\displaystyle{33}\frac{{3}}{{4}}\times{1}\frac{{4}}{{21}}\times\frac{{4}}{{5}}={32}\frac{{1}}{{7}} Explanation: Converting mixed numbers to improper fractions, \displaystyle{33}\frac{{3}}{{4}}\times{1}\frac{{4}}{{21}}\times\frac{{4}}{{5}}=\frac{{{33}\times{4}+{3}}}{{4}}\times\frac{{{1}\times{21}+{4}}}{{4}}\times\frac{{4}}{{5}} ...

Method 1 is universal, method 2 works only for dc. Method 2 is for DC supply, whereas the Method 1 is for AC supply.In AC circuit the Inductor (a coil) and a capacitor pose resistance which is ...

This probably is because we physically cannot have N<0. When we are talking about radioactive decay we need N>0. Therefore, we can omit the absolute value in the natural logarithm since we are not ...

Let's write the question out: \mathcal{P}(\text{Knows the answer}) = p \qquad \mathcal{P}(\text{Doesn't know the answer}) = 1-p And \mathcal{P}(\text{Correct} | \text{Knows the answer}) = 1; \;\mathcal{P}(\text{Wrong} | \text{Knows the answer}) = 0 ...

The case k=2^n can be proved using ordinary induction on n. The induction argument is structurally natural, and there is no reason to think that there is a smoother proof by strong induction. The ...

In the bivariate normal case (and given the zero-mean assumption and the unit variance of u_2 here) we have E(u_1 \mid u_2) = \rho\sigma_1u_2 Using the law of iterated expectations we can ...