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Chapter 5: Problem 314

For the following exercises, convert the angle measures to radians. $$ 180^{\circ} $$

Short Answer

Expert verified
\(180^{\circ}\) is \(\pi\) radians.

Step by step solution

01

Understand the Relationship between Degrees and Radians

Before converting, it's essential to remember that a complete circle measures \(360^{\circ}\) in degrees and \(2\pi\) in radians. Therefore, the conversion factor between degrees to radians is \(\frac{\pi}{180}\).
02

Apply the Conversion Formula

To convert degrees to radians, multiply the degree measure by \(\frac{\pi}{180}\). For an angle of \(180^{\circ}\), apply the formula:\[180^{\circ} \times \frac{\pi}{180}\]
03

Simplify the Expression

Simplify the multiplication:\[180 \times \frac{\pi}{180} = \pi\]The \(180\)s cancel each other out, leaving \(\pi\) radians as the result.

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Key Concepts

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

Degrees to Radians
When we want to convert an angle from degrees to radians, we use a simple formula. This formula is derived from the fact that a complete circle is measured in two ways: 360 degrees or \(2\pi\) radians. The fraction \(\frac{\pi}{180}\) is used as the conversion factor. This is because \(\pi\) radians is equivalent to 180 degrees.

To convert any angle from degrees to radians, just multiply the degree value by \(\frac{\pi}{180}\). For example, if you have an angle of 180 degrees, you apply the formula:
\[180^{\circ} \times \frac{\pi}{180} = \pi\]
This multiplication effectively changes units from degrees to radians. You'll find this handy in various math and physics applications.
Trigonometry
Trigonometry involves the study of triangles, and particularly the relationships between their angles and sides. It is a branch of mathematics that is crucial for understanding various scientific and practical problems ranging from architecture to astronomy.

Understanding angles in both degrees and radians is vital in trigonometry because:
  • Trigonometric functions like sine, cosine, and tangent use radians for their calculations.
  • Radians provide a more natural measure in these functions, particularly important in calculus.
For instance, the sine of \(\pi\) (or 180 degrees) is 0, which aligns seamlessly with the unit circle used to define these functions.
Properly converting between degrees and radians helps to grasp these fundamentals, ensuring calculations in trigonometry are accurate and meaningful.
Conversion Factor
A conversion factor is a number used to change one unit of measurement to another, while keeping the quantity the same. In the case of converting angles, the factor is \(\frac{\pi}{180}\) to go from degrees to radians.

The conversion factor works as follows:
  • The number \(180\) represents the full angle measure in a semicircle (half of a circle in degrees).
  • The \(\pi\) corresponds to the same semicircle but in terms of radians.
By multiplying the degree measure by the conversion factor \(\frac{\pi}{180}\), you adjust the units while preserving the angle’s magnitude.
It's important because different disciplines prefer different units, and understanding this transformation keeps calculations consistent across fields.

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Most popular questions from this chapter

For the following exercises, find the exact value of the given expression. $$ \sec \frac{\pi}{4} $$

For the following exercises, find the angle between \(0^{\circ}\) and \(360^{\circ}\) that is coterminal with the given angle. $$ 420^{\circ} $$

For the following exercises, use cofunctions of complementary angles. $$ \tan \left(\frac{\pi}{4}\right)=\cot (\\_) $$

Convert \(-620^{\circ}\) to radians.

A radio tower is located 400 feet from a building. From a window in the building, a person determines that the angle of elevation to the top of the tower is \(36^{\circ},\) and that the angle of depression to the bottom of the tower is \(23^{\circ} .\) How tall is the tower?
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