Manish Bhardwaj Oct 1, 2014 The values of x and y are given to you, put the values of x and y in the above expression; \displaystyle\frac{{{3}{x}+{x}}}{{4}} \displaystyle\frac{{{3}.{4}+{4}}}{{2}} ...

\displaystyle{\left({y}=\frac{{{b}{x}}}{{R}}\right.} Explanation: \displaystyle\frac{{{b}{x}}}{{{y}}}={R} We isolate \displaystyle{\left({y}\right.} \displaystyle\frac{{{b}{x}}}{{R}}={y} ...

Your attempts are right for P(XY\leq 3)=P(1,1)+P(1,2)+P(2,1)=\frac{1}{2} and P(X+Y>2)=P(1,2)=P(2,1)+P(2,2)=\frac{7}{8} To calculate P(X/Y>1) , think about what combination of X and Y give ...

Yes, your property is true : \pi_1(X,x) acts transitively on p^{-1}(x) : First, assume that Y is path connected : let y,y'\in p^{-1}(x), you can find a path \gamma:y\rightsquigarrow y'. ...

First, when X,Y are uniform on [0,1]: the probability that the first base-10 digit of X/Y equals 1 is the sum of the areas of infinitely many triangles, cut out of the unit square [0,