Why is Cos 60 Degrees Equal to 1/2?
The concept of Cos 60 degrees plays a key role in mathematics and is widely applicable to both real-life situations and exam scenarios. Understanding the value of cos 60°, its derivation, and common mistakes makes trigonometry much easier for students of all levels, especially for quick reference in board and competitive exams.
What Is Cos 60 Degrees?
Cos 60 degrees (also written as cos 60°) is the cosine of a 60 degree angle. In trigonometry, cosine of an angle in a right triangle is the ratio of the length of the side adjacent to the angle to the hypotenuse. The exact value of cos 60 degrees is 1/2. You’ll find this concept applied in geometry, the unit circle, and physics problems.
Key Formula for Cos 60 Degrees
Here’s the standard trigonometric formula: \( \cos(\theta) = \frac{\text{Adjacent side}}{\text{Hypotenuse}} \).
So, \( \cos(60^\circ) = \frac{1}{2} \).
Values of Cos 60 Degrees in Fraction, Decimal & Table
The value of cos 60 degrees in different forms:
| Angle | Cos Value (Fraction) | Cos Value (Decimal) | In Radians |
|---|---|---|---|
| 0° | 1 | 1.0 | 0 |
| 30° | \( \frac{\sqrt{3}}{2} \) | 0.866 | \( \frac{\pi}{6} \) |
| 45° | \( \frac{1}{\sqrt{2}} \) | 0.707 | \( \frac{\pi}{4} \) |
| 60° | \( \frac{1}{2} \) | 0.5 | \( \frac{\pi}{3} \) |
| 90° | 0 | 0.0 | \( \frac{\pi}{2} \) |
How to Derive the Value of Cos 60 Degrees?
Let’s see why cos 60 degrees is exactly 1/2. The most common way is to use a special right triangle (30-60-90 triangle):
1. Draw an equilateral triangle with each side of 2 units.2. Draw a height (altitude) from one vertex to the opposite side, splitting the base in half (1 unit each).
3. This creates two 30-60-90 right triangles. Use the Pythagoras theorem to calculate the height (\( h^2 = 2^2 - 1^2 \Rightarrow h^2 = 3 \Rightarrow h = \sqrt{3} \)).
4. For 60°, the adjacent side is 1, hypotenuse is 2.
5. So, \( \cos(60^\circ) = \frac{\text{adjacent}}{\text{hypotenuse}} = \frac{1}{2} \).
Another way: On the unit circle, at 60°, the x-coordinate is 0.5.
Cos 60 Degrees on the Unit Circle
On the unit circle, cos 60 degrees represents the x-coordinate of the point made by a 60° angle from the positive x-axis. For 60° (or π/3 radians):
- Coordinates: \( (\frac{1}{2}, \frac{\sqrt{3}}{2}) \)
- So, cos 60° = x-coordinate = 0.5
This helps you visualize cos 60° geographically. It’s always positive in the first quadrant.
Cos 60° Formula and Applications
Cos 60 degrees is used in formulas like:
- Right triangle: \( \cos \theta = \frac{\text{Adjacent}}{\text{Hypotenuse}} \)
- Cosine rule: \( c^2 = a^2 + b^2 - 2ab \cos C \)
- Complementary angle: \( \cos(60^\circ) = \sin(30^\circ) \)
Applications include finding distances, heights, resolving forces in physics, and solving geometry or trigonometry questions in JEE, NEET, and board exams. For further trigonometric context, see the Trigonometric Values Table and Trigonometric Functions for more formulas.
Frequent Errors and Misunderstandings
- Mixing up cos 60° and sin 60° (sin 60° = \( \frac{\sqrt{3}}{2} \), not 1/2!)
- Confusing degrees with radians.
- Using the wrong ratio: be sure it’s adjacent/hypotenuse for cosine.
- Saying cos 60° is negative—in fact, it’s positive in the first quadrant.
Example Problems Using Cos 60 Degrees
Let’s see cos 60 degrees in real practice:
1. What is cos 60° in decimal and fraction?Final Answer: Fraction = 1/2, Decimal = 0.5
2. Find adjacent side if hypotenuse = 8 and angle = 60°.
- \( \cos(60^\circ) = \frac{\text{adjacent}}{8} \Rightarrow \frac{1}{2} = \frac{\text{adjacent}}{8} \Rightarrow \text{adjacent} = 4 \)
3. In a right triangle, if one angle is 60° and hypotenuse is 10, what’s the length of the side adjacent to 60°?
- Use formula: \( \cos(60^\circ) = \frac{\text{adjacent}}{10} = \frac{1}{2} \) - Therefore, adjacent side = 10 × \( \frac{1}{2} \) = 5
Relation to Other Trigonometry Concepts
Knowing cos 60 degrees helps quickly find sin 60°, cos 30°, tan 60°, and complements other important values. See how cos and sin swap values at 30° and 60°, and check the Sin 60 Degrees and Cos 30 Degrees pages for direct comparison.
