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Chapter 6: Problem 26

Express as a sum. $$(\cos a u)(\cos b u)$$

Short Answer

Expert verified
\((\cos a u)(\cos b u) = \frac{1}{2}[\cos((a+b)u) + \cos((a-b)u)]\).

Step by step solution

01

Recognize the Trigonometric Identity

To express the product \((\cos a u)(\cos b u)\) as a sum, we will use the trigonometric identity for the product of cosines: \[\cos x \cos y = \frac{1}{2}(\cos(x+y) + \cos(x-y)).\]
02

Apply the Identity

Apply the identity to \((\cos a u)(\cos b u)\) by letting \(x = a u\) and \(y = b u\). Use the identity from Step 1:\[\cos(a u) \cos(b u) = \frac{1}{2}[\cos((a+b)u) + \cos((a-b)u)].\]
03

Simplify the Expression

Write down the resulting expression:\[\cos(a u) \cos(b u) = \frac{1}{2}(\cos((a+b)u) + \cos((a-b)u)).\] This expression is the sum form of the original product.

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Key Concepts

These are the key concepts you need to understand to accurately answer the question.

Product-to-Sum Identities
Product-to-sum identities are very useful in trigonometry, simplifying complex expressions into more manageable forms. These identities allow us to convert a product of trigonometric functions into a sum or difference of trigonometric functions.

The product-to-sum identities come in handy when integrating or simplifying expressions. For the cosine function, the identity is:
  • \(\cos x \cos y = \frac{1}{2}(\cos(x+y) + \cos(x-y))\)
This formula transforms the product of two cosine terms into the sum of two other cosine terms. It breaks down a potentially difficult multiplication into a simpler addition problem.

By applying this identity, we can efficiently handle trigonometric expressions in different contexts such as signal processing, engineering, or pure mathematics.
Cosine Function
Understanding the cosine function is crucial in trigonometry. It's one of the primary functions that describe the relationship between the angles and sides of a right triangle.

The cosine function, often represented as \(\cos \theta\), expresses the ratio of the length of the adjacent side to the hypotenuse.

Besides its geometrical representation, cosine has a periodic 'wave' pattern that repeats every \(2\pi\) radians (or 360 degrees). This is vital in analyzing periodic phenomena such as sound waves or tides.

In our scope of identities, manipulating the cosine function using product-to-sum identities greatly enhances our ability to simplify and interpret intricate expressions.
Simplifying Expressions
Simplifying expressions is one of the key tasks in solving mathematical problems, and it often involves applying known identities.

For trigonometric expressions, this includes using identities such as product-to-sum to transform and simplify terms into forms that are easier to work with. This simplification reduces complexity and aids in recalculating or integrating functions.

For instance, using our example
  • \((\cos a u)(\cos b u)\)
by applying the product-to-sum identity, we converted it into
  • \(\frac{1}{2}(\cos((a+b)u) + \cos((a-b)u))\)
This resulted in a simpler format, making further calculations and derivations more straightforward.

Learning to simplify expressions is a powerful skill that simplifies problem-solving across various scenarios in mathematics and applied sciences.

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Most popular questions from this chapter

Graph \(f\) in the viewing rectangle \([0,3]\) by \([-1.5,1.5]\). (a) Approximate to within four decimal places the largest solution of \(f(x)=0\) on \([0,3]\) (b) Discuss what happens to the graph of \(f\) as \(x\) becomes large. (c) Examine graphs of the function \(f\) on the interval \([0, c]\) where \(c=0.1,0.01,0.001 .\) How many zeros does \(f\) appear to have on the interval \([0, c],\) where \(c>0 ?\) $$f(x)=\cos \frac{1}{x}$$

Either show that the equation \(i s\) an identity or show that the equation \(is\quad not\) an identity. $$(\sec x+\tan x)^{2}=2 \tan x(\tan x+\sec x)$$

If an earthquake has a total horizontal displacement of \(S\) meters along its fault line, then the horizontal movement \(M\) of a point on the surface of Earth \(d\) kilometers from the fault line can be estimated using the formula $$M=\frac{S}{2}\left(1-\frac{2}{\pi} \tan ^{-1} \frac{d}{D}\right)$$ where \(D\) is the depth (in kilometers) below the surface of the focal point of the earthquake. For the San Francisco earthquake of \(1906, S\) was 4 meters and \(D\) was 3.5 kilometers. Approximate \(M\) for the stated values of \(d\) (a) 1 kilometer (b) 4 kilometers (c) 10 kilometers

Sketch the graph of the equation. $$y=\tan ^{-1} 2 x$$

Estimate the solutions of the equation in the interval \([-\pi, \pi]\). $$\ln \left(1+\sin ^{2} x\right)=\cos x$$
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