See a solution process below: Explanation: First, rewrite the expression as: \displaystyle\frac{{{8.6}\times{3.9}}}{{{3.6}\times{4.3}}}\times\frac{{{10}^{{-{{3}}}}\times{10}^{{-{{6}}}}}}{{{10}^{{-{{7}}}}\times{10}^{{-{{3}}}}}}\Rightarrow ...

\displaystyle{3.25411}\times{10}^{{-{{10}}}} Explanation: \displaystyle\frac{{{\left({9.52}\times{10}^{{4}}\right)}\times{\left({2.77}\times{10}^{{-{{5}}}}\right)}}}{{{\left({1.39}\times{10}^{{7}}\right)}\times{\left({5.83}\times{10}^{{2}}\right)}}} ...

You are right. You are basically using method 1) from my answer to Problem understanding the symmetry factor in a feynman diagram and you handled it like a champ. If you use method 2) from that same ...

You could use 8 \choose 6 instead of 8 \choose 2 just fine. They are equal. In general {n \choose r}={n \choose n-r} and your proof is a good one. For your second question, you should not use ...

a partial answer: \frac{5^3(5^2-1)^2(5^2-2^2)^2(5^2-3^2)(5^2-4^2)}{3^4 \times 5^3 \times 7^2 \times 9} may be re-written as \frac{\frac{9!}{0!}\frac{7!}{2!}\frac{5!}{4!}}{\frac{9!}{4!2^4}\frac{7!}{3!2^3}\frac{5!}{2!2^2}\frac{3!}{1!2^1}}

The problem lies in how you're calculating your error. We can estimate the error on a function f(x) where x has an error \Delta x as \Delta f = \lvert f(x+\Delta x)-f(x)\rvert. \tag{1} ...