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If tan x°=512\text{tan x°} = \dfrac{5}{12}, tan y°=34\text{tan y°} = \dfrac{3}{4} and AB = 48 m; find the length of CD.

If tan x° = 5/12, tan y° = 3/4 and AB = 48 m; find the length of CD. Solution of Right Triangles, Concise Mathematics Solutions ICSE Class 9.

Trigonometric Identities

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Answer

Given:

tan x°=512\text{tan x°} = \dfrac{5}{12}, tan y°=34\text{tan y°} = \dfrac{3}{4} and AB = 48 m

Let BC be x m.

AC = AB + BC = (48 + x) m.

In Δ ADC,

tan x°=PerpendicularBase512=DCAC512=DC48+x12 CD = 240 + 5x................(1)\text{tan x°} = \dfrac{Perpendicular}{Base}\\[1em] ⇒ \dfrac{5}{12} = \dfrac{DC}{AC}\\[1em] ⇒ \dfrac{5}{12} = \dfrac{DC}{48 + x}\\[1em] ⇒ \text{12 CD = 240 + 5x} …………….(1)

And, in Δ BDC,

tan y°=PerpendicularBase34=DCBC34=DCx4CD=3xx=4CD3................(2)\text{tan y°} = \dfrac{Perpendicular}{Base}\\[1em] ⇒ \dfrac{3}{4} = \dfrac{DC}{BC}\\[1em] ⇒ \dfrac{3}{4} = \dfrac{DC}{x}\\[1em] ⇒ 4 CD = 3x \\[1em] ⇒ x = \dfrac{4 CD}{3}…………….(2)

From equation (1),

240 + 5 ×4CD3\times \dfrac{4CD}{3} = 12 CD

⇒ 240 + 20CD3\dfrac{20CD}{3} = 12 CD

⇒ 720 + 20 CD = 36 CD

⇒ 720 = 36 CD - 20 CD

⇒ 16 CD = 720

⇒ CD = 72016\dfrac{720}{16}

⇒ CD = 45

Hence, CD = 45 m.

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