ML Aggarwal Trigonometric Identities Chapter Test Solutions ICSE Class-10 Maths Ch-18

ML Aggarwal Trigonometric Identities Chapter Test Solutions ICSE Class-10 Maths Ch-18. We Provide Step by Step Answer of Chapter Test Trigonometric Identities Questions for ICSE Class-10 APC Understanding Mathematics. Visit official Website CISCE for detail information about ICSE Board Class-10.

ML Aggarwal Trigonometric Identities Chapter Test Solutions ICSE Class-10 Maths Ch-18

Board	ICSE
Publications	Avichal Publishig Company (APC)
Subject	Maths
Class	10th
Chapter-18	Trigonometric Identities
Writer	ML Aggarwal
Book Name	Understanding
Topics	Solution of Chapter Test Questions
Edition	2022-2023

ML Aggarwal Trigonometric Identities Chapter Test Solutions

ICSE Class-10 Maths Ch-18

Page-460

Question 1.

(i) If θ is an acute angle and cosec θ = √5 find the value of cot θ – cos θ.
(ii) If θ is an acute angle and tan θ = 8/15, find the value of sec θ + cosec θ.

Answer :

(i) θ is an acute angle.

cosec θ = √5

sin θ = 1/√5

And, cos θ = √(1 – sin² θ)

cos θ = √(1 – (1/√5)²)

= √(1 – (1/5))

= √(4/5)

cos θ = 2/√5

Now, cot θ – cos θ = (cos θ/sin θ) – cos θ

(ii) Given, θ is an acute angle and tan θ = 8/15

In fig. we have

tan θ = BC/AB = 8/15

So, BC = 8 and AB = 15

By Pythagoras theorem, we have

AC = √(AB² + BC²) = √(5² + 8²) = √(25 + 64) = √289

⇒ AC = 17

Now,

sec θ = AC/AB = 17/15

cosec θ = AC/BC = 17/8

So,

sec θ + cosec θ = 17/15 + 17/8

= (136 + 255)/ 120

= 391/120

= 3.31/120

Question 2. Evaluate the following:

(i) 2 × (cos² 20° cos² 70°)/(sin² 25° + sin² 65°) – tan 45° + tan 13° tan 23° tan 30° tan 67° tan 77°

(ii) (sin²22° + sin²68°)/(cos²22° + cos²68°) + sin²63° + cos63° sin27°

Answer :

(i) 2 × (cos² 20° cos² 70°)/(sin² 25° + sin² 65°) – tan 45° + tan 13° tan 23° tan 30° tan 67° tan 77°

(ii) (sin²22° + sin²68°)/(cos²22° + cos²68°) + sin²63° + cos63° sin27°

Question 3. If 4/3 (sec2 59° – cot2 31°) – 2/2 sin 90° + 3tan2 56° tan2 34° = x/2, then find the value of x.

Answer :

Given:

4/3 (sec2 59° – cot2 31°) – 2/2 sin 90° + 3tan2 56° tan2 34° = x/2

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ML Aggarwal Trigonometric Identities Chapter Test Solutions

ICSE Class-10 Maths Ch-11

Page-461

Prove the following (4 to 11) identities, where the angles involved are acute angles for which the trigonometric ratios are defined:

Question 4.

(i) cosA/(1-sinA)+cosA/(1+sinA)=2secA
(ii) cosA/(cosecA+1)+ cosA/(cosecA-1)=2tanA

Answer :

(i) cosA/(1-sinA)+cosA/(1+sinA)=2secA
L.H.S = cosA/(1-sinA)+cosA/(1+sinA)

Question 5.

(i) sin² θ + cos⁴ θ = cos² θ + sin⁴ θ
(ii) cot θ/(cosec θ+1)+(cosec θ+1)/cot θ=2secθ

Answer :

(i) L.H.S. = sin² θ + cos⁴ θ = cos² θ + sin⁴ θ

L.H.S. = sin² θ + cos⁴ θ

= (1 – cos² θ) + cos⁴ θ

= cos⁴ θ – cos² θ + 1

= cos² θ (cos² θ – 1) + 1

= cos² θ (- sin² θ) + 1

= 1 – sin² θ cos² θ

Now,

R.H.S. = cos² θ + sin⁴ θ

= (1 – sin² θ) + sin⁴ θ

= sin⁴ θ – sin² θ + 1

= sin² θ (sin² θ – 1) + 1

= sin² θ (-cos² θ) + 1

= 1 – sin² θ cos² θ

Hence, L.H.S. = R.H.S.

(ii)

Question 6.

(i) sec⁴ A (1 – sin⁴ A) – 2 tan² A = 1
(ii) 1/(sinA+cosA+1)+1/(sinA+cosA-1) = secA+cosecA

Answer :

(i) sec⁴ A (1 – sin⁴ A) – 2 tan² A = 1

L.H.S = sec⁴ A (1 – sin⁴ A) – 2 tan² A

Question 7.

(i) (sin³θ+cos³θ)/sinθcosθ=1
(ii) (sec A – tan A)² (1 + sin A) = 1 – sin A.

