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प्रश्न
We all have seen the airplanes flying in the sky but might have not thought of how they actually reach the correct destination. Air Traffic Control (ATC) is a service provided by ground-based air traffic controllers who direct aircraft on the ground and through a given section of controlled airspace, and can provide advisory services to aircraft in non-controlled airspace. Actually, all this air traffic is managed and regulated by using various concepts based on coordinate geometry and trigonometry.
At a given instance, ATC finds that the angle of elevation of an airplane from a point on the ground is 60°. After a flight of 30 seconds, it is observed that the angle of elevation changes to 30°. The height of the plane remains constantly as `3000sqrt(3)` m. Use the above information to answer the questions that follow-
- Draw a neat labelled figure to show the above situation diagrammatically.
- What is the distance travelled by the plane in 30 seconds?
OR
Keeping the height constant, during the above flight, it was observed that after `15(sqrt(3) - 1)` seconds, the angle of elevation changed to 45°. How much is the distance travelled in that duration. - What is the speed of the plane in km/hr.
उत्तर
i.
P and Q are the two positions of the plane flying at a height of `3000sqrt(3)` m. A is the point of observation.
ii. In ΔPAB, tan 60° = `(PB)/(AB)`
Or `sqrt(3) = (3000sqrt(3))/(AB)`
So AB = 3000 m
tan 30° = `(QC)/(AC)`
`1/sqrt(3) = (3000sqrt(3))/(AC)`
AC = 9000 m
Distance covered = 9000 – 3000
= 6000 m
OR
In ΔPAB, tan 60° = `(PB)/(AB)`
Or `sqrt(3) = (3000sqrt(3))/(AB)`
So AB = 3000 m
tan 45° = `(RD)/(AD)`
1 = `(3000sqrt(3))/(AD)`
AD = `3000sqrt(3)` m
Distance covered = `3000sqrt(3) - 3000`
= `3000(sqrt(3) -1)` m.
iii. Speed = `6000/30`
= 200 m/s
= `200 xx 3600/1000`
= 720 km/hr
Alternatively: speed = `(3000(sqrt(3) - 1))/(15(sqrt(3) - 1))`
= 200 m/s
= `200 xx 3600/1000`
= 720 km/hr
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