i \sin (x))}^{7}$

Step 4.1.3

Rewrite

$i^{2}$ as

$- 1$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) + 21 \cdot - 1 \cos^{5} (x) \sin^{2} (x) + 35 \cos^{4} (x) {(i \sin (x))}^{3} + 35 \cos^{3} (x) {(i \sin (x))}^{4} + 21 \cos^{2} (x) {(i \sin (x))}^{5} + 7 \cos (x) {(i \sin (x))}^{6} + {(i \sin (x))}^{7}$

Step 4.1.4

Multiply

$21$ by

$- 1$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) + 35 \cos^{4} (x) {(i \sin (x))}^{3} + 35 \cos^{3} (x) {(i \sin (x))}^{4} + 21 \cos^{2} (x) {(i \sin (x))}^{5} + 7 \cos (x) {(i \sin (x))}^{6} + {(i \sin (x))}^{7}$

Step 4.1.5

Apply the product rule to

$i \sin (x)$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) + 35 \cos^{4} (x) (i^{3} \sin^{3} (x)) + 35 \cos^{3} (x) {(i \sin (x))}^{4} + 21 \cos^{2} (x) {(i \sin (x))}^{5} + 7 \cos (x) {(i \sin (x))}^{6} + {(i \sin (x))}^{7}$

Step 4.1.6

Rewrite using the commutative property of multiplication.

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) + 35 \cdot i^{3} \cos^{4} (x) \sin^{3} (x) + 35 \cos^{3} (x) {(i \sin (x))}^{4} + 21 \cos^{2} (x) {(i \sin (x))}^{5} + 7 \cos (x) {(i \sin (x))}^{6} + {(i \sin (x))}^{7}$

Step 4.1.7

Factor out

$i^{2}$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) + 35 \cdot (i^{2} \cdot i) \cos^{4} (x) \sin^{3} (x) + 35 \cos^{3} (x) {(i \sin (x))}^{4} + 21 \cos^{2} (x) {(i \sin (x))}^{5} + 7 \cos (x) {(i \sin (x))}^{6} + {(i \sin (x))}^{7}$

Step 4.1.8

Rewrite

$i^{2}$ as

$- 1$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) + 35 \cdot (- 1 \cdot i) \cos^{4} (x) \sin^{3} (x) + 35 \cos^{3} (x) {(i \sin (x))}^{4} + 21 \cos^{2} (x) {(i \sin (x))}^{5} + 7 \cos (x) {(i \sin (x))}^{6} + {(i \sin (x))}^{7}$

Step 4.1.9

Rewrite

$- 1 i$ as

$- i$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) + 35 \cdot (- i) \cos^{4} (x) \sin^{3} (x) + 35 \cos^{3} (x) {(i \sin (x))}^{4} + 21 \cos^{2} (x) {(i \sin (x))}^{5} + 7 \cos (x) {(i \sin (x))}^{6} + {(i \sin (x))}^{7}$

Step 4.1.10

Multiply

$- 1$ by

$35$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) - 35 i \cos^{4} (x) \sin^{3} (x) + 35 \cos^{3} (x) {(i \sin (x))}^{4} + 21 \cos^{2} (x) {(i \sin (x))}^{5} + 7 \cos (x) {(i \sin (x))}^{6} + {(i \sin (x))}^{7}$

Step 4.1.11

Apply the product rule to

$i \sin (x)$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) - 35 i \cos^{4} (x) \sin^{3} (x) + 35 \cos^{3} (x) (i^{4} \sin^{4} (x)) + 21 \cos^{2} (x) {(i \sin (x))}^{5} + 7 \cos (x) {(i \sin (x))}^{6} + {(i \sin (x))}^{7}$

Step 4.1.12

Rewrite using the commutative property of multiplication.

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) - 35 i \cos^{4} (x) \sin^{3} (x) + 35 \cdot i^{4} \cos^{3} (x) \sin^{4} (x) + 21 \cos^{2} (x) {(i \sin (x))}^{5} + 7 \cos (x) {(i \sin (x))}^{6} + {(i \sin (x))}^{7}$

Step 4.1.13

Rewrite

$i^{4}$ as

$1$ .

