Math, asked by ragidurgachary68, 1 year ago

the angle of elevation of the top of a build from the foot of the lower is 30 and the angle of elevation of the top of the lower from the foot of building is 60 is lower s is 30 m height and find the height ​

Answers

Answered by arpitsingh84
0

Answer:

Ans 10m hogaa

This will help u

Attachments:
Answered by BrainlyConqueror0901
1

\blue{\bold{\underline{\underline{Answer:}}}}

\green{\therefore{\text{Height\:of\:building=10\:m}}}\\

\orange{\bold{\underline{\underline{Step-by-step\:explanation:}}}}

• In the given question information given about the angle of elevation of the top of a building from the foot of a tower is 30° and the angle of elevation of the top of the tower from the foot of the building is 60°. If the tower height is 30 m.

• We have to Find the height of building.

 \green{\underline \bold{Given :}} \\ : \implies \text{Angle of elevation of top of a tower from the foot of the building= }60^{\circ} \\ \\ : \implies \text{Angle of elevation of the top of the building to foot of the tower =} 30^{\circ} \\\\ :\implies \text{Height of tower= 30 m}\\ \\ \red{\underline \bold{To \: Find:}} \\ : \implies \text{Height\:of\:building= ?}

• According to given question :

\text{Let\:Height\:of\:building\:be\:x}\\\\ \bold{In \: \triangle \: ABC} \\ : \implies tan\:\theta=\frac{\text{perpendicular}}{\text{base}}\\ \\ : \implies tan\:60^{\circ} = \frac{AB}{BC} \\ \\ : \implies \sqrt{3}=\frac{30}{BC}\\ \\ : \implies BC=\frac{30}{\sqrt{3}}\:m\\ \\ \bold{In\:\triangle\:DCB}\\ :\implies tan\:\theta=\frac{p}{b} \\\\ :\implies tan\:30^{\circ}=\frac{DC}{BC}\\\\ :\implies \frac{1}{\sqrt{3}}=\frac{\sqrt{3}DC}{30}\\\\ \green{:\implies DC=\frac{30}{3}}\\\\ \green{\therefore \text{height \: of \: building =10\:m}}

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