\displaystyle{m}\le-{22.6} Explanation: First, add the terms on the right side of the inequality: \displaystyle-{11.6}\ge{\left({6.7}+{4.3}\right)}+{m} \displaystyle-{11.6}\ge{11}+{m} ...

\displaystyle\frac{{11}}{{14}}\ge{c}{>}-\frac{{3}}{{14}} Explanation: Add 2 to each part \displaystyle{\left(-{13}{c}+{9}{\left(+{2}\right)}\ \text{ }\ \ge\ \text{ }\ {c}-{2}{\left(+{2}\right)}\ \text{ }\ {>}\ \text{ }\ -{5}-{13}{c}{\left(+{2}\right)}\right)} ...

6.29 * 2 = 12.587.79 * 2 = 15.584.991.39 * 4 = 5.56 12.58 + 15.58 + 4.99 + 5.56 = 38.71 <-- total without tax\/tip38.71 * .06 = 2.32 <-- tax2.32 * 2 = 4.64 <-- tip 38.71 + 2.32 + 4.64 = 45.67 <-- ...

As a place-holder "answer" by the specs of this site/forum: the baseline situation is that many people have thought about RH for 150+ years. Stietljes thought he had a proof a few decades after ...

The elements of a proof are there. We reorganize them so that they are clearer. "The sequence (a_n) converges to 17" means that given any \epsilon \gt 0, there is an N such that for all n\ge N ...

Hint: use the fact that \phi is multiplicative and the fact that \phi(p^k)=p^k-p^{k-1} for any prime p and any positive integer k. You will see that you really only need to consider the ...