Math, asked by ughmgee, 11 months ago

Please answer this math question asap!! 30 points and brainliest!!
BRAINLIEST ONLY IF YOU SHOW YOUR WORK!
MUST SHOW WORK!

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Answers

Answered by RvChaudharY50
18

Solution :-

in ∆DCB, we Have :-

→ Angle DCB = 62°

→ DB = EF = 80ft.

So,

→ Tan@ = Perpendicular / Base

→ Tan62° = DB/CD

→ CD = (80/Tan62°)

→ CD = (80/1.88)

→ CD = 42.536 ft.

___________________________

Now ,

in Rt.∆ADC we Have :-

→ CD = 42.536ft.

→ Angle ACD = 49°

So,

Again, Tan@ = Perpendicular / Base

→ Tan49° = AD/CD

→ AD = Tan49° * CD

→ AD = Tan49° * 42.536

→ AD = 1.15 * 42.536

→ AD = 48.916ft.

_____________________

So,,

==>> Height of Taller Building = AD + DB = 48.916 + 80 = 128.916 ft ≈ 129ft .

Hence, Height of Taller Building is 129ft.

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Answered by Anonymous
0

\Large{\underline{\underline{\bf{Solution :}}}}

Given :

Height of building (EA or BC) = 80 ft

Angle of elevation (1) = 49°

Angle of elevation (2) = 62°

__________________________

To Find :

We have to find the height of taller building (BD)

__________________________

Solution :

In ∆ BCE

\begin{lgathered}\sf{→tan \: 62^{\circ} = \frac{BC}{EC}} \\ \\ \sf{→EC = \frac{80}{tan \: 62^{\circ}}.....(1)}\end{lgathered}

\rule{150}{2}

Now, In ∆ DEC

\begin{lgathered}\sf{→tan \: 49^{\circ} = \frac{DC}{EC}} \\ \\ \sf{→EC = \frac{DC}{tan \: 49^{\circ}} .......(2)}\end{lgathered}

\rule{200}{2}

From equation (1) and (2).

\begin{lgathered}\sf{→\frac{80}{tan \: 62^{\circ}} = \frac{DC}{tan \: 49^{\circ}}} \\ \\ \sf{→DC = \frac{80}{tan \: 62^{\circ}} \times tan \: 49^{\circ}} \\ \\ \sf{→DC = \frac{80 \times 1.15037}{1.88073}} \\ \\ \sf{→DC =  49.04 \: ft}\end{lgathered}

\rule{150}{2}

Now,

Height of tower = BC + DC

→ BD = 80 + 49.04

→ BD = 129.04 ft

\large{\star{\boxed{\sf{Height \: of \: tower = 129 \: ft}}}}

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