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Chapter 6: Problem 95

Give an example of an angle \(\theta\) such that both \(\sin \theta\) and \(\sin (2 \theta)\) are rational.

Short Answer

Expert verified
An example of an angle θ such that both \(\sin \theta\) and \(\sin (2\theta)\) are rational is θ = 30°, as \(\sin(30°) = \frac{1}{2}\) and \(\sin(2 \times 30°) = \sin(60°) = \frac{\sqrt{3}}{2}\).

Step by step solution

01

Define the problem

First, we need to find an angle θ which satisfies both conditions, sin(θ) must be a rational number and sin(2θ) should also be a rational number.
02

Recognize sin(2θ) is a trigonometric identity

We should recognize that sin(2θ) is a trigonometric identity, which can alternatively be expressed as: sin(2θ) = 2sin(θ)cos(θ)
03

Find a right triangle with a rational sin(θ)

Since sine and cosine are also trigonometric ratios, we can first try to find a right triangle that has a rational value of sin(θ). We can start by considering the special 45-45-90 or 30-60-90 triangles. For the 30-60-90 triangle: the angles are 30°, 60°, and 90°, and its sides are in the ratio 1:√3:2. Sin(30°) = opposite side / hypotenuse = 1/2, a rational number We can consider θ = 30°.
04

Calculate sin(2θ) using the angle θ obtained in Step 3

Now that we have obtained an angle θ (30°) with a rational sin(θ), we will check if sin(2θ) is also a rational number. Using the angle from Step 3: θ = 30° 2θ = 2(30°) = 60° Now, we calculate sin(60°) using the same 30-60-90 triangle: sin(60°) = opposite side / hypotenuse = √3/2 Sin(60°) = √3/2, which is also a rational number since it can be expressed as a fraction.
05

Provide the example angle θ

We have found an angle θ = 30° where both sin(θ) and sin(2θ) are rational numbers: sin(30°) = 1/2 sin(2 × 30°) = sin(60°) = √3/2. Therefore, θ = 30° is an example of an angle such that both sin(θ) and sin(2θ) are rational numbers.

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