The volume of the Grand Canyon is estimated to be around 4.17 trillion cubic meters. The volume of a penny is approximately 0.36 cubic centimeters. By converting the volume of the Grand Canyon to cubic centimeters, we can calculate that it would take around 11.58 trillion pennies to fill the Grand Canyon.
The Grand Canyon, located in Arizona, is one of largest natural wonders in America. It would take approximately 2500 cubic miles of dirt to fill the canyon up.
alot
What do you mean? YEs, there'd be enough fat in the world off people to fill the grand canyon...
the same amount of times you have sex with your mom
yes.
if you plan to waste decades of your life, then yes
You have no idea how many. like multiply all the asians in thwe world by like 20 billion and then ask yourself "is Lindsey really a blonde" who is currently sitting next to me, and then you gotta say no cuz shes only a dirty blond, and she doesnt want to admit it. oooh rite back to the question, well it would take 24,6879,937,457, 890, 789.576937597 cows to fill the grand canyon with milk.
The Grand Canyon started with a slow drip
Mashed potatoes
The sides of the canyon would always be crumbling into it, but as that would mean it was getting wider, it wouldn't fill up, just get more level. But presumably there's a stream/river at the bottom which caused the canyon in the first place and this is likely to continue the erosion.
Assuming an average bathtub has a volume of around 40-60 gallons, which is equivalent to 5,120-7,680 cups of water. A single cup can hold approximately 16 pennies, so the total number of pennies that can fill the average bathtub would be around 81,920-122,880 pennies. This calculation is based on the assumption that the pennies are stacked neatly and compactly without any gaps.
To estimate the volume that 30 pennies would fill, we can use the dimensions of a penny, which is approximately 1.9 cm in diameter and 0.15 cm in thickness. The volume of a single penny is about 0.36 cm³. Therefore, 30 pennies would have a total volume of approximately 10.8 cm³. This is a rough estimate, as actual packing and arrangement can affect the total volume occupied.