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Chapter 4: Problem 4

Find \((a)\) the complement and \((b)\) the supplement of the given angles. $$57^{\circ}$$

Short Answer

Expert verified
The complement is 33° and the supplement is 123°.

Step by step solution

01

Determine the Complement of the Angle

The complement of an angle is what, when added to it, makes a right angle of 90 degrees. To find the complement of a given angle, subtract the angle from 90 degrees. For the angle given, 57 degrees, the complement would be calculated as follows:\[ 90^{\circ} - 57^{\circ} = 33^{\circ} \]
02

Determine the Supplement of the Angle

The supplement of an angle is what, when added to it, makes a straight angle of 180 degrees. To find the supplement of the given angle, subtract the angle from 180 degrees. For the angle 57 degrees, the supplement is calculated as follows:\[ 180^{\circ} - 57^{\circ} = 123^{\circ} \]

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Key Concepts

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

Complementary Angles
Complementary angles are an essential concept in geometry. They are two angles whose sum equals 90 degrees, forming a right angle. In other words, if you have one angle, the complementary angle is whatever's needed to make the two angles add up to 90 degrees. This creates a right angle.

The formula to find the complementary angle is simple: subtract the known angle from 90 degrees:
  • Complementary Angle = 90° - Given Angle
Understanding complementary angles can help with various real-world applications, such as designing or evaluating objects or structures that involve right angles.

For example, let's consider the angle of 57°. To find its complement, you would perform the following calculation:
  • 90° - 57° = 33°
So, the complementary angle of 57 degrees is 33 degrees. Being familiar with complementary angles aids in recognizing angle relationships across geometric figures.
Supplementary Angles
Supplementary angles take a relationship a step further to 180 degrees. These are two angles that, when combined, form a straight line or a straight angle. The sum of two supplementary angles is always 180 degrees.

To calculate the supplementary angle, use this simple formula:
  • Supplementary Angle = 180° - Known Angle
Whenever you need to find the missing angle in a situation where angles create a straight line, considering supplementary angles is the key.

For the angle given as 57°, finding the supplement involves:
  • 180° - 57° = 123°
This means that 123 degrees is the angle that, when added to 57 degrees, will total 180 degrees. Understanding supplementary angles can be particularly useful in various fields such as engineering and architecture, where precise angle measures are crucial.
Degrees Measurement
When working with angles, the degrees measurement is a fundamental concept. Angles are typically measured in degrees, a unit that gives a sense of the angle's size relative to complete circles and their fractions.

Here are important points about degrees:
  • There are 360 degrees in a full circle.
  • A right angle, which is one-fourth of a circle, measures 90 degrees.
  • A straight angle, equivalent to half a circle, measures 180 degrees.
Degrees provide a straightforward way to quantify how open or closed an angle is. This unit of measurement is incredibly versatile, used in everything from navigation and astronomy to everyday objects.

Understanding how degrees work can simplify solving problems involving complementary and supplementary angles, as well as broader geometric calculations. Mastery of degrees measurement also empowers students to approach more complex mathematical concepts with confidence.

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Most popular questions from this chapter

Find the equation of the line with positive slope that passes through the point \((a, 0)\) and makes an acute angle \(\theta\) with the \(x\) -axis. The equation of the line will be in terms of \(x\) \(a,\) and a trigonometric function of \(\theta .\) Assume \(a>0\)

Determine whether each statement is true or false. If an obtuse triangle is isosceles, then knowing the measure of the obtuse angle and a side adjacent to it is sufficient to solve the triangle.

Use a calculator to evaluate the following expressions. If you get an error, explain why. $$\csc \left(-270^{\circ}\right)$$

Let \(A, B,\) and \(C\) be the lengths of the three sides with \(X, Y,\) and \(Z\) as the corresponding angle measures in a triangle. Write a program using a TI calculator to solve each triangle with the given measures. $$B=45, C=57, \text { and } X=43^{\circ}$$

Determine whether each statement is true or false. It is possible for all six trigonometric functions of the same angle to have positive values.
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