Consider the following sets:
A = natural numbers, written in blue ink
B = natural numbers, written in green ink
C = even numbers, written in green ink
Would it mean that C is smaller than B, but equal to A (which is equal to B)?
If the color of the number is considered to be an intrinsic property of the number, then under the Bruce Framework, yes, |C|<|B| and |C|=|A| and |B|=|A|.
Consider the following sets:
A = natural numbers, written in blue ink
B = natural numbers, written in green ink
C = even numbers, written in green ink
Would it mean that C is smaller than B, but equal to A (which is equal to B)?
If the color of the number is considered to be an intrinsic property of the number, then under the Bruce Framework, yes, |C|<|B| and |C|=|A| and |B|=|A|.