>>12477770>>the number of numbers there are, is the exact same thing as the numbers themselves up until the limit ordinal>in more detail?we have the number 1, it is equal to the number of numbers less than or equal to it
we have 2, equal to the number of numbers less than or equal to it
we have 3, equal to the number of numbers less than or equal to it
we have 4, equal to the number of numbers less than or equal to it
we have 5, equal to the number of numbers less than or equal to it
we have 6, equal to the number of numbers less than or equal to it
we have 7, equal to the number of numbers less than or equal to it
we have 8, equal to the number of numbers less than or equal to it
we have 9, equal to the number of numbers less than or equal to it
we have 10, equal to the number of numbers less than or equal to it
would you like me to continue?
>>if 10^10 is too big to be a number then there cannot be 10^10 numbers,>Correct>>so there must be finitely many numbers you are contradicting yourself>Doesn't follow. You made a mistake somewhere. If you give me the proof I can point it out.try to think really hard about this ok
if 10^10 is too big, then there cannot be 10^10 numbers, since thats too big
anything bigger than 10^10 also cannot work
so somewhere before 10^10 we run out of numbers