\displaystyle{12}{x}^{{3}}{y}^{{4}} Explanation: When you multiply numbers with variable terms, each term has to be multiplied by like terms. \displaystyle{3}{x}^{{2}}{y}\times{4}{x}{y}^{{3}} ...

First method : x^y.y^x = M => log (x^y.y^x) = log M => log (x^y) + log(y^x) = log M => y.log x + x.log y = log M => (dy/dx).log x + y/x + log y + x/y.(dy/dx) = 0 => (dy/dx).(log x + x/y) = - ...

Assessing the hypothesis that a and b are different is equivalent to testing the null hypothesis a - b = 0 (against the alternative that a-b\ne 0 ). The following analysis presumes it ...

This works. In fact, in general if you are looking at the pullback \lim D of D = (X \to * \gets Y) (where * is the terminal object in Sets), and \mathcal{P} denotes the power set functor, then ...

So you want to compute the sum \sum_{k=0}^n 100 a^k For a=1.3 Then, for any a\neq1, \sum_{k=0}^n 100 a^k=100\sum_{k=0}^n a^k=100\frac{a^{n+1}-1}{a-1} Have a look at: ...

If you're doing mathematics, usually you work with dimensionless quantities, so it makes no sense to try to do dimensional analysis.