- #1
Loren Booda
- 3,125
- 4
Some speculation:
Given that irrational numbers can be grouped in products of 2, 3...or N-->oo members, the products themselves being irrational,
and
given that irrational numbers can be grouped in products of 2, 3...or N-->oo members, the products themselves being rational,
it would seem that the product of all irrationals would be both irrational and rational, something like the limiting value of the sine function.
What do you think?
Given that irrational numbers can be grouped in products of 2, 3...or N-->oo members, the products themselves being irrational,
and
given that irrational numbers can be grouped in products of 2, 3...or N-->oo members, the products themselves being rational,
it would seem that the product of all irrationals would be both irrational and rational, something like the limiting value of the sine function.
What do you think?