The Measure Of An Angle Is 34 ∘ 34^{\circ} 3 4 ∘ . What Is The Measure Of Its Complementary Angle?A. 146 ∘ 146^{\circ} 14 6 ∘ B. 34 ∘ 34^{\circ} 3 4 ∘ C. 214 ∘ 214^{\circ} 21 4 ∘ D. 56 ∘ 56^{\circ} 5 6 ∘

Mar 13, 2025 by ADMIN 204 views

The Measure of a Complementary Angle

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Understanding Complementary Angles

In geometry, two angles are said to be complementary if the sum of their measures is equal to $90^{\circ}$ . This concept is crucial in various mathematical applications, including trigonometry and geometry. In this article, we will explore the measure of a complementary angle given the measure of another angle.

The Measure of the Given Angle

The measure of the given angle is $34^{\circ}$ . To find the measure of its complementary angle, we need to understand that the sum of the measures of the two complementary angles is equal to $90^{\circ}$ .

Finding the Measure of the Complementary Angle

Let's denote the measure of the complementary angle as $x^{\circ}$ . Since the sum of the measures of the two complementary angles is equal to $90^{\circ}$ , we can write the equation:

34^{\circ} + x^{\circ} = 90^{\circ}

Solving for x

To solve for $x$ , we need to isolate the variable on one side of the equation. We can do this by subtracting $34^{\circ}$ from both sides of the equation:

x^{\circ} = 90^{\circ} - 34^{\circ}

Evaluating the Expression

Now, let's evaluate the expression on the right-hand side of the equation:

x^{\circ} = 56^{\circ}

Conclusion

Therefore, the measure of the complementary angle is $56^{\circ}$ .

Answer

The correct answer is D. $56^{\circ}$ .

Why is this important?

Understanding complementary angles is crucial in various mathematical applications, including trigonometry and geometry. It helps us to solve problems involving right triangles, circles, and other geometric shapes.

Real-world Applications

Complementary angles have numerous real-world applications, including:

Architecture: Complementary angles are used in the design of buildings and bridges to ensure that the structures are stable and secure.
Engineering: Complementary angles are used in the design of machines and mechanisms to ensure that they function properly.
Art: Complementary angles are used in the creation of art and design to add visual interest and balance.

Conclusion

In conclusion, the measure of a complementary angle can be found by subtracting the measure of the given angle from $90^{\circ}$ . This concept is crucial in various mathematical applications, including trigonometry and geometry. Understanding complementary angles can help us to solve problems involving right triangles, circles, and other geometric shapes.

Frequently Asked Questions

Q: What is the measure of a complementary angle?

A: The measure of a complementary angle is equal to $90^{\circ}$ minus the measure of the given angle.

Q: How do I find the measure of a complementary angle?

A: To find the measure of a complementary angle, you need to subtract the measure of the given angle from $90^{\circ}$ .

Q: What are some real-world applications of complementary angles?

A: Complementary angles have numerous real-world applications, including architecture, engineering, and art.

Q: Why is understanding complementary angles important?

A: Understanding complementary angles is crucial in various mathematical applications, including trigonometry and geometry. It helps us to solve problems involving right triangles, circles, and other geometric shapes.

References

[1] "Complementary Angles." Math Open Reference, mathopenref.com/anglescomplementary.html.
[2] "Complementary Angles." Khan Academy, khanacademy.org/math/geometry/angles/angle-measures/v/complementary-angles.

Additional Resources

[1] "Complementary Angles." Math Is Fun, mathisfun.com/geometry/complementary-angles.html.
[2] "Complementary Angles." IXL, ixl.com/math/complementary-angles.

Conclusion

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Frequently Asked Questions

Q: What is the definition of a complementary angle?

A: A complementary angle is an angle that, when added to another angle, equals $90^{\circ}$ .

Q: How do I find the measure of a complementary angle?

A: To find the measure of a complementary angle, you need to subtract the measure of the given angle from $90^{\circ}$ .

Q: What is the relationship between complementary angles and supplementary angles?

A: Complementary angles and supplementary angles are related in that they are both used to describe the relationship between two angles. However, complementary angles add up to $90^{\circ}$ , while supplementary angles add up to $180^{\circ}$ .

Q: Can two angles be both complementary and supplementary?

A: No, two angles cannot be both complementary and supplementary. If two angles are complementary, they add up to $90^{\circ}$ , and if they are supplementary, they add up to $180^{\circ}$ .

Q: How do I use complementary angles in real-world applications?

A: Complementary angles have numerous real-world applications, including architecture, engineering, and art. They are used to design buildings and bridges, create machines and mechanisms, and add visual interest to art and design.

Q: What are some common mistakes to avoid when working with complementary angles?

A: Some common mistakes to avoid when working with complementary angles include:

Confusing complementary angles with supplementary angles: Make sure to understand the difference between the two.
Not checking the units: Make sure to check the units of the angles to ensure that they are in degrees.
Not using a calculator: Make sure to use a calculator to check your calculations.

Q: How do I teach complementary angles to students?

A: To teach complementary angles to students, you can use a variety of methods, including:

Visual aids: Use visual aids such as diagrams and charts to help students understand the concept of complementary angles.
Real-world examples: Use real-world examples to show students how complementary angles are used in architecture, engineering, and art.
Practice problems: Provide students with practice problems to help them understand the concept of complementary angles.

Q: What are some common misconceptions about complementary angles?

A: Some common misconceptions about complementary angles include:

Thinking that complementary angles are always equal: Complementary angles do not have to be equal.
Thinking that complementary angles are always acute: Complementary angles can be acute or obtuse.
Thinking that complementary angles are always right angles: Complementary angles are not always right angles.

Conclusion

In conclusion, complementary angles are an important concept in geometry that have numerous real-world applications. By understanding the definition, relationship, and common mistakes associated with complementary angles, you can use them to solve problems and create art and design.

Additional Resources

[1] "Complementary Angles." Math Is Fun, mathisfun.com/geometry/complementary-angles.html.
[2] "Complementary Angles." IXL, ixl.com/math/complementary-angles.
[3] "Complementary Angles." Khan Academy, khanacademy.org/math/geometry/angles/angle-measures/v/complementary-angles.

References

[1] "Complementary Angles." Math Open Reference, mathopenref.com/anglescomplementary.html.
[2] "Complementary Angles." Wikipedia, en.wikipedia.org/wiki/Complementary_angles.

Final Thoughts

Complementary angles are an important concept in geometry that have numerous real-world applications. By understanding the definition, relationship, and common mistakes associated with complementary angles, you can use them to solve problems and create art and design.