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Cos 30 Degrees

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The value of cos 30 degrees in trigonometry is √3/2. In a right-angled triangle, cosine is the ratio of the base and hypotenuse. When the angle of the right-angled triangle is 30°, the value of cos 30° is required. In fraction form, the value of cos 30° is √3/2, and in decimal form, the value is 0.8660. Let’s understand how the value of cos 30° is obtained with examples.

What is the Value of Cos 30 Degrees?

The value of cos 30 degrees in decimals is 0.8660. Converting degree to radian, that is, θ in radians = θ × π/180° or θ × Pi/180°. Therefore, converting cos 30° in radians will give cos (30 × π/180°), and the final value in radians will become cos(π/6) or cos(0.5235). Following are the values of cos 30° in different forms,

  • Cos 30° in decimal = 0.8660
  • Cos 30° in radians = cos(π/6) or cos(0.5235)
  • Cos 30° in fraction = √3/2
  • Cos (-30°) = 0.8660
Value of cos30 degrees

 

Methods to Find the Value of Cos30 Degrees

In order to find the value of cos 30 degrees, the unit circle is taken into account. While looking at the unit circle, it is noticed that the value of cos 30° in the first quadrant is positive and is given as 0.8660. There are two ways to find out the value of cos 30°. The methods are mentioned below:

  1. Using Trigonometric Functions
  2. Using Unit Circle

Cos 30 Degrees in Terms of Trigonometric Functions

Trigonometric functions are also called circular functions or trigonometric ratios. The relationship between angles and sides is represented by these trigonometric functions. The representation of the value of cos 30° using trigonometric functions are:

  • Cos 30° = ± √(1 – sin2 30°)
  • Cos 30° = ± 1/√(1 + tan2 30°)
  • Cos 30° = ± cot 30°/√(1 + cot2 30°)
  • Cos 30° = 1/sec 30°

Cos 30 Degrees Using Unit Circle

Value of cos 30 using unit circle

 

In order to find the value of cos 30 degrees using a unit circle, the following steps are required to be followed:

  • Rotate the ‘r’ from 0 degrees to 30 degrees in the unit circle.
  • The value of ‘r’ will be 0.8660 in the x-coordinate and 0.5 in the y-coordinate.
  • Therefore, the value of cos 30° =  x = 0.8660.

Cos 30 Degrees Proof

There are two approaches to deriving the value of cos 30 degrees, they are:

  1. Theoretical approach
  2. Practical approach

Theoretical Approach

In the theoretical approach, the value of cos 30 degrees is obtained by observing the sides of the right-angled triangle and using Pythagoras theorem. It can be seen that if the angle of the right angle triangle is 30, we can find out the length of the opposite side, which will be half the length of the hypotenuse, but in order to find the value of cos 30, we require the length of the adjacent side as well (base of the triangle). 

Theoretical approach

 

Applying Pythagoras theorem:

OA2 = OB2 + AB2

d2 = OB2 + (d/2)2

d2 = OB2 + d2/4

OB2 = d2 – d2/4

OB2 = 3d2/4

OB = √3d/2

The value of cosine can be found by finding the ratio of the base to its hypotenuse; therefore, in this case, cos 30 degrees will be:

Cos 30° = OB/OA

Cos 30° = √3d/2 × 1/d

Cos 30° = √3/2

Practical Approach

The value of cos 30 degrees can also be observed using the practical approach. In the practical approach, the right-angled triangle is drawn, making an angle of 30 degrees, and then the value of cos 30° is observed. Following are the steps to draw the triangle:

Practical-approach

 

  • Take a point O and draw and line.
  • Using the line as the baseline, make a 30-degree angle from the protector.
  • Draw a line from that angle found. Take any random length and draw an arc to decide where the line shall stop. Name it, Point A.
  • Draw the perpendicular (Vertical line) to the base from the intersection formed by the arc and the line. They will meet at B.

Read More

Value of Sin 30°

Value of Tan 30°

Solved Examples on Value of Cos 30 Degrees

Example 1: In a right-angled triangle, the base to the angle of 30° is 9m. Find the length of the Hypotenuse.

Solution:

Given: Base = 9m

Cos = √3/2

B/H = √3/2

9/H = √3/2 

H = (9 × 2) / √3

H = 6√3m 

Example 2: In a right-angled triangle, the hypotenuse is 16m. and one angle is 30°, find the other two sides of the triangle.

Solution:

Given, Hypotenuse = 16,  angle = 30°

Cos 30 = B/H

B/H = √3/2

B/16 = √3/2

B = 8√3m

Third side is calculated using Pythagoras theorem.

P2 + B2 = H2

P2 + (8√3)2 = 162

P2 + 192 =  256

P2 64

p = 8m

Sides of triangle are – 8m, 8√3m, 16m.

Example 3: Find the value of 4cos 30°/sin 30°.

Solution:

The value of cos 30° in fractions is √3/2, and the value of sin 30 in fractions is 1/2. Therefore, it can be written as,

4 cos 30°/sin 30° = 4[√3/2 × 2]

= 4 × √3

= 4√3

Example 4: Find the value of sin 60° multiplied by cos 30°.

Solution:

The value of cos 30° in fractions is √3/2, and the value of sin 60° in fractions is √3/2. Therefore, it can be written as,

sin 60° × cos 30° = [√3/2 × √3/2]

sin 60° × cos 30° = 3/4

FAQs on Value of Cos 30 Degrees

Question 1: What is the value of cos 30° in terms of cot 30°?

Answer:

Any trigonometric function can be represented in terms of another trigonometric function. The value of cos θ in terms of cot θ is written as,

Cos θ = ± cot θ/√(1 + cot2 θ)

Therefore, the value of cos 30 in terms of cot 30° can be written as:

Cos 30° = ± cot 30°/√(1 + cot2 30°).

Question 2: How to find the value of cos 30 degrees from a practical approach?

Answer:

The value of cos 30 can be found using a practical approach by drawing a right-angled triangle having an angle of 30 with the help of a compass, protector, and ruler. After the triangle is drawn, take the ratio of the adjacent side to the hypotenuse. The value obtained is the value of cos 30.

Cos 30° = 0.8660.

Question 3: Write the alternate forms of the value of cos 30 degrees.

Answer:

Below table explains the alternate forms of cos 30 degrees along with the value in decimals.

Forms Formula for cos 30 degrees Value of cos 30 degree
Trigonometric ratio √3/2 0.8660254
Circular system π/6 0.8660254
Centesimal system cos 33(1/3)g 0.8660254

Question 4: What is the value of cos 30° in terms of cosec 30°?

Answer:

Any trigonometric function can be represented in terms of another trigonometric function. The value of cos θ in terms of cosec θ is written as,

Cos θ = ± [√(cosec2 θ – 1)/cosec θ]

Therefore, the value of cos 30 in terms of cot 30 can be written as:

Cos 30° = ± [√(cosec2 30° – 1)/cosec 30°].



Last Updated : 02 Sep, 2022
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