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Double Triangle

Some Applications of Trigonometry - Concepts

Line of Sight Or Horizontal Level

Angle Of Elevation

Angle Of Depression

Double Triangle

Relation Between Altitude Base and Hypotenuse

Class - 10th CBSE Subjects

Concept Explanation

Double Triangle

DOUBLE TRIANGLE:

Let AB be a tower and B be its foot. On the horizontal line through B, take two points P and Q, Measure the length PQ.

Let PQ = a.

Let the angles of elevation of the top A of the tower as seen from P and Q be respectively $large alpha$ and $large beta$ $large (beta >alpha )$ , then $large angle APB=alpha ,angle AQB=beta$

Let AB = x, BQ = y

From right angled $large Delta ABP,tan alpha =frac{AB}{PB}=frac{x}{a+y}$

$large therefore a+y=xcot;alpha$

From right angled $large Delta ABQ,tan;beta =frac{AB}{BQ}=frac{x}{y}$

$large therefore ;y=x;cot;beta$ ...............(ii)

From equations (i) and (ii)

$large therefore ;a=x;cot;alpha -x;cot;beta$

$large Rightarrow ;x=frac{a}{cot;alpha -cot;beta }$

Also, $large y=x;cot;alpha -a$

$large Rightarrow ;y=frac{a;cot;alpha }{cot;alpha -cot;beta }-a;Rightarrow ;y=frac{a;cot;alpha -a(cot;alpha -cot;beta )}{cot;alpha -cot;beta };Rightarrow ;y=frac{a;cot;beta }{cot;alpha -cot;beta }$

In the above case , P and Q are on the same side of the tower.

If the two points are on the opposit sides of the tower then from the adjoining figure, we get

$large tan;alpha =frac{x}{PB}=x;cot;alpha ;;;and;;;tan;beta =frac{x}{BQ}or;BQ=x;cot;beta .$

$large therefore a=PB+BQ=x(cot;alpha +cot;beta )$

$large therefore x=frac{a}{cot;alpha +cot;beta }$

and $large y=BQ=x;cot;beta$

Sample Questions

(More Questions for each concept available in Login)

Question : 1

A flagstaff of height h is mouted on the top of a building. From a point on the ground, the angles of elevation of the foot and top of the flagstaff are $lambda$ and $beta$ respectively. If k is the height of the building, which of the following relationship is true?
A. $k tan lambda=(h+k)tanbeta$
B. $k cot lambda=(h+k)tanbeta$
C. $k tan lambda=(h+k )cotbeta$
D. $k cot lambda=(h+k)cotbeta$
Right Option : D
View Explanation

Chapters

Polynomial I

Polynomials II

Pair of Linear Equations I

Pair of Linear Equations II

Real Numbers I

Real Numbers II

Coordinate Geometry I

Coordinate Geometry II

Quadratic Equations I

Quadratic Equations II

Arithmetic Progression I

Arithmetic Progression II

Introduction to Trigonometry I

Introduction to Trigonometry II

Surface Area and Volume I

Surface Area and Volume II

Areas Related to Circles

Some Applications of Trigonometry

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Double Triangle

Double Triangle

Students / Parents Reviews [10]

Hiya Gupta

Om Umang

Manish Kumar

Eshan Arora

Aman Kumar Shrivastava

Yatharthi Sharma

Ayan Ghosh

Archit Segal

Barkha Arora

Shivam Rana