A proof against past infinities, present (actual) infinities, and potential (future) infinities.
1.If individual A has an infinite amount of gold coins, and gives individual B every third gold coin, then individual A must have more gold coins, since he has 2/3rd's more.
2. Yet, individual B must have an equal amount as well. (Since there is a numerical equality between the first set of two in each set, and the next set of two, and the next, and each additional set of two, all the subsets of two within each set are paired, and therefore, both sets are equal.
3. Yet, individual A can not have more gold coins and an equal amount of gold coins in relation to those that individual B has.
4. Therefore, infinite series are logically impossible.
5. Therefore, past infinities, present infinities, and future infinities are logically impossible.
6. Therefore, eternal hell is logically impossible.
1.If individual A has an infinite amount of gold coins, and gives individual B every third gold coin, then individual A must have more gold coins, since he has 2/3rd's more.
2. Yet, individual B must have an equal amount as well. (Since there is a numerical equality between the first set of two in each set, and the next set of two, and the next, and each additional set of two, all the subsets of two within each set are paired, and therefore, both sets are equal.
3. Yet, individual A can not have more gold coins and an equal amount of gold coins in relation to those that individual B has.
4. Therefore, infinite series are logically impossible.
5. Therefore, past infinities, present infinities, and future infinities are logically impossible.
6. Therefore, eternal hell is logically impossible.