Tiago Hands Apr 17, 2015 \displaystyle\frac{{2}}{{5}}\cdot\frac{{2}}{{3}}+\frac{{1}}{{5}}\div\frac{{2}}{{3}} \displaystyle=\frac{{4}}{{15}}+\frac{{1}}{{5}}\cdot\frac{{3}}{{2}} \displaystyle=\frac{{4}}{{15}}+\frac{{3}}{{10}} ...

Please look below. Explanation: \displaystyle{\left[-\frac{{1}}{{18}}+{\left(-\frac{{5}}{{12}}\times\frac{{4}}{{15}}\right)}\right]}\div\frac{{17}}{{30}} \displaystyle={\left[-\frac{{1}}{{18}}+{\left(\frac{{-{5}\times{4}}}{{{12}\times{15}}}\right)}\right]}\div\frac{{17}}{{30}} ...

\displaystyle-\frac{{3}}{{4}} Explanation: Solve in order of PEMDAS. Start inside the parentheses: \displaystyle{4}+{2}={6} \displaystyle{2}-{4}-{6}=-{8} (You go left to right on this ...

\displaystyle{\frac{{-{27}}}{{{40}}}} Explanation: \displaystyle-{\frac{{{3}}}{{{8}}}}-{\frac{{{4}}}{{{5}}}}\cdot{\frac{{{3}}}{{{10}}}}\div{\left(-{\frac{{{4}}}{{{5}}}}\right)} = \displaystyle-{\frac{{{3}}}{{{8}}}}-{\frac{{{4}}}{{{5}}}}\times{\frac{{{3}}}{{{10}}}}\times{\left(-{\frac{{{5}}}{{{4}}}}\right)} ...

Aside from your choice of uniform distribution for A_i, you are looking for \mathsf P(C\mid B) the probability that the third ball is white given that the first and second draws were white. \begin{align}\mathsf P(C\mid B) &= \dfrac{\mathsf P(B\cap C)}{\mathsf P(B)} \\[2ex] & =\dfrac{\sum_{i=3}^5 \mathsf P(A_i)\mathsf P(B\cap C\mid A_i)}{\sum_{j=2}^5 \mathsf P(A_j)\mathsf P(B\mid A_j)}\\[2ex] &= \dfrac{\sum_{i=3}^5\mathsf P(A_i)\binom i 3/\binom 53}{\sum_{j=2}^5\mathsf P(A_j)\binom j 2/\binom 52}\\[2ex] &= \dfrac{\sum_{i=3}^5\mathsf P(A_i)\binom i 3}{\sum_{j=2}^5\mathsf P(A_j)\binom j 2}\end{align} ...

You need to make an even 2\pi-periodic extension of the function f, that is, define \tilde{f} such that \tilde{f}(-x) = \tilde{f}(x) and \tilde{f}(x) = f(x) ~~~\mbox{for}~~ 0 < x < \pi ...