A fire in a building B...
A fire in a building B is reported on telephone to two fire stations P and Q, 20 km apart from each other on a straight road. P observes that the fire is at an angle of 60∘ to the road and Q observes that it is at an angle of 45∘ to the road. Which station should send its team and how much will this team have to travel?
Station P should send it's team because it will have to travel a distance of 7.3 km which is less than 12.7 km which the team of station Q would have to travel.
ReplyDeleteSo two right triangles are formed on both sides , P team having theta as 60 degrees while Q having theta as 45 degrees.Let the distance from P be x , so the distance from Q becomes 20-x as P and Q are 20 km apart as given in the question.Both triangles have common perpendicular .
ReplyDeleteFrom Team P perspective the perpendicular can be found by tan 60 = p/x == root 3* x=p
and from Team Q perspective the perpendicular tan 45= p/20-x == 20-x=p
So on equating for p, x= 20/root 3+1 == x=20/1.73+1== x=20/2.73== x=7.32 km
From P it is 7.32 km
While from Q =20-x ==20-7.32 = 12.68 km
Hence it is clear that Team P must be sent as it needs to cover a shorter distance that is 7.32 km instead of Team Q which has to travel a distance of 12.68 km .
Hence Team P will take lesser time.
(So two right triangles ....)
ReplyDelete~By Kriishh Gada
Two right triangles are formed where the angle from the Station P is 60 degrees and that from Station Q is 45 degrees.
ReplyDeleteLet the distance from station P be x km and that from station Q be (20-x) km since the distance between station Q and Station P is 20 km.
tan 60 = height of building/x km , therefore x root 3 =height of building _(1)
tan 45 = height of building/(20-x) km , therefore 20-x = height of building _(2)
From (1) and (2) ,
20-x = x root 3, therefore x=7.32 km and 20-x=12.68 km .
Therefore station P must send its team as it will take less time to reach the destination.
-By Somil Kashyap
Two right triangles are formed where the angle from the Station P is 60 degree and that from Station Q is 45 degree.
ReplyDeleteLet the distance from station P be x km
Let distance from station Q be (20-x) km since the distance between station Q and Station P is 20 km.(given)
tan 60 = height of building/x km
x root 3 =height of building ---------(1)
tan 45 = height of building/(20-x) km
therefore 20-x = height of building ------ (2)
From (1) and (2) ,
20-x = x root 3
thus x=7.32 km
20-x=12.68 km .
Therefore station P must send its team as it will take less time to reach the destination by 5.36 km
yuvika mahajan class 10 -g
ReplyDeleteBravo kids.
ReplyDeleteWe get two right angled triangles on a straight road which are 20km apart from each other.
ReplyDeleteLet the distance of station P =x km
Therefore the distance of station Q becomes (20-x) km.
tan 60 = height of building/x km
x root 3 =height of building →(1)
tan 45 = height of building/(20-x) km
therefore 20-x = height of building→(2)
Equating (1) and (2), we get:
20-x = x root 3
thus x=7.32 km
20-x=12.68 km .
Therefore station P must send its team as it will take less time to reach the destination by 5.36km
Sanjam Bedi
10-B