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Step 4.1.13.1

Rewrite

$i^{4}$ as

${(i^{2})}^{2}$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) - 35 i \cos^{4} (x) \sin^{3} (x) + 35 \cdot {(i^{2})}^{2} \cos^{3} (x) \sin^{4} (x) + 21 \cos^{2} (x) {(i \sin (x))}^{5} + 7 \cos (x) {(i \sin (x))}^{6} + {(i \sin (x))}^{7}$

Step 4.1.13.2

Rewrite

$i^{2}$ as

$- 1$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) - 35 i \cos^{4} (x) \sin^{3} (x) + 35 \cdot {(- 1)}^{2} \cos^{3} (x) \sin^{4} (x) + 21 \cos^{2} (x) {(i \sin (x))}^{5} + 7 \cos (x) {(i \sin (x))}^{6} + {(i \sin (x))}^{7}$

Step 4.1.13.3

Raise

$- 1$ to the power of

$2$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) - 35 i \cos^{4} (x) \sin^{3} (x) + 35 \cdot 1 \cos^{3} (x) \sin^{4} (x) + 21 \cos^{2} (x) {(i \sin (x))}^{5} + 7 \cos (x) {(i \sin (x))}^{6} + {(i \sin (x))}^{7}$

Step 4.1.14

Multiply

$35$ by

$1$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) - 35 i \cos^{4} (x) \sin^{3} (x) + 35 \cos^{3} (x) \sin^{4} (x) + 21 \cos^{2} (x) {(i \sin (x))}^{5} + 7 \cos (x) {(i \sin (x))}^{6} + {(i \sin (x))}^{7}$

Step 4.1.15

Apply the product rule to

$i \sin (x)$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) - 35 i \cos^{4} (x) \sin^{3} (x) + 35 \cos^{3} (x) \sin^{4} (x) + 21 \cos^{2} (x) (i^{5} \sin^{5} (x)) + 7 \cos (x) {(i \sin (x))}^{6} + {(i \sin (x))}^{7}$

Step 4.1.16

Rewrite using the commutative property of multiplication.

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) - 35 i \cos^{4} (x) \sin^{3} (x) + 35 \cos^{3} (x) \sin^{4} (x) + 21 \cdot i^{5} \cos^{2} (x) \sin^{5} (x) + 7 \cos (x) {(i \sin (x))}^{6} + {(i \sin (x))}^{7}$

Step 4.1.17

Factor out

$i^{4}$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) - 35 i \cos^{4} (x) \sin^{3} (x) + 35 \cos^{3} (x) \sin^{4} (x) + 21 \cdot (i^{4} i) \cos^{2} (x) \sin^{5} (x) + 7 \cos (x) {(i \sin (x))}^{6} + {(i \sin (x))}^{7}$

Step 4.1.18

Rewrite

$i^{4}$ as

$1$ .

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Step 4.1.18.1

Rewrite

$i^{4}$ as

${(i^{2})}^{2}$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) - 35 i \cos^{4} (x) \sin^{3} (x) + 35 \cos^{3} (x) \sin^{4} (x) + 21 \cdot ({(i^{2})}^{2} i) \cos^{2} (x) \sin^{5} (x) + 7 \cos (x) {(i \sin (x))}^{6} + {(i \sin (x))}^{7}$

Step 4.1.18.2

Rewrite

$i^{2}$ as

$- 1$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) - 35 i \cos^{4} (x) \sin^{3} (x) + 35 \cos^{3} (x) \sin^{4} (x) + 21 \cdot ({(- 1)}^{2} i) \cos^{2} (x) \sin^{5} (x) + 7 \cos (x) {(i \sin (x))}^{6} + {(i \sin (x))}^{7}$

Step 4.1.18.3

Raise

$- 1$ to the power of

$2$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) - 35 i \cos^{4} (x) \sin^{3} (x) + 35 \cos^{3} (x) \sin^{4} (x) + 21 \cdot (1 i) \cos^{2} (x) \sin^{5} (x) + 7 \cos (x) {(i \sin (x))}^{6} + {(i \sin (x))}^{7}$

Step 4.1.19

Multiply

$i$ by

$1$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) - 35 i \cos^{4} (x) \sin^{3} (x) + 35 \cos^{3} (x) \sin^{4} (x) + 21 \cdot i \cos^{2} (x) \sin^{5} (x) + 7 \cos (x) {(i \sin (x))}^{6} + {(i \sin (x))}^{7}$

Step 4.1.20

Apply the product rule to

$i \sin (x)$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) - 35 i \cos^{4} (x) \sin^{3} (x) + 35 \cos^{3} (x) \sin^{4} (x) + 21 i \cos^{2} (x) \sin^{5} (x) + 7 \cos (x) (i^{6} \sin^{6} (x)) + {(i \sin (x))}^{7}$

Step 4.1.21

Factor out

$i^{4}$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) - 35 i \cos^{4} (x) \sin^{3} (x) + 35 \cos^{3} (x) \sin^{4} (x) + 21 i \cos^{2} (x) \sin^{5} (x) + 7 \cos (x) (i^{4} i^{2} \sin^{6} (x)) + {(i \sin (x))}^{7}$

Step 4.1.22

Rewrite

$i^{4}$ as

$1$ .

