Trigonometric Identities MCQ Quiz - Objective Question with Answer for Trigonometric Identities - Download Free PDF

Concept:

Solution:

Given:

If x, y, and z are the angles of a triangle and z = 135°

⇒ x + y + z = 180^o

⇒ x + y = 180^o - 135^o

⇒ x + y = 45o

⇒ tan (x + y) = tan (45o)

⇒ 

⇒ tan x + tan y = 1 - tan x tan y

Adding 1 both side,

⇒ 1 + tan x + tan y = 1 - tan x tan y + 1

⇒ 1 + tan x + tan y + tan x tan y =  2

⇒ 1 + tan x + tan y(1 + tan x) =  2

⇒ (1 + tan x) (1+ tan y) =  2

∴ The value of (1 + tan x) (1 + tan y) is 2

Calculation:

We can rewrite the terms as:

Using the standard trigonometric identities  and , we get:

Now, substitute the values:

Thus, we get:

Hence, the correct answer is Option 1.

Calculation: 

We know:

Simplifying:

∴ The correct answer is Option (2):

Calculation: 

We are given:

Use the identity

Rearrange the terms to form a quadratic equation:

Using the quadratic formula:

Since , we select

∴ The correct answer is Option (c):

Given:

3sin θ + 5cos θ = 5

Concept:

sin² θ + cos² θ = 1

a² + b² + 2ab = (a + b)²

a2 + b2 - 2ab = (a - b)2

Calculation:

Let 5sin θ - 3cos θ = x    ....(1)

And,

3sin θ + 5cos θ = 5       ....(2)

Squaring in both the equation:

9sin² θ + 25cos² θ + 30sin θ. cos θ= 25                     ....(3)

25sin2 θ + 9cos2 θ - 30sin θ. cos θ  = x²               .....(4)

From equation (3) and equation (4)

⇒ 34 (sin2 θ + cos2 θ) = 25 + x2

⇒ 9 = x2

x = 3 and -3

∴ 5sin θ - 3cos θ = 3

The correct option is 1 i.e. 3

Concept:

cosec² x – cot² x = 1

Calculation:

Given: p = cosec θ – cot θ and q = (cosec θ + cot θ)^-1

⇒ cosec θ + cot θ = 1/q

As we know that, cosec² x – cot² x = 1

⇒ (cosec θ + cot θ) × (cosec θ – cot θ) = 1

⇒ p = q

Concept:

sin² x + cos² x = 1

Calculation:

Given: sin θ + cos θ = 7/5 

By, squaring both sides of the above equation we get,

⇒ (sin θ + cos θ)² = 49/25

⇒ sin² θ + cos² θ + 2sin θ.cos θ = 49/25

As we know that, sin2 x + cos2 x = 1

⇒ 1 + 2sin θcos θ = 49/25

⇒ 2sin θcos θ = 24/25

∴ sin θcos θ = 12/25

Concept:

I. sec² θ – tan² θ = 1

II. a² – b² = (a - b) (a + b)

Calculation:

Given:

tan θ + sec θ = 4     ...(1)

As we know that, sec² θ – tan² θ = 1

⇒ sec² θ – tan² θ = 1

⇒ (sec θ – tan θ) (sec θ + tan θ) = 1

By substituting the value of tan θ + sec θ = 4, in the above equation, we get

⇒ sec θ – tan θ = 1/4     ... (2)

Adding equation (1) and (2), we get

⇒ 2 sec θ = 17/4

⇒ sec θ = 17/8

cos θ = 8/17

Mistake PointsIt is tan θ which is equal to 15/8. The above two equations that we solved were:

tan θ + sec θ = 4

sec θ – tan θ = 1/4

Concept:

a2 - b2 = (a - b) (a + b)

sec2 x - tan2 x = 1

Calculation:

sec4 x - tan4 x

=(sec2 x - tan2 x) (sec2 x + tan2 x)          (∵ a2 - b2 = (a - b) (a + b))

= 1 × (1 + tan2 x + tan2 x)                                          (∵ sec2 x - tan2 x = 1)

= 1 + 2tan² x

Formula used

sin2A + cos2A = 1

1/sin A = cosec A

1/cos A = sec A

Calculation

⇒ sin A (cos A + sin A)/cos A + cos A(sin A + cos A)/sin A

⇒ (sin A + cos A) [(sin A/cos A) + (cos A/sin A)]

⇒ (sin A + cos A) [(sin²A + cos²A)/(cos A. sin A)]

⇒ (sin A + cos A) [1/(cos A. sin A)] 

⇒ 

⇒ 1/cos A + 1/sin A

⇒ sec A + Cosec A

The answer is sec A + Cosec A.

Concept:

Trigonometry Formula

sec² θ = 1 + tan² θ

cosec2 θ = 1 + cot2 θ

cot θ = 

sec θ = 

cosec θ = 

Calculation:

= tan² θ - (-tan θ)²

= tan2 θ - tan2 θ 

= 0

Given:

 + 2sinθ cosθ 

Formula:

(a + b)² = a² + b² + 2ab

sin²θ + cos²θ = 1

Calculation:

 + 2sinθ cosθ 

⇒  × sin²θ +  × cos²θ + 2sinθ cosθ 

⇒  +  + 2sinθ cosθ

⇒  

⇒  = 

⇒  = cosecθ secθ ( = cosecθ,  = secθ) 

∴  + 2sinθ cosθ = cosecθ.secθ

Concept:

• cosec x = 1/sin x
• cot x = cos x/ sin x
• cos² x + sin²x = 1

Calculation:

Here we have to find the value of 

By rationalizing the expression  we get

∴ cosec x + cot x

Concept:

sec2 x - tan2 x = 1

Calculation:

Given sec x + tan x = 2     ....(i)

∵ sec² x - tan² x = 1

(sec x + tan x)(sec x - tan x) = 1

2(sec x - tan x) = 1

sec x - tan x =               ....(ii)

Adding the equation (i) and (ii)

2 sec x = 2 + 

cos x = 

Given:

√3 - 3√3tan2A = 3tan A - tan3A

Formula used:

tan 3A = (3tan A - tan3A)/(1 - 3tan²A)

Calculation:

√3 - 3√3tan2A = 3tan A - tan3A

⇒ √3(1 - 3tan2A) = 3tan A - tan3A

⇒ √3 = (3tan A - tan3A)/(1 - 3tan2A)

⇒ √3 = tan 3A 

⇒ tan 60° = tan 3A

⇒ 3A = 60° 

⇒ A = 60°/3 = 20° 

∴ The value of A is 20°.