Back in July, Ben Terrett wrote a post about how many instances of the word “helvetica” set in unkerned 100 pt Helvetica it would take to go from the Earth to the Moon:
The distance to the moon is 385,000,000,000 mm. The size of an unkerned piece of normal cut Helvetica at 100pt is 136.23 mm. Therefore it would take 2,826,206,643.42 helveticas to get to the moon.
But let’s say you wanted to stretch one “helvetica” over the same distance…at what point size would you need to set it? The answer is 282.6 billion points. At that size, the “h” would be 44,600 miles tall, roughly 5.6 times as tall as the Earth. Here’s what that would look like:
The Earth is on the left and that little speck on the right side is the Moon. Here’s a close-up of the Earth and the “h”:
And if you wanted to put it yet another way, the Earth is set in 50.2 billion point type—Helvetically speaking—while the Moon is set in 13.7 billion point type. (thx, @brainpicker)