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- If $D_n=\{\frac{k}{2^n}\mid k\in \{0,…,2^n\}\}$ and $D=\bigcup_{n\in\mathbb N}D_n$, why $\overline{D}=[0,1[$ and not $[0,1]$.
- Is it possible to solve a system of equations for the phase of complex exponentials
- let $f,g:\mathbb{I} \to \mathbb{I} $ continuous functions
- Poisson process detected with prohability p
- Gradient Descent: Cost Function
- Are we allowed to simplify the goal constraints in goal programming?
- Suppose $f(x)=g(\frac{1}{x})$ for $x\gt{0}$, and let $L\in{\mathbb{R}}$. Prove that $\lim_{x\to \infty}f(x)=L$ iff $\lim_{x\to 0^+}g(x)=L$.
- Proving an increasing of a continuous function
- Primitive function
- Functionally separated sets and partition of unity
- Conley index as a subset of an isolated invariant set
- Proving Equivalence Relations, Constructing and Defining Operations on Equivalence Classes
- Exercise on Counting rules
- Tail bounds for partial coupon collector process
- Sum of a series in $\mathbb{Z}^d$
- The augmented ideal of a commutative group ring $R\left< \sigma \right>$ is generated by $\sigma-1$.
- Distribution of the sum of conditional Bernoulli random variables
- Find Matrix T with respect to the basis beta
- Constructing a 2-periodic extension of the absolute value function using floor and ceiling functions
- Dividing two generating functions and finding the resulting polynomial

# I have some questions about deciphering an ancient language

2018-10-11 09:05:22

I’m very fascinated in learning new languages. I want to know:

It is possible to decipher and learn how to talk in a ancient language?

How to decipher at home any ancient language? Such as Ancient Chinese language. I want to learn how they used to speak and write, discover their meanings to each word and it’s grammatical. Practically, my wish is to bring back to life some forgotten ancient languages if it possible.

Hopefully, I have asked in a correct site.