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Two beetles sit at the top edge of a house roof. The roof has two faces. The first face is such that the horizontal shift by 3cm along this face means 2cm shift vertically. Simultaneously, the beetles start moving downwards, the first beetle by the first face, the second - by the second face of the roof. First beetle moves twice as fast as the second beetle. Find the altitude of the first beetle above the second beetle when they will be 72 cm apart horizontally, if the second face of the roof

has the same incline as the first face or is perpendicular to the base

User Lua
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1 Answer

15 votes
15 votes

Answer:

(a) -16 cm

(b) 12(√13-4) ≈ -4.733 cm

Explanation:

You want to know the vertical distance Beetle 1 is above Beetle 2 at the time they are 72 cm apart horizontally when (a) they move downslope in opposite directions on a roof with slope ±2/3, and (b) Beetle 2 is on a vertical slope. Beetle 1 travels twice as fast as Beetle 2.

A Same incline

In the time it takes Beetle 2 to move 3 cm horizontally, it has moved 2 cm down. In the same time, Beetle 1 has moved 6 cm horizontally, and 4 cm down. That is Beetle 2 remains above Beetle 1 by 2 cm for each 9 cm they have of horizontal separation.

When their horizontal separation is 8(9 cm) = 72 cm, the height from Beetle 1 to Beetle 2 is 8(-2 cm) = -16 cm.

B Vertical incline

Suppose it takes 1 unit of time for Beetle 1 to travel downslope so its separation from Beetle 2 is 3 cm horizontally. It will have traveled 3 cm horizontally, so a total distance of √(3² +2²) = √13 cm. After 24 units of time, it has separated from Beetle 2 by 72 cm horizontally, and will have traveled ...

24√13 = 24√13 . . . . . down slope

Of course, it will have traveled down a vertical distance of 24·2 = 48 cm.

Meanwhile, Beetle 2 will have traveled half as far, but in the downward direction. It will be (24√13)/2 = 12√13 cm below the starting position.

The difference in height from Beetle 1 to Beetle 2 is ...

(-48 cm) -(-12√13 cm) = 12(√13 -4) cm ≈ -4.733 cm

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Additional comment

The question asks for the altitude Beetle 1 is above Beetle 2. In both cases, Beetle 1 is below Beetle 2, so that altitude is negative.

The first two attachments show the geometry of the problem. The last attachment shows a way the altitude can be calculated using complex numbers.

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Two beetles sit at the top edge of a house roof. The roof has two faces. The first-example-1
Two beetles sit at the top edge of a house roof. The roof has two faces. The first-example-2
Two beetles sit at the top edge of a house roof. The roof has two faces. The first-example-3
User Calvintwr
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