smendyka Mar 6, 2018 The number of times a term is multiplied is the exponent you use. In this problem \displaystyle{4} is multiplied 6 times. Therefore: \displaystyle{4}\cdot{4}\cdot{4}\cdot{4}\cdot{4}\cdot{4}={4}^{{6}}

Hint: -1 \equiv 22!\equiv (22\cdot 21\cdot 20 \cdot 19) \cdot 18! \equiv (-1)\cdot (-2)\cdot (-3)\cdot (-4) \cdot 18! \bmod 23

We assume (as we are expected to) that the marbles are distinguishable. A.) There are \binom{4}{2} ways to choose the reds. For each of these ways, there are \binom{8}{3} ways to choose the blues, ...

2\cdot 4\cdot 6\cdot 8 \cdot \ldots \cdot (2k+2)~=~(2\cdot\underline1)(2\cdot\underline2)(2\cdot\underline3)(2\cdot\underline4)\ldots\big(2\cdot[k+1]\big)~=~2^{k+1}(k+1)!

There are 10 people at a party who form pairs to talk to each other, with everyone talking to someone else (so 5 pairs total). In how many different ways can the 10 people be talking? Your ...

As you noticed, P_n \to \frac{\pi}{2} since it's the inside of limit of the L.H.S of the Wallis Product Formula multiplied by 1 . Since continuous maps preserve limits, this implies \sqrt{2P_n} \to \sqrt{\pi} ...