See a solution process below: Explanation: First, rewrite the two terms on the right as fractions: \displaystyle\frac{{3}}{{4}}\times{\left({2}+\frac{{1}}{{3}}\right)}\times\frac{{4}}{{1}}\Rightarrow ...

\displaystyle\frac{{1}}{{24}} Explanation: \displaystyle\frac{{a}}{{b}}\times\frac{{c}}{{d}}\times\frac{{e}}{{f}}=\frac{{{a}\times{c}\times{e}}}{{{b}\times{d}\times{f}}} \displaystyle\therefore\frac{{3}}{{4}}\times\frac{{4}}{{9}}\times\frac{{1}}{{8}}\Rightarrow\frac{{{3}\times{4}\times{1}}}{{{4}\times{9}\times{8}}} ...

Your calculations are perfectly correct, up until the numerical evaluation, which is wrong. You should get \frac{\sqrt3-1}{2} - \frac{\pi}{12} \approx 0.1042 , which is the correct answer. (The ...

(a) Both can be speaking the truth when they say "white", or (b) both may be specifically lying by saying "white" (1\;of\;5 possiblities) when it is not white. (a):Pr = \dfrac16\dfrac34\dfrac7{10} = \dfrac{21}{240}= \dfrac{35}{400} ...

If R is any commutative ring and I \subset R is an ideal, then M \otimes_R R/I \cong M/IM. Consider the short exact sequence of R-modules 0 \to I \to R \to R/I \to 0 and tensor with M over ...

Let q={a\over b} with 0< a<b (the cases q\in\{0,1\} are trivial). In order to obtain the ternary expansion of q with pencil and paper you integer-divide a:b and obtain 0. with remainder r_0=a\in[0\>..\>b'],\quad b':=b-1\ . ...