$\begin{array}{l} 2 \sin (7 x) - 2 \sin x = 2 \sin (4 x + 3 x) - 2 \sin (4 x - 3 x) = \\ 2 (\sin (4 x) \cos (3 x) + \sin (3 x) \cos (4 x)) - 2 (\sin (4 x) \cos (3 x) - \sin (3 x) \cos (4 x)) = \\ 2 \sin (4 x) \cos (3 x) + 2 \sin (3 x) \cos (4 x)) - 2 \sin (4 x) \cos (3 x) + 2 \sin (3 x) \cos (4 x)) = \\ 4 \sin (3 x) \cos (4 x) \end{array}$

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$\frac{6 \cos (8 x) \sin (2 x)}{\sin (- 6 x)} = −3 \sin (10 x) \csc (6 x) + 3$

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$\sin x + \sin (3 x) = 4 \sin x \cos^{2} x$

$\sin x + \sin (3 x) = 2 \sin (\frac{4 x}{2}) \cos (\frac{- 2 x}{2}) =$
$2 \sin (2 x) \cos x = 2 (2 \sin x \cos x) \cos x =$
$4 \sin x \cos^{2} x$

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$2 (\cos^{3} x - \cos x \sin^{2} x) = \cos (3 x) + \cos x$

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$2 \tan x \cos (3 x) = \sec x (\sin (4 x) - \sin (2 x))$

$2 \tan x \cos (3 x) = \frac{2 \sin x \cos (3 x)}{\cos x} = \frac{2 (.5 (\sin (4 x) - \sin (2 x)))}{\cos x}$
$= \frac{1}{\cos x} (\sin (4 x) - \sin (2 x)) = \sec x (\sin (4 x) - \sin (2 x))$

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$\cos (a + b) + \cos (a - b) = 2 \cos a \cos b$

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Numeric

For the following exercises, rewrite the sum as a product of two functions or the product as a sum of two functions. Give your answer in terms of sines and cosines. Then evaluate the final answer numerically, rounded to four decimal places.

$\cos (58^{\circ}) + \cos (12^{\circ})$

$2 \cos (35^{\circ}) \cos (23^{\circ}), 1 .5081$

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$\sin (2^{\circ}) - \sin (3^{\circ})$

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$\cos (44^{\circ}) - \cos (22^{\circ})$

$- 2 \sin (33^{\circ}) \sin (11^{\circ}), - 0.2078$

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$\cos (176^{\circ}) \sin (9^{\circ})$

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$\sin (- 14^{\circ}) \sin (85^{\circ})$

$\frac{1}{2} (\cos (99^{\circ}) - \cos (71^{\circ})), - 0.2410$

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Technology

For the following exercises, algebraically determine whether each of the given expressions is a true identity. If it is not an identity, replace the right-hand side with an expression equivalent to the left side. Verify the results by graphing both expressions on a calculator.

$2 \sin (2 x) \sin (3 x) = \cos x - \cos (5 x)$

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$\frac{\cos (10 θ) + \cos (6 θ)}{\cos (6 θ) - \cos (10 θ)} = \cot (2 θ) \cot (8 θ)$

It is and identity.

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$\frac{\sin (3 x) - \sin (5 x)}{\cos (3 x) + \cos (5 x)} = \tan x$

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$2 \cos (2 x) \cos x + \sin (2 x) \sin x = 2 \sin x$

It is not an identity, but $2 \cos^{3} x$ is.

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$\frac{\sin (2 x) + \sin (4 x)}{\sin (2 x) - \sin (4 x)} = - \tan (3 x) \cot x$

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For the following exercises, simplify the expression to one term, then graph the original function and your simplified version to verify they are identical.

$\frac{\sin (9 t) - \sin (3 t)}{\cos (9 t) + \cos (3 t)}$

$\tan (3 t)$

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$2 \sin (8 x) \cos (6 x) - \sin (2 x)$

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$\frac{\sin (3 x) - \sin x}{\sin x}$

$2 \cos (2 x)$

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$\frac{\cos (5 x) + \cos (3 x)}{\sin (5 x) + \sin (3 x)}$

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$\sin x \cos (15 x) - \cos x \sin (15 x)$

$- \sin (14 x)$

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Extensions

For the following exercises, prove the following sum-to-product formulas.

