1/10+2/100+3/1000+4/10000+5/100000+6/1000000+7/10000000+8/100000000 Final result : 6172839 ———————— = 0.12346 50000000 Step by step solution : Step  1  : 1 Simplify ———————— 12500000 Equation at the ...

In Deutsch's algorithm you prepare the qubits in the |01\rangle state, not |11\rangle. Because the initial condition is incorrect, everything follows will produce a different result. The correct ...

If I well remember the notation in rooth systems, I think the following equality will be useful for you. Let \alpha be \sum_{i=1}^lc_i\alpha_i. We have \langle\lambda,\alpha\rangle = (\lambda, \alpha^{\vee})=\frac{2(\lambda,\alpha)}{(\alpha,\alpha)}=\frac{2(\lambda,\sum_{i=1}^lc_i\alpha_i)}{(\alpha,\alpha)}= \sum_{i=1}^lc_i\frac{2(\lambda,\alpha_i)}{(\alpha,\alpha)}=\sum_{i=1}^lc_i\frac{(\alpha_i,\alpha_i)}{(\alpha,\alpha)}\frac{2(\lambda,\alpha_i)}{(\alpha_i,\alpha_i)}=\sum_{i=1}^lc_i\frac{(\alpha_i,\alpha_i)}{(\alpha,\alpha)}(\lambda,\alpha_i^{\vee})=\sum_{i=1}^lc_i\frac{(\alpha_i,\alpha_i)}{(\alpha,\alpha)}\langle\lambda,\alpha_i\rangle ...

The elementary estimate \frac{m}{n+m} < \sum_{k = 0}^{m-1} \frac{1}{n+k} < \frac{m}{n} for m > 1 (we have equality on the right for m = 1) gives \frac{1}{61} = \frac{33}{2013} < \sum_{k = 1980}^{2012} \frac{1}{k} < \frac{33}{1980} = \frac{1}{60}, ...

The moment generating function of Gamma(\alpha = 1, \lambda = \frac12) = \left( \frac1{1-t}\right)^\frac12, what you have written is the pdf. There is more than one method to solve the problem. ...

This is one of the standard ways to prove that the harmonic series diverges. HINT Find the general form of a_n. Prove that \dfrac1n > a_n Find \displaystyle \sum_{n=1}^{n=2^m-1} a_n From (2 ...