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Mathematics

From the given figure, find :

(i) cos x°

(ii) x°

(iii) 1tan2 x°1sin2 x°\dfrac{1}{\text{tan}^2 \text{ x°}} - \dfrac{1}{\text{sin}^2 \text{ x°}}

(iv) Use tan x°, to find the value of y.

From the given figure, find : Trigonometrical Ratios of Standard Angles, Concise Mathematics Solutions ICSE Class 9.

Trigonometric Identities

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Answer

(i) cos x°

cos x° = BaseHypotenuse\dfrac{Base}{Hypotenuse}

BaseHypotenuse=BCAC=1020=12\dfrac{Base}{Hypotenuse} = \dfrac{BC}{AC} = \dfrac{10}{20} = \dfrac{1}{2}

Hence, cos x° = 12\dfrac{1}{2}

(ii) x°

cos x° = 12\dfrac{1}{2}

cos x° = cos 60°

Hence, x° = 60°.

(iii)

1tan2 x°1sin2 x°=1tan2 60°1sin2 60°=1(3)21(32)2=13134=1343=143=33=1\dfrac{1}{\text{tan}^2 \text{ x°}} - \dfrac{1}{\text{sin}^2 \text{ x°}}\\[1em] = \dfrac{1}{\text{tan}^2 \text{ 60°}} - \dfrac{1}{\text{sin}^2 \text{ 60°}}\\[1em] = \dfrac{1}{(\sqrt3)^2} - \dfrac{1}{\Big(\dfrac{\sqrt3}{2}\Big)^2}\\[1em] = \dfrac{1}{3} - \dfrac{1}{\dfrac{3}{4}}\\[1em] = \dfrac{1}{3} - \dfrac{4}{3}\\[1em] = \dfrac{1 - 4}{3}\\[1em] = \dfrac{- 3}{3}\\[1em] = - 1

Hence, 1tan2 x°1sin2 x°\dfrac{1}{\text{tan}^2 \text{ x°}} - \dfrac{1}{\text{sin}^2 \text{ x°}} = -1.

(iv) tan x° = PerpendicularBase\dfrac{Perpendicular}{Base}

⇒ tan 60° = ABAC\dfrac{AB}{AC}

3=y10\sqrt3 = \dfrac{y}{10}

⇒ y = 10 3\sqrt3 = 17.32

Hence, y = 17.32 cm.

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