Sample Problems on Six Trigonometric Functions

Problem 1: Evaluate sine, cosine, and tangent in the following figure.

Solution: 

Given,

• P = 3
• B = 4
• H = 5

Using the trigonometric formulas for sine, cosine and tangent,

[Tex]sin\theta=\frac{P}{H}=\frac{3}{5}[/Tex]

[Tex]cos\theta=\frac{B}{H}=\frac{4}{5}[/Tex]

[Tex]tan\theta=\frac{P}{B}=\frac{3}{4}[/Tex]

Problem 2: In the same triangle evaluate secant, cosecant, and cotangent. 

Solution: 

As it is known the values of sine, cosine and tangent, we can easily calculate the required ratios.

[Tex]cosec\theta=\frac{1}{sin\theta}=\frac{5}{3}[/Tex]

[Tex]sec\theta=\frac{1}{cos\theta}=\frac{5}{4}[/Tex]

[Tex]cot\theta=\frac{1}{tan\theta}=\frac{4}{3}[/Tex]

Problem 3: Given [Tex]tan\theta=\frac{6}{8}[/Tex], evaluate sin θ.cos θ.

Solution: 

[Tex]tan\theta=\frac{P}{B}[/Tex]

Thus P = 6, B = 8

Using Pythagoras theorem,

H² = P² + B²

H²= 36 + 64 = 100

Therefore, H =10

Now, [Tex]sin\theta= \frac{6}{10}[/Tex]

[Tex]cos\theta=\frac{8}{10}[/Tex]

Problem 4: If [Tex]cot\theta = \frac{12}{13}[/Tex], evaluate tan²θ.

Solution: 

Given [Tex]cot\theta=\frac{12}{13}[/Tex]

Thus [Tex]tan\theta=\frac{1}{cot\theta}=\frac{13}{12}[/Tex]

[Tex]\therefore tan^2\theta=\frac{169}{144}[/Tex]

Problem 5: In the given triangle, verify sin²θ + cos²θ = 1

Solution: 

Given,

• P = 12
• B = 5
• H = 13

Thus [Tex]sin\theta=\frac{12}{13}[/Tex]

[Tex]cos\theta=\frac{5}{13}[/Tex]

[Tex]sin^2\theta=144/169[/Tex]

[Tex]cos^2\theta=25/169[/Tex]

[Tex]sin^2\theta+cos^2\theta=\frac{169}{169}=1[/Tex]

Hence verified.

Trigonometry can be defined as the branch of mathematics that determines and studies the relationships between the sides of a triangle and the angles subtended by them. Trigonometry is used in the case of right-angled triangles. Trigonometric functions define the relationships between the 3 sides and the angles of a triangle. There are 6 trigonometric functions mainly.

Before going into the study of the trigonometric functions we will learn about the 3 sides of a right-angled triangle.

The three sides of a right-angled triangle are as follows,

• Base: The side(RQ) on which the angle θ lies is known as the base.

• Perpendicular: It is the side(PQ) opposite to the angle θ  in consideration.

• Hypotenuse: It is the longest side(PR) in a right-angled triangle and opposite to the 90° angle.