\displaystyle{26},{082} Explanation: Multiply and divide straight across. 1. \displaystyle{2}\cdot{9}={18} 2. \displaystyle{18}\cdot{161}={2},{898} 3. \displaystyle{2},{898}\cdot{27}={78},{246} ...

I/2*3/4*5/6*8/7 Method 1: Rearranged:- 1*3*5*8/2*4*6*7 => 120/336 Both numbers are divided by 12 =>60/168 ( Divide by 2) => 30/84 (Divided by 2) =>  15/42 ( Divided by 3) => 5/14 Method 2: ...

\displaystyle{3},{021},{419.885} Explanation: It often makes simplifying easier if you break the numbers down into the factors first. \displaystyle\frac{{{65}\times{5}\times{42}\times{542}\times{58}\times{556}}}{{{78},{963}}} ...

Here's an easy way to tell that something must be wrong with your proof: what sort of assumptions on f does it use? Your proof doesn't assume anything about f, so - if it were valid - would ...

Hint: If n is even, \begin{align} \sum_{i=1}^n (-1)^{i+1} i(i+1) &= 1(2)-(2)(3)+(3)(4)-4(5)+\ldots+(n-1)(n)-n(n+1) \\ &=2(1-3)+4(3-5)+\ldots+n(n-1-n-1)\\ &=(-2)(2+4+\ldots n)\\ &=(-4)\left(1+2 + ...

The probability of obtaining two colours twice each is \frac{4\times3\times3}{4^4}=\frac{9}{64} (pick the colour which occurs first; pick another place for the same colour; pick the remaining ...