$\sin x - \sin y = 2 \sin (\frac{x - y}{2}) \cos (\frac{x + y}{2})$

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$\cos x + \cos y = 2 \cos (\frac{x + y}{2}) \cos (\frac{x - y}{2})$

Start with $\cos x + \cos y .$ Make a substitution and let $x = α + β$ and let $y = α - β,$ so $\cos x + \cos y$ becomes
$\cos (α + β) + \cos (α - β) = \cos α \cos β - \sin α \sin β + \cos α \cos β + \sin α \sin β = 2 \cos α \cos β$

Since $x = α + β$ and $y = α - β,$ we can solve for $α$ and $β$ in terms of x and y and substitute in for $2 \cos α \cos β$ and get $2 \cos (\frac{x + y}{2}) \cos (\frac{x - y}{2}) .$

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For the following exercises, prove the identity.

$\frac{\sin (6 x) + \sin (4 x)}{\sin (6 x) - \sin (4 x)} = \tan (5 x) \cot x$

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$\frac{\cos (3 x) + \cos x}{\cos (3 x) - \cos x} = - \cot (2 x) \cot x$

$\frac{\cos (3 x) + \cos x}{\cos (3 x) - \cos x} = \frac{2 \cos (2 x) \cos x}{- 2 \sin (2 x) \sin x} = - \cot (2 x) \cot x$

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$\frac{\cos (6 y) + \cos (8 y)}{\sin (6 y) - \sin (4 y)} = \cot y \cos (7 y) \sec (5 y)$

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$\frac{\cos (2 y) - \cos (4 y)}{\sin (2 y) + \sin (4 y)} = \tan y$

$\begin{array}{l} \frac{\cos (2 y) - \cos (4 y)}{\sin (2 y) + \sin (4 y)} = \frac{- 2 \sin (3 y) \sin (- y)}{2 \sin (3 y) \cos y} = \\ \frac{2 \sin (3 y) \sin (y)}{2 \sin (3 y) \cos y} = \tan y \end{array}$

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$\frac{\sin (10 x) - \sin (2 x)}{\cos (10 x) + \cos (2 x)} = \tan (4 x)$

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$\cos x - \cos (3 x) = 4 \sin^{2} x \cos x$

$\begin{array}{l} \cos x - \cos (3 x) = - 2 \sin (2 x) \sin (- x) = \\ 2 (2 \sin x \cos x) \sin x = 4 \sin^{2} x \cos x \end{array}$

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${(\cos (2 x) - \cos (4 x))}^{2} + {(\sin (4 x) + \sin (2 x))}^{2} = 4 \sin^{2} (3 x)$

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$\tan (\frac{π}{4} - t) = \frac{1 - \tan t}{1 + \tan t}$

$\tan (\frac{π}{4} - t) = \frac{\tan (\frac{π}{4}) - \tan t}{1 + \tan (\frac{π}{4}) \tan (t)} = \frac{1 - \tan t}{1 + \tan t}$

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Questions & Answers

what does mean opportunity cost?

Aster Reply

what is poetive effect of population growth

Solomon Reply

what is inflation

Nasir Reply

what is demand

Eleni

what is economics

IMLAN Reply

economics theory describes individual behavior as the result of a process of optimization under constraints the objective to be reached being determined by

Kalkidan

Economics is a branch of social science that deal with How to wise use of resource ,s

Kassie

need

WARKISA

Economic Needs: In economics, needs are goods or services that are necessary for maintaining a certain standard of living. This includes things like healthcare, education, and transportation.

Kalkidan

What is demand and supply

EMPEROR Reply

deman means?

Alex

what is supply?

Alex

ex play supply?

Alex

Money market is a branch or segment of financial market where short-term debt instruments are traded upon. The instruments in this market includes Treasury bills, Bonds, Commercial Papers, Call money among other.

murana Reply

good

Kayode

what is money market

umar Reply

Examine the distinction between theory of comparative cost Advantage and theory of factor proportion

Fatima Reply

What is inflation

Bright Reply

a general and ongoing rise in the level of prices in an economy

AI-Robot

What are the factors that affect demand for a commodity

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price

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differentiate between demand and supply giving examples

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differentiated between demand and supply using examples

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information

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devaluation

Eliyee

WARKISA

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multiple choice question

Aster Reply

appreciation

Eliyee

explain perfect market

Lindiwe Reply

In economics, a perfect market refers to a theoretical construct where all participants have perfect information, goods are homogenous, there are no barriers to entry or exit, and prices are determined solely by supply and demand. It's an idealized model used for analysis,

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Source: OpenStax, Precalculus. OpenStax CNX. Jan 19, 2016 Download for free at https://legacy.cnx.org/content/col11667/1.6

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