I ran across the approximation
e ≈ 2721/1001
recently. What makes this remarkable is its accuracy relative to the size of the denominator.
You can create a trivial approximation just by truncating a decimal expansion
e ≈ 2718/1000
but this is only good to four significant figures, but 2721/1001 is good to seven, almost eight, significant figures.
e = 2.71828182… 2721/1001 = 2.71828171…
The comparison is more impressive in binary.
$ bc -l >>> obase=2 >>> 2721/1001 10.10110111111000010100… >>> e(1) 10.10110111111000010101…
The denominator is a 10-bit number but the approximation is accurate to 21 bits.