Trigonometric Values
Trigonometric Values are mathematical functions that relate the angles of a right triangle to the ratios of its sides. The primary trigonometric functions are sine (sin), cosine (cos), and tangent (tan) whose values are derived using a right-angled triangle.
In this article, we are going to discuss what are trigonometric values, Definition of Trigonometric values, Trigonometric Ratio Formula, Trigonometric Value Table, and some Solved Examples based on trigonometric values.
Table of Content
- What are Trigonometric Values?
- Trigonometric Ratio Formula
- Trigonometric Value Table
- Examples on Trigonometric Values
What are Trigonometric Values?
Trigonometric values tell the relation between the ratios of sides and the angles of the right-angled triangle. There are six trigonometric values in mathematics. The six trigonometric values in mathematics are sin θ, cos θ, tan θ, cosec θ, sec θ, and cot θ. These six trigonometric values focus on the connections between a triangle’s sides and angles.
Trigonometry values refer to the study of standard angles for a given triangle to trigonometric ratios. Some of the standard values of trigonometric values for which we calculate its value are 0o, 30o, 45o, 60o, and 90o.
Trigonometric Values Definition
Trigonometric values tells the relationship between the ratio of sides and angle of a triangle in right angled triangle. There are total of six ratios present in mathematics which are sine, cosine, tangent, cosecant, secant, cotangent.
Trigonometric Ratio Formula
The six trigonometric ratio are sin θ, cos θ, tan θ, cosec θ, sec θ and cot θ. Each ratio can be calculated by using the ratio of sides of triangles. The three given sides of right right-angled triangle are the base, perpendicular, and hypotenuse sides.
Let’s take a triangle ABC, right-angled at B. Take ∠A = θ. Now the hypotenuse of the triangle is AC, the base is AB and the perpendicular side is BC.
Formula defined for calculating all six trigonometric ratio with respect to ∠A are:
- Sin θ = Perpendicular/Hypotenuse = BC/ AC
- Cos θ = Base/Hypotenuse = AB/ AC
- Tan θ = Perpendicular/ Base = BC/AB
- Cosec θ = Hypotenuse/Perpendicular = AC/BC
- Sec θ = Hypotenuse/Base = AC/AB
- Cot θ = Base/Perpendicular = AB/BC
Also, Relation between six Trigonometric Ratios are:
- tan θ = sin θ/cos θ
- cot θ = cos θ/sin θ
- sin θ = 1/cosec θ
- cos θ = sin θ/tan θ
- cos θ = 1/sec θ
- Sec θ = tan θ/sin θ = 1/cos θ
- Cosec θ = 1/sin θ
Also, we have,
- sec θ . cos θ = 1
- cosec θ . sin θ = 1
- cot θ . tan θ = 1
Also Check,
Trigonometric Value Table
Values of some specific angles presented in form of table is known as Trigonometric value table. The angle can be represented both in form of radians and degree. The two different tables can be constructed on the basis of angle represented by degree and radian.
Value of trigonometric ratio can be calculated at every angle from 0o to 360o. The two different value table of all trigonometric ratio at some specific angles are given below:
- Trigonometric Value Table in Degree
- Trigonometric Value Table in Radian
Trigonometric Value Table in Degree
Trigonometric value table of angles in degree is represented below:
Angles in Degrees |
0o |
30o |
45o |
60o |
90o |
---|---|---|---|---|---|
Sin |
0 |
1/2 |
1/√2 |
√3/2 |
1 |
Cos |
1 |
√3/2 |
1/√2 |
1/2 |
0 |
Tan |
0 |
1/√3 |
1 |
√3 |
not-defined |
Cosec |
not-defined |
2 |
√2 |
2/√3 |
1 |
Sec |
1 |
2/√3 |
√2 |
2 |
not-defined |
Cot |
not-defined |
√3/1 |
1 |
1/√3 |
0 |
Trigonometric Value Table in Radian
Trigonometric value table of angles in radians is represented below:
Angle in Radians |
0c |
π/6 |
π/4 |
π/3 |
π/2 |
---|---|---|---|---|---|
Sin |
0 |
1/2 |
1/√2 |
√3/2 |
1 |
Cos |
1 |
√3/2 |
1/√2 |
1/2 |
0 |
Tan |
0 |
1/√3 |
1 |
√3 |
not-defined |
Cosec |
not-defined |
2 |
√2 |
2/√3 |
1 |
Sec |
1 |
2/√3 |
√2 |
2 |
not-defined |
Cot |
not-defined |
√3 |
1 |
1/√3 |
0 |
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Examples on Trigonometric Values
Various Sexamples on Trigonometric Values are,
Example 1: If the value of Cosec θ is 3/4 , find the value of Sinθ.
Solution:
Given, Cosec θ = 3/4
We know, Sin θ = 1/Coseθ
So, Sin θ = 4/3
Example 2: Find the value tan θ if the value of Sin θ and Cos θ is 3/4 and 2/4 respectively.
Solution:
We have,
sinθ = 3/4
cosθ = 2/4
we know, tanθ = sinθ/cosθ
tanθ = (3/4)/(2/4)
tanθ = 3/2
Example 3: If the value of Sin θ is 3/5 , find the value of all other trigonometric ratios.
Solution:
Given, sin θ = 3/5
Also, sin θ = perpendicular/hypotenuse = 3/5
Now, base = √hypotenuse2 – perpendicular2 = √25 – 9 = √16 = 4
cos θ = base/hypotenuse = 4/5
tan θ= perpendicular/base = 3/4
cosec θ = hypotenuse/ perpendicular = 5/3
sec θ = hypotenuse/base = 5/4
cot θ = base/perpendicular = 4/3.
Practice Problems on Trigonometric Values
Some practice problems on Trigonometric Values are,
P1: If the value of Sin θ is 4/5 , find the value of all other trigonometric ratios.
P2: If the value of tan θ is 4/3 , find the value of all other trigonometric ratios.
P3: If the value of sec θ is 7/5 , find the value of cos θ.
P4: If the value of tan θ is 7/5 , find the value of cot θ.
Trigonometric Values: FAQs
What are Formulas of Trigonometric Functions?
Formulas of Trigonometric Functions are
- sin θ = perpendicular/hypotenuse
- cos θ = base/hypotenuse
- tan θ = perpendicular/base
What is Relation Between Sin θ and Cosec θ?
Sin θ = 1/Cosec θ. Cosec θ is inverse of Sin θ.
How Angle 30o can be Represented in Radian Form?
The angle 30o is represented as π/6 in radian form.
What is Value of Cot 0o ?
Value of cot 00 = 1/0, thus value of cot 0o is undefined i.e. equal to infinity.
What is Value of Sin 45o ?
Value of sin 45° is 1/√2.
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