Trigonometry is an important branch of mathematics that deals with the relation between the lengths of sides and angles of a right-angled triangle. Sine, Cosine, tangent, cosecant, secant, and cotangent are the six trigonometric ratios or functions. Where a trigonometric ratio is depicted as the ratio between the sides of a right-angled triangle.
sin θ = opposite side/hypotenuse
cos θ = adjacent side/hypotenuse
tan θ = opposite side/adjacent side
cosec θ = 1/sin θ = hypotenuse/opposite side
sec θ = 1/cos θ = hypotenuse/adjacent side
cot θ = 1/tan θ = adjacent side/opposite side
Cotangent Formula
A Cotangent function is a reciprocal function of the given tangent function. The value of a cotangent angle in a right-angled triangle is the ratio of the length of the side adjacent to the given angle to the length of the side opposite to the given angle. We write cotangent function as "cot".
Cotangent law looks similar to sine law, but here it involves half angles. The law of cotangents describes the relationship between the lengths of the sides of the triangle and the cotangents of the halves of the three angles. Consider a triangle ABC, where a, b, and c are the lengths of the sides of the triangle.
The law of cotangents states that,
Where s is the semi-perimeter of the triangle ABC and r is its inradius of the inscribed circle of the triangle.
s = (a + b + c)/2
r =
Sample Problems
Problem 1: Find the value of cot θ if tan θ = 3/4.
Solution:
Given data, tan θ = 3/4
We know that, cot θ = 1/tan θ
⇒ cot θ = 1/(3/4) = 4/3
So, cot θ = 4/3
Problem 2: Find the value of cot α, sin α = 1/3, and cos α = 2√2/3.
Solution:
Given data, sin α = 1/3 and cos α = 2√2/3
We know that, cot α = cos α/sin α
⇒ cot α = (2√2/3) / (1/3) = 2√2
Hence, the value of cot α = 2√2
Problem 3: A boy standing 15 m from a tree is looking at a 30-degree angle to the top of the tree. What is the height of the tree?
Given data, the distance between the boy and the foot of the tree = 15 m and θ = 30°
Let the height of the tree be 'h'
We have, cot θ = adjacent side/opposite side
⇒ cot 30° = 15/h
⇒ √3 = 15/h [since, cot 30° = √3]
⇒ h = 15/√3
⇒ h = 5√3 m
Hence, the height of the tree = 5√3 m
Problem 4: Find the value of cot x if sec x = 6/5.
Solution:
Given data, sec x = 6/5
We have, sec2 x - tan2 x = 1
⇒ (6/5)2 - tan2 x = 1
⇒ 36/25 - tan2 x = 1
⇒ tan2 x = 36/25 - 1
⇒ tan2 x = 11/25
⇒ tan x = √(11/25) = √11/5
We know that, cot x = 1/tan x
⇒ cot x = 1/(√11/5) = 5/√11
Hence, cot x = 5/√11
Problem 5: Find the value of cot θ if cosec θ = 25/24.
Solution:
Given data, cosec θ = 25/24
We know that, cot θ = √(cosec2 - 1)
⇒ cot θ = √(25/24)2 - 1
⇒ cot θ =√(625 - 576)/576 = √49/576
⇒ cot θ = 7/24
Hence, the value of cot θ = 7/24
Problem 6: Find the value of cot β if sin β = 5/13.
Solution:
Given data, sin β = 5/13
We know that, sin2 β + cos2 β = 1
⇒ (5/13)2 + cos2 β = 1
⇒ cos2 β = 1 - (5/13)2 = 1 - 25/169 = 144/169
⇒ cos β = √144/169 = 12/13
cot β = cosβ/sin β
= (12/13) / (5/13)
⇒ cot β = 12/5
Hence, the value of cot β = 12/5
Problem 7: Using the law of cotangents, find the values of ∠A, ∠B, and ∠C (in degrees) if the lengths of the three sides of triangle ABC are a = 4 cm, b= 3 cm, and c= 3 cm.
