a) i) is correct. For a) ii), you're interested in the event that at least one house out of 10 had 4 boys born. You found that the probability of 4 boys is p=1/16, so the answer is then 1-(1-p)^{10} ...

Your solution to Hausdorffness is not quite correct. Note what happens if your points are \mathbf{x} = \langle 1 , 2, 3, \ldots \rangle and \mathbf{x^\prime} = \langle 3 , 3 , 3 , \ldots \rangle ...

Note: I am interpreting the problem to mean that the three winners must be different people. Unfortunately all three proposed solutions are incorrect. There are {300 \choose 3} subsets of size 3. ...

See sound will travel 340*4.5=1530m but in this time train will also travel some distance. original distance between hill and train back and forth is 1600m but sound was heard at 1530m from hill ...

Just add up the total working time and divide by the total time \frac {8.99\cdot 15+12\cdot 218}{60\cdot 84}\approx 54.58\% This is close to the second phase because the second phase is most of ...

Multiply numerator and denominator with \color{blue}{1+i} and simplify: \begin{align}\frac{(1+i)z+(3+i)}{(-1+i)z+(3-i)} & = \frac{3+z+i(z+1)}{3-z+i(z-1)}\color{blue}{\frac{1+i}{1+i}} \\[6pt] & = \cdots \\[6pt] & = \frac{2+2iz+4i}{4-2z+2i} \\[6pt] & = i\frac{ (2 - i) + z}{(2+i)-z} \end{align}