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| The Unknown Digits (Posted on 2006-04-18) |
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Determine the last six digits of the decimal number given by 7^(3^3002).
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Submitted by K Sengupta
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Rating: 5.0000 (1 votes)
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Solution:
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The required last six digits are 353607.
EXPLANATION:
We know that 7^4 = 2401.
Accordingly,
7^5000
= 2401^1250
=(1+2400)^1250
= 1 + 3*(10^6) + 44964*(10^8) +.........+(2400^1250) ( Expanding by Binomial Theorm)
= 1 + 1,000,000*U, where U is a positive integer.
= 1 (Mod 1,000,000); so that:
7^(5,000*M + N)
= 7^N ( Mod 1,000,000), where M and N are two positive integers, whether distinct or otherwise...............(#)
Now, 3^3000
= 9^1500
= (10-1)^1500
= 10^1500 - 1500*(10^1499)+ ...........-1500*10 + 1
= 5,000*R + 1, where R is a positive integer
Hence, 3^3002 = 5,000*M +9, where M = 9*R
Consequently,
7^(3^3002)
= 7^(5,000*M + 9)
= 7^9 ( Mod 1,000,000)( by (# ))
= 353,607( Mod 1,000,000)
Hence, the required last six digits are 353607.
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