An Exciting Challenge: Calculating Water Needed to Fill an Olympic-size Pool

How much water is needed to fill an olympic-size pool to an average depth of 4.8 ft?

The formula for the volume of a rectangular cuboid is:

V = l x w x h

Given parameters:

Length (l) = 50 m

Width (w) = 25 m

Height (h) = 4.8 ft = 1.463 m

Calculating the Water Needed

To calculate the volume of water needed to fill the olympic-size pool, we use the formula:

V = l x w x h

Plugging in the values:

l = 50 m, w = 25 m, h = 1.463 m

Calculate:

V = 50 x 25 x 1.463 = 1,828.75 m³

Since 1 m³ is equal to 264.17 gallons, the total water needed is:

V = 1,828.75 m³ x 264.17 gallons = 483,101 gallons

Embarking on the journey to fill an olympic-size pool can seem like a daunting task, but armed with the right calculations, you can conquer this challenge with ease. By using the formula for the volume of a rectangular cuboid, we determined that 483,101 gallons of water are needed to fill the pool to an average depth of 4.8 ft.

Imagine the excitement of seeing the sparkling water glisten in the sun, ready to welcome swimmers and create unforgettable memories. With each gallon poured into the pool, you are one step closer to transforming an empty space into a vibrant oasis of fun and relaxation.

So, dive into the calculations, embrace the challenge, and watch as the olympic-size pool is filled to perfection. The journey may be filled with numbers and formulas, but the end result will be worth every drop of water. Get ready to make a splash!

← How to calculate the speed of a second billiard ball after collision Two atoms with different mass number but the same atomic number are called →