A person standing at a distance of 90 m ...

A person standing at a distance of 90 m from a church observes the angle of elevation of its top to be `45^(@)` . Find the height of the chruch .

Text Solution

Verified by Experts

The correct Answer is:

90 m

Topper's Solved these Questions

TRIGONOMETRY
TARGET PUBLICATION|Exercise Based on Practice Set 6.2|13 Videos
STATISTICS
TARGET PUBLICATION|Exercise Problem Set-6|5 Videos

Similar Questions

Explore conceptually related problems

A person is standing at a distance of 80 m from a church looking at its top. The angle of elevation is of 45^@ . Find the height of the church.

Solve the following question:(1) A person is stading at a distance of 80 m from a church looking at its top. The angle of elevation is of 45^@ . Find the height of the church.

A boy is at a distance of 60 m from a tree, makes an angle of elevation of 60^@ with the top of the tree. What is the height of the tree?

A boy standing at a distance of 48 meters from a building observes the top of the building and makes an angle of elevation of 30^@ . Find the height of the building.

An observer at a distance of 10 m from a tree looks at the top of the tree , the angle of elevation is 60^(@) . What is the height of the tree ? ( sqrt(3) = 1 .73 )

A person standing on the bank of a river observes that the angle of elevation of the top of a tree standing on the opposite bank is 60^(@) . When he moves 40 m away from the bank, he finds the angle of elevation to be 30^(@) . Find the height of the tree and the width of the river. (sqrt3=1.73)

A person observed the angle of elevation of the top of a tower as 30^@ . He walked 50m towards the foot of the tower along level ground and found the angle of elevation of the top of the tower as 60^@ . Find the height of the tower.

Two buildings are in front of each other on either side of a road of width 10 metres. From the top of the first building which is 30 metres high, the angle of elevation to the top of the second is 45^(@) . What is the height of the second building?

Two buildings are in front of each other on a road of width 15 meters. From the top of the first building, having a height of 12 meters, the angle of elevation of the top of the second building is 30^@ . What is the height of the second building?

TARGET PUBLICATION-TRIGONOMETRY -Chapter Assessment

cot 60^(@) =
Text Solution
|
tantheta . Cot theta =
Text Solution
|
When we see at a lower level , from the horizontal line , angle formed...
Text Solution
|
If the distance of a point from the tower is equal to the height of th...
Text Solution
|
If cosec theta = (13)/(12) , then find the values of cot theta and sin...
Text Solution
|
Prove the identity sin^(2)theta + cos^(2) theta = 1 with the help of g...
Text Solution
|
A person standing at a distance of 90 m from a church observes the ang...
Text Solution
|
(tantheta + sintheta)/(tantheta - sintheta) =(sectheta + 1 )/ (secthe...
Text Solution
|
If cos theta + (1)/(cos theta) = 4 , then prove that cos^(2) theta + ...
Text Solution
|
Prove that : sec^(6)x - tan^(6)x = 1 + 3sec^(2)x xx tan^(2)x
Text Solution
|
A tree breaks due to storm and the broken part bends, so that the top...
Text Solution
|
Two buildings are in front of each other on a road of width 15 metres....
Text Solution
|
If tan theta = 1 then find the vlue of (sin theta + cos theta)/(sec th...
Text Solution
|
A straight highway leads to the foot of a tower. A man standing at t...
Text Solution
|
If sec theta+tan theta =p then prove that (p^2-1)/(p^2+1)=sin theta
Text Solution
|
If 3 tan^(2)theta - 4sqrt(3)tan theta + 3 = 0, find the acute angle th...
Text Solution
|
Eliminate theta if x=a cot theta -b cosec theta and y=acot theta+b cos...
Text Solution
|