Since \gcd(2,9) = 1, we have from Euler's theorem, that 2^{\phi(9)} \equiv 1 \pmod{9} \implies 2^6 \equiv 1 \pmod{9} This gives us that 2^{2010} \equiv 1 \pmod9 \implies 2^{2015} \equiv 2^5 \pmod9 \equiv 5 \pmod9 ...

The basic idea was right, and a small modification is enough. Line up the people in some arbitrary order. There are, under the usual simplifying assumption that the year has 365 days, 365^{23} ...

Notice that this expression is in the form of: a^3+3ba^2+3b^2a+b^3 This is a form that you might see a lot in math problems like this, so you'll simply have to learn to recognize it, just like ...

Minor mistake in (b)(i)To get \frac14 of the original length, you need two bisections as you have stated in part (a). For part (b)(ii), copy AD n times. if n=3, copy it 3 times. The ...

1/6^12 1/6^18 6^5 6^12

If you start with a number less than 100, you can double it at least 4 times without exceeding 2012, so the answer must be a multiple of 2^4=16. The largest multiple of 16 less than 2013 ...