MCQMediumJEE 2023Properties of Triangles

JEE Mathematics 2023 Question with Solution

The angle of elevation of the top PP of a tower from the feet of one person standing due South of the tower is 4545^\circ and from the feet of another person standing due West of the tower is 3030^\circ. If the height of the tower is 5meters5 \, \text{meters}, then the distance (in meters) between the two persons is equal to:

  • A

    1010

  • B

    555\sqrt{5}

  • C

    525\frac{5}{2}\sqrt{5}

  • D

    55

Answer

Correct answer:A

Step-by-step solution

Standard Method

Given: Height of the tower AB=5mAB = 5 \, \text{m}. The angle of elevation from one person is 4545^\circ and from the other person is 3030^\circ.

Find: The distance between the two persons, that is PQPQ.

In ABP\triangle ABP,

tan45=ABAP\tan 45^\circ = \frac{AB}{AP}

Since tan45=1\tan 45^\circ = 1,

1=5AP1 = \frac{5}{AP}

So,

AP=5mAP = 5 \, \text{m}

In ABQ\triangle ABQ,

tan30=ABAQ\tan 30^\circ = \frac{AB}{AQ}

Using tan30=13\tan 30^\circ = \frac{1}{\sqrt{3}},

13=5AQ\frac{1}{\sqrt{3}} = \frac{5}{AQ}

Hence,

AQ=53mAQ = 5\sqrt{3} \, \text{m}

Since one person is due South and the other is due West of the tower, APAQAP \perp AQ. Therefore, in APQ\triangle APQ,

PQ2=AP2+AQ2PQ^2 = AP^2 + AQ^2

Substituting the values,

PQ2=52+(53)2PQ^2 = 5^2 + (5\sqrt{3})^2 PQ2=25+75=100PQ^2 = 25 + 75 = 100

Thus,

PQ=100=10mPQ = \sqrt{100} = 10 \, \text{m}

Therefore, the distance between the two persons is 10m10 \, \text{m}. The correct option is A. The solution labels option B, but the working clearly gives 1010, which matches option A.

Coordinate Geometry View

Given: Tower height =5m= 5 \, \text{m}, one observer is due South and the other is due West.

Find: Distance between the two observers.

Let the foot of the tower be at the origin. Place the South observer at distance APAP along one axis and the West observer at distance AQAQ along the perpendicular axis.

From the first observer,

tan45=5AP\tan 45^\circ = \frac{5}{AP}

so

AP=5AP = 5

From the second observer,

tan30=5AQ\tan 30^\circ = \frac{5}{AQ}

so

AQ=53AQ = 5\sqrt{3}

The observers lie on perpendicular directions from the tower, so their separation is the diagonal of a right triangle:

PQ=AP2+AQ2PQ = \sqrt{AP^2 + AQ^2} =52+(53)2= \sqrt{5^2 + (5\sqrt{3})^2} =25+75= \sqrt{25 + 75} =100=10= \sqrt{100} = 10

Therefore, the required distance is 1010.

Common mistakes

  • Using sin\sin or cos\cos instead of tan\tan for the angle of elevation. Here the known side is the height and the required ground distance is the adjacent side, so tanθ=oppositeadjacent\tan \theta = \frac{\text{opposite}}{\text{adjacent}} is the correct relation.

  • Assuming the distance between the persons is AP+AQAP + AQ. This is wrong because the persons are due South and due West of the tower, so those ground distances are perpendicular. Use Pythagoras theorem to find PQPQ.

  • Trusting the solution-page option label without checking the algebra. The page says option B, but the worked value is 1010, which matches option A. Always verify the final computed value against the options.

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