There is an obvious solution x = 10. For x > 10 the derivative of the RHS is at least \log 10 > 1 so there are no solutions. For x \le 0 there are obviously no solutions. By the IVT there ...

\displaystyle{f{{\left({x}\right)}}}=-\frac{{2}}{{5}}{\left({10}\right)}^{{x}} Explanation: A point \displaystyle{\left({x},{y}\right)} when reflected across \displaystyle{x} -axis ...

You're on the right track. Note that the series for f(x) as given by \begin{align} f(x)&=\sum_{k=0}^\infty (1+x^2)^{-k}\\\\ &=\frac{1+x^2}{x^2} \end{align} converges if \frac{1}{1+x^2}<1. ...

As noticed we can't conclude for convergence when limit is \infty. To solve note that \frac{1}{(e^x-e^{-x})x^\frac{1}{3}}\sim \frac{1}{2x\cdot x^\frac{1}{3}}=\frac{1}{2x^\frac{4}{3}} which ...

Yes. More generally n bisections multiply the uncertainty by 2^{-n} = 10^{-\log_2 (10) \, n } \approx 10^{-0.3\, n } so give you about 0.3\,n more decimal digits of precision.

"Then by the pigeonhole principle, \{10^rx\}=\frac aq" is a non-sequitur. The principle says that among too many pigeons, two must be in the same hole, but it does not state thet two pigoens must be ...