Before we prove the given identity proof this idenity \log_b a\log_c b=\log_c a Proof: Implement the formula \log_a b=\frac{\log_x b}{\log_x a} \frac{\log a}{\log b}\cdot\frac{\log b}{\log c}=\frac{\log a}{\log c}=\log_c a ...

Konstantinos Michailidis May 16, 2016 It is \displaystyle{{\log}_{{5}}{7}}\cdot{{\log}_{{7}}{8}}\cdot{{\log}_{{8}}{625}}=\frac{{\log{{7}}}}{{\log{{5}}}}\cdot\frac{{\log{{8}}}}{{\log{{7}}}}\cdot\frac{{\log{{625}}}}{{\log{{8}}}}=\frac{\cancel{{\log{{7}}}}}{{\log{{5}}}}\cdot\frac{\cancel{{\log{{8}}}}}{\cancel{{\log{{7}}}}}\cdot\frac{{\log{{625}}}}{\cancel{{\log{{8}}}}}=\frac{{\log{{625}}}}{{\log{{5}}}}=\frac{{\log{{5}}}^{{4}}}{{\log{{5}}}}=\frac{{{4}\cdot{\log{{5}}}}}{{\log{{5}}}}={4}

Each piano key sounds almost 6% higher than the previous one. After how many keys is the frequency eight times higher than the initial tone? A mathematician (without any knowledge of music) would ...

Since \ln a and \ln x are negative- we can solve via the complex logarithm: \ln(r\cdot e^{i\theta})=\ln r+i\theta Trick: e^{i\pi}=-1 Hence: \ln(-r)= \ln r+i\pi For better ...

If a number n has k digits, then 10^{k-1}\leq n <10^k. Taking (base-10) logs gives k-1 \leq \log n < k, so \mbox{floor}(\log n)+1 = k. By rules of logs, we have \log N! = \log 1+\log 2 + \cdots + \log N. ...

I'm fairly sure you've done nothing wrong. As you realized, we can get GOEL=10^4 by adding the equations together. Now using AM-GM we have. \frac{3G+2L+2O+E}{4} \geq (12 \cdot GOEL)^\frac{1}{4}=(3^{\frac{1}{4}} \cdot 2^{3/2} \cdot 5^1) ...