Classroom Tip
To quickly recall cos 60 degrees, remember the pattern for cosine values at standard angles: cos 0° = 1, cos 30° = \( \frac{\sqrt{3}}{2} \), cos 45° = \( \frac{1}{\sqrt{2}} \), cos 60° = 1/2, cos 90° = 0. Vedantu teachers often use the “mirror table” shortcut to help you memorize these.
We explored cos 60 degrees—definition, formula, unit circle meaning, solved examples, and quick tricks. Continue practicing with Vedantu to master other trigonometric values and become confident in math exams.
Related reading:
- Sin 60 Degrees – Compare sine and cosine at 60°
- Cos 30 Degrees – See the pattern between 30° and 60°
- Unit Circle – Learn about coordinates at all major angles
- Trigonometric Values – Full reference table for all important trigonometric ratios
FAQs on Cos 60 Degrees – Meaning, Value & Uses
1. What is the exact value of cos 60 degrees in fractions and decimals?
The exact value of cos 60 degrees (cos 60°) is 1/2 as a fraction and 0.5 as a decimal. This is a fundamental constant in trigonometry derived from the properties of a right-angled triangle.
2. How can the value of cos 60° be found using an equilateral triangle?
To find the value of cos 60°, you can start with an equilateral triangle with side length 2. If you bisect one angle, you create two 30-60-90 right-angled triangles. For the 60° angle:
- The adjacent side has a length of 1.
- The hypotenuse has a length of 2.
3. How is cos 60° represented on the unit circle?
On the unit circle (a circle with a radius of 1), the value of cos(θ) corresponds to the x-coordinate of the point on the circle's circumference at angle θ. For an angle of 60°, the coordinates of the point are (1/2, √3/2). Therefore, the x-coordinate, and thus the value of cos 60°, is 1/2.
4. Why is the value of cos 60° exactly 1/2?
The value of cos 60° is exactly 1/2 because of the fixed geometric relationship in a 30-60-90 triangle. In any such triangle, the side adjacent to the 60° angle is always precisely half the length of the hypotenuse. The cosine function captures this specific, unchanging ratio (Adjacent/Hypotenuse), making cos 60° a constant value of 1/2.
5. How is the value of cos 60° used in real-world examples like physics?
In physics, cos 60° is crucial for resolving vectors. For example, if a force of 100 Newtons is applied at a 60° angle to the horizontal, the horizontal component of that force is calculated as 100 * cos 60° = 100 * 0.5 = 50 Newtons. This is used in problems involving inclined planes, projectile motion, and work done by a force.
6. How does the value of cos 60° relate to sin 30° and sin 60°?
The values are related through complementary angle identities.
- cos 60° = sin 30°: The value of both is 1/2. This is because the cosine of an angle is equal to the sine of its complement (90° - 60° = 30°).
- cos 60° vs. sin 60°: These are different. While cos 60° is 1/2, sin 60° is √3/2 (approximately 0.866). Students often mix these two values up.
7. Is cos 60° the same as cos(π/3)?
Yes, cos 60° is exactly the same as cos(π/3). This is because 60 degrees is the equivalent angle measurement to π/3 radians. Both expressions refer to the same point on the unit circle and have the identical value of 1/2.
8. Why is cos 60° positive, and in which quadrants is the cosine function negative?
The value of cos 60° is positive because a 60° angle lies in the first quadrant of the Cartesian plane, where both the x (cosine) and y (sine) coordinates are positive. The cosine function becomes negative in the quadrants where the x-axis is negative. These are:
- The second quadrant (angles between 90° and 180°).
- The third quadrant (angles between 180° and 270°).
9. What are some common mistakes students make with cos 60°?
Common mistakes when dealing with cos 60° include:
- Confusing it with sin 60°: Accidentally using the value of sin 60° (√3/2) instead of the correct value of 1/2.
- Radian/Degree Errors: Using a calculator set to the wrong mode (radians instead of degrees, or vice-versa).
- Sign Errors: Forgetting that cosine is negative in the 2nd and 3rd quadrants and applying the positive value incorrectly for angles like cos 120°.
10. What is a simple trick to remember the value of cos 60°?
A popular trick is the finger-counting method for standard angles. For cosine, you count the fingers to the right of the finger representing the angle (e.g., ring finger for 60°). For cos 60°, there is one finger to the right. Using the formula √n / 2, you get √1 / 2, which simplifies to 1/2.
