From the figure (2) given below, find the values of : (i) sin A (ii) cos A (iii) sin 2 A + cos 2 A (iv) sec 2 A - tan 2 A

In right-angled triangle ABC, By Pythagoras theorem, we get ⇒ AB 2 = AC 2 + BC 2 ⇒ AB 2 = (12) 2 + (5) 2 ⇒ AB 2 = 144 + 25 ⇒ AB 2 = 169 ⇒ AB = = 13 (i) sin A = = . Hence, sin A = . (ii) cos A = = . Hence, cos A = . (iii) Substituting values of sin A and cos A in sin 2 A + cos 2 A : ⇒ sin 2 A + cos 2 A = = = = 1. Hence, sin 2 A + cos 2 A = 1. (iv) sec 2 A - tan 2 A = = = = = 1. Hence, sec 2 A - tan 2 A = 1.

Mathematics

From the figure (2) given below, find the values of :
(i) sin A
(ii) cos A
(iii) sin² A + cos² A
(iv) sec² A - tan² A

Trigonometrical Ratios

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Answer

In right-angled triangle ABC,

By Pythagoras theorem, we get

⇒ AB² = AC² + BC²

⇒ AB² = (12)² + (5)²

⇒ AB² = 144 + 25

⇒ AB² = 169

⇒ AB = $\sqrt{169}$ = 13

(i) sin A = $\dfrac{\text{Perpendicular}}{\text{Hypotenuse}}$

= $\dfrac{BC}{AB} = \dfrac{5}{13}$ .

Hence, sin A = $\dfrac{5}{13}$ .

(ii) cos A = $\dfrac{\text{Base}}{\text{Hypotenuse}}$

= $\dfrac{AC}{AB} = \dfrac{12}{13}$ .

Hence, cos A = $\dfrac{12}{13}$ .

(iii) Substituting values of sin A and cos A in sin² A + cos² A :

⇒ sin² A + cos² A = $\Big(\dfrac{5}{13}\Big)^2 + \Big(\dfrac{12}{13}\Big)^2$

= $\dfrac{25}{169} + \dfrac{144}{169}$

= $\dfrac{169}{169}$ = 1.

Hence, sin² A + cos² A = 1.

(iv) sec² A - tan² A = $\Big(\dfrac{AB}{AC}\Big)^2 - \Big(\dfrac{BC}{AC}\Big)^2$

= $\Big(\dfrac{13}{12}\Big)^2 - \Big(\dfrac{5}{12}\Big)^2$

= $\dfrac{169}{144} - \dfrac{25}{144}$

= $\dfrac{144}{144}$ = 1.

Hence, sec² A - tan² A = 1.

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From the figure (2) given below, find the values of :
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Trigonometrical Ratios

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