Answer :

(i) (sin³θ+cos³θ)/sinθcosθ=1

L.H.S = (sin³θ+cos³θ)/sinθcosθ

Question 8.

(i) cosA/(1-tanA)-sin²A/(cosA-sinA) = sinA+cosA

(ii) (sec A – cosec A) (1 + tan A + cot A) = tan A sec A – cot A cosec A

(iii) tan²θ/(tan²θ-1)-cosec²θ/(sec²θ-cosec²θ) = 1/(sin²θ-cos²θ)

Answer :

(i) cosA/(1-tanA)-sin²A/(cosA-sinA) = sinA+cosA
L.H.S = cosA/(1-tanA)-sin²A/(cosA-sinA)

Question 9.

Answer 9

L.H.S

Question 10. 2 (sin⁶ θ + cos⁶ θ) – 3 (sin⁴ θ + cos⁴ θ) + 1 = θ

Answer :

2 (sin⁶ θ + cos⁶ θ) – 3 (sin⁴ θ + cos⁴ θ) + 1 = θ
L.H.S = 2 (sin⁶ θ + cos⁶ θ) – 3 (sin⁴ θ + cos⁴ θ) + 1

= 2 [(sin² θ)³ + (cos² θ)³] – 3 (sin⁴ θ + cos⁴ θ) + 1

= 2 [(sin² θ + cos² θ) (sin⁴ θ + cos⁴ θ – sin² θ cos² θ)] – 3 (sin⁴ θ + cos⁴ θ) + 1

= 2 (sin⁴ θ + cos⁴ θ – sin² θ cos² θ) – 3 (sin⁴ θ + cos⁴ θ) + 1

= 2 sin⁴ θ + 2 cos⁴ θ – 2 sin² θ cos² θ – 3 sin⁴ θ – 3 cos⁴ θ + 1

= 1 – sin⁴ θ – cos⁴ θ – 2 sin² θ cos² θ

= 1 – (sin² θ + cos² θ)² = 1 – 1 = 0

= R. H. S

Question 11. If cot θ + cos θ = m, cot θ – cos θ = n, then prove that (m² – n²)² = 16 mn.

Answer :

cot θ + cos θ = m…..(i)
cot θ – cos θ = n……(ii)
Adding (i)&(ii) we get

Question 12. When 0° < θ < 90°, solve the following equations:

(i) 2 cos² θ + sin θ – 2 = 0
(ii) 3 cos θ = 2 sin² θ
(iii) sec² θ – 2 tan θ = 0
(iv) tan² θ = 3 (sec θ – 1).

Answer :

0° < θ < 90°
(i) 2 cos² θ + sin θ – 2 = 0

⇒ 2 (1 – sin² θ) + sin θ – 2 = 0

⇒ 2 – 2 sin² θ + sin θ – 2 = 0

⇒ -2 sin² θ + sin θ = 0

⇒ sin θ (1 – 2 sin θ) = 0

So, either sin θ = 0 or 1 – 2 sin θ = 0

If sin θ = 0

⇒ θ = 0^o

And, if 1 – 2 sin θ = 0

sin θ = ½

⇒ θ = 30^o

Thus, θ = 0^o or 30^o

(ii) 3 cos θ = 2 sin² θ

⇒ 3 cos θ = 2 (1 – cos² θ)

⇒ 3 cos θ = 2 – 2 cos² θ

⇒ 2 cos² θ + 3 cos θ – 2 = 0

⇒ 2 cos² θ + 4 cos θ – cos θ – 2 = 0

⇒ 2 cos θ (cos θ + 2) – 1(cos θ + 2) = 0

⇒ (2 cos θ – 1) (cos θ + 2) = 0

So, either 2 cos θ – 1 = 0 or cos θ + 2 = 0

If 2 cos θ – 1 = 0

cos θ = ½

⇒ θ = 60^o

And, for cos θ + 2 = 0

⇒ cos θ = -2 which is not possible being out of range.

Thus, θ = 60^o

(iii) sec² θ – 2 tan θ = 0

⇒ (1 + tan² θ) – 2 tan θ = 0

⇒ tan² θ – 2 tan θ + 1 = 0

⇒ (tan θ – 1)² = 0

⇒ tan θ – 1 = 0

⇒ tan θ = 1

Thus, θ = 45^o

(iv) tan² θ = 3 (sec θ – 1)

⇒ (sec² θ – 1) = 3 sec θ – 3

⇒ sec² θ – 1 – 3 sec θ + 3 = 0

⇒ sec² θ – 3 sec θ + 2 = 0

⇒ sec² θ – 2 sec θ – sec θ + 2 = 0

⇒ sec θ (sec θ – 2) – 1 (sec θ = 2) = 0

⇒ (sec θ – 1) (sec θ – 2) = 0

So, either sec θ – 1 = 0 or sec θ – 2 = 0

If sec θ – 1 = 0

sec θ = 1

⇒ θ = 0^o

And, if sec θ – 2 = 0

sec θ = 2

⇒ θ = 60^o

Thus, θ = 0^o or 60^o

—  : End of ML Aggarwal Trigonometric Identities Chapter Test Solutions ICSE Class-10 Maths Ch-18 : –

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