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Step 4.1.22.1

Rewrite

$i^{4}$ as

${(i^{2})}^{2}$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) - 35 i \cos^{4} (x) \sin^{3} (x) + 35 \cos^{3} (x) \sin^{4} (x) + 21 i \cos^{2} (x) \sin^{5} (x) + 7 \cos (x) ({(i^{2})}^{2} i^{2} \sin^{6} (x)) + {(i \sin (x))}^{7}$

Step 4.1.22.2

Rewrite

$i^{2}$ as

$- 1$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) - 35 i \cos^{4} (x) \sin^{3} (x) + 35 \cos^{3} (x) \sin^{4} (x) + 21 i \cos^{2} (x) \sin^{5} (x) + 7 \cos (x) ({(- 1)}^{2} i^{2} \sin^{6} (x)) + {(i \sin (x))}^{7}$

Step 4.1.22.3

Raise

$- 1$ to the power of

$2$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) - 35 i \cos^{4} (x) \sin^{3} (x) + 35 \cos^{3} (x) \sin^{4} (x) + 21 i \cos^{2} (x) \sin^{5} (x) + 7 \cos (x) (1 i^{2} \sin^{6} (x)) + {(i \sin (x))}^{7}$

Step 4.1.23

Multiply

$i^{2}$ by

$1$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) - 35 i \cos^{4} (x) \sin^{3} (x) + 35 \cos^{3} (x) \sin^{4} (x) + 21 i \cos^{2} (x) \sin^{5} (x) + 7 \cos (x) (i^{2} \sin^{6} (x)) + {(i \sin (x))}^{7}$

Step 4.1.24

Rewrite

$i^{2}$ as

$- 1$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) - 35 i \cos^{4} (x) \sin^{3} (x) + 35 \cos^{3} (x) \sin^{4} (x) + 21 i \cos^{2} (x) \sin^{5} (x) + 7 \cos (x) (- 1 \sin^{6} (x)) + {(i \sin (x))}^{7}$

Step 4.1.25

Rewrite

$- 1 \sin^{6} (x)$ as

$- \sin^{6} (x)$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) - 35 i \cos^{4} (x) \sin^{3} (x) + 35 \cos^{3} (x) \sin^{4} (x) + 21 i \cos^{2} (x) \sin^{5} (x) + 7 \cos (x) (- \sin^{6} (x)) + {(i \sin (x))}^{7}$

Step 4.1.26

Multiply

$- 1$ by

$7$ .

$\cos^{7} (x) + 7 \cos^{6} (x) i \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) - 35 i \cos^{4} (x) \sin^{3} (x) + 35 \cos^{3} (x) \sin^{4} (x) + 21 i \cos^{2} (x) \sin^{5} (x) - 7 \cos (x) \sin^{6} (x) + {(i \sin (x))}^{7}$

Step 4.1.27

Apply the product rule to

$i \sin (x)$ .

Step 4.1.28

Rewrite

$i^{7}$ as

$i^{4} (i^{2} \cdot i)$ .

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Step 4.1.28.1

Factor out

$i^{4}$ .

Step 4.1.28.2

Factor out

$i^{2}$ .

Step 4.1.29

Rewrite

$i^{4}$ as

$1$ .

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Step 4.1.29.1

Rewrite

$i^{4}$ as

${(i^{2})}^{2}$ .

Step 4.1.29.2

Rewrite

$i^{2}$ as

$- 1$ .

Step 4.1.29.3

Raise

$- 1$ to the power of

$2$ .

Step 4.1.30

Multiply

$i^{2} \cdot i$ by

$1$ .

Step 4.1.31

Rewrite

$i^{2}$ as

$- 1$ .

Step 4.1.32

Rewrite

$- 1 i$ as

$- i$ .

Step 4.2

Reorder factors in

$\cos^{7} (x) + 7 i \cos^{6} (x) \sin (x) - 21 \cos^{5} (x) \sin^{2} (x) - 35 i \cos^{4} (x) \sin^{3} (x) + 35 \cos^{3} (x) \sin^{4} (x) + 21 i \cos^{2} (x) \sin^{5} (x) - 7 \cos (x) \sin^{6} (x) - i \sin^{7} (x)$

Step 5

Take out the expressions with the imaginary part, which are equal to

$\sin (7 x)$ . Remove the imaginary number

$i$ .

$\sin (7 x) = 7 \cos^{6} (x) \sin (x) - 35 \cos^{4} (x) \sin^{3} (x) + 21 \cos^{2} (x) \sin^{5} (x) - \sin^{7} (x)$