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Chapter 9: Problem 29

Perform each calculation. $$62^{\circ} 18^{\prime}+21^{\circ} 41^{\prime}$$

Short Answer

Expert verified
The sum of the angles is \(83^{\circ} 59^{\prime}\).

Step by step solution

01

Understand the Problem

We are asked to add two angles given in degrees (°) and minutes ('). The angles are \(62^{\circ} 18^{\prime}\) and \(21^{\circ} 41^{\prime}\). The challenge is to remember that 60 minutes make up 1 degree.
02

Add the Minutes

Add the minutes from both angles: \(18^{\prime} + 41^{\prime} = 59^{\prime}\). Since this sum is less than 60, we don't need to convert minutes to degrees here.
03

Add the Degrees

Add the degree parts: \(62^{\circ} + 21^{\circ} = 83^{\circ}\).
04

Combine Results

Combine the minutes and degrees from the previous steps: \(83^{\circ} 59^{\prime}\).

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Key Concepts

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

Degrees and Minutes
In angle measurement, degrees and minutes are units used to describe the size of an angle precisely. An angle is often divided into degrees (°), and each degree is subdivided into 60 minutes (').
This system makes it easier to express finer divisions of an angle without requiring too many decimal places.
When dealing with angles written as degrees and minutes, think of it like hours and minutes on a clock. Just as there are 60 minutes in an hour, there are 60 minutes in a full degree.
  • One complete circle is 360 degrees.
  • Each degree splits into 60 smaller parts known as minutes.
  • Each minute can further divide into 60 seconds (not needed here, but helpful to know).
Understanding degrees and minutes is crucial for performing accurate angle calculations, especially in contexts like navigation, astronomy, or even simple geometry homework!
Mathematical Operations
Adding angles requires us to perform mathematical operations carefully. We start with the smallest units and progress to larger ones, similar to adding time.
In this exercise, we are dealing with degrees and minutes.
First, add the minutes of each angle:
  • Compute: \(18' + 41' = 59'\).
Since 59 minutes don't exceed 60, there's no need to convert minutes to degrees this time.
Next, add the degrees:
  • Compute: \(62^{\circ} + 21^{\circ} = 83^{\circ}\).
When combining the results, ensure the sum of minutes is less than 60 to avoid overflow. If it were more, every complete 60 minutes would transition into an additional degree. This method is systematic and prevents errors in complex calculations.
Angle Measurement
Angle measurement is essential in various fields, from simple geometry to complex engineering.
Angles can be measured in multiple ways, but degrees are one of the most common units used.
Understanding the relationship between degrees, minutes, and seconds helps you measure angles accurately. Here's a quick recap:
  • Degrees are the main unit for measuring angles.
  • Minutes allow for more precise measurements than whole degrees alone.
  • A whole circle measures 360 degrees, symbolizing complete rotation.
Having this knowledge allows you to handle calculations involving angles confidently, whether you're calculating angles for a practical task or purely academic purposes.
Knowing how to add, subtract, and convert between these units is a fundamental skill in geometry, much like managing hours and minutes in timekeeping.

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Most popular questions from this chapter

Decide whether each statement is possible for some angle \(\boldsymbol{\theta}\), or impossible for that angle. $$\sin \theta=2$$

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