Question

A cylindrical bucket 28 cm in diameter and 72 cm height is full of water. The water is emptied into a rectangular vessel 66cm long and 28 cm wid Find the height of the water level in the tank.

• A. 20cm
• B. 30cm
• C. 24cm
• D. 35cm
• E. None of these

Answer 1

The Correct Option is C

The correct answer is option (C):

24cm

The correct answer is 24cm. Here's the explanation:

The problem involves two shapes: a cylinder (the bucket) and a rectangular vessel (the tank). The key concept here is that the volume of water remains constant when it is transferred from one container to another.

First, we need to calculate the volume of water in the cylindrical bucket. The formula for the volume of a cylinder is πr²h, where r is the radius, and h is the height.

* Diameter of the bucket = 28 cm, so the radius (r) = 28 cm / 2 = 14 cm
* Height of the bucket (h) = 72 cm
* Volume of water in the bucket = π * (14 cm)² * 72 cm ≈ 44352 cm³

Next, we know this water is poured into a rectangular vessel. The formula for the volume of a rectangular vessel is lwh (length * width * height). We know the length and width of the vessel, and we need to find the height (which is the water level).

* Length of the vessel (l) = 66 cm
* Width of the vessel (w) = 28 cm
* Let the height (water level) be 'h' cm

The volume of the water in the vessel is the same as the volume of the water in the bucket. Therefore:

Volume of water in vessel = Volume of water in bucket
66 cm * 28 cm * h = 44352 cm³

Now, we solve for 'h':

h = 44352 cm³ / (66 cm * 28 cm)
h ≈ 24 cm

Therefore, the height of the water level in the rectangular tank is approximately 24 cm.