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R.E.M. · Icarian Member

What is the lowest whole number (larger than 1) which is a factor of ((10^9^8^7^6^5^4^3^2^2002)+11)+(((10^9^8^7^6^5^4^3^2^2002)+11)x4)?

Orbiting · very ign-o-rable

erm...5?

-o-

groza528 · No Place Like Home

If it isn't 5 it's 3. I should be able to figure out for sure, give me a moment

groza528 · No Place Like Home

wait, I thought the ^ was *

Might take two moments

groza528 · No Place Like Home

The number will be 500000000...0055. So 3.

Orbiting · very ign-o-rable

bah @ intuitive math.
you are right.
-o-

Qball · In the Quorner Pocket

wow.... hint please?

CrystyB · Misunderstood Guy

Let N=9^8^7^6^5^4^3^2^2002. So x=(10^N+11)+((10^N+11)*4)=(10^N+11)*5. N is so unimaginable BIG that the 1 in front is very far away from the 11 in the end. So no overlapping, and since 3 divides anything whose sum of digits is (in this case 15) divisible by 3, there you have it.