\displaystyle{4}\times{5}-{10}-{2}{\left({1}-{2}\right)}+{5}={17} Explanation: Of course, \displaystyle-{2}\times{\left(-{2}\right)}=+{4}

For the rows, we want to come up with a function that will map \{0,1,2,3\} to 1, \{4,5,6,7\} to 2, and \{8,9,10,11\} to 3. This suggests that we use a floor function as follows: r=1+\lfloor n/4 \rfloor ...

This is a coincidence, and this is how it happened: Because of the miscalculation, we now found the inverse of 43 modulo 660. We found that 1=43\cdot307-660\cdot20. But coincidently, we have 660\cdot20=13200=600\cdot22 ...

Your questions: 1) This is not enough: it must be also that both sbgps. are normal in G 2) Because they're abelian, too. 3) Lots more, as anyone else...but not for this particular question, imo.

Forget about the condition m\leq n for the moment. Since 600=2^3\cdot 3^1\cdot 5^2 we have m=2^{\alpha_2}3^{\alpha_3}5^{\alpha_5},\quad n=2^{\beta_2}3^{\beta_3}5^{\beta_5} with \alpha_i, \beta_i\geq0 ...

They’re counting 3-card sets, not sequences of 3 cards. There are \binom42=6 pairs of cards that could be combined with the 1, so Quantity A is 6. There are \binom43=4 ways to choose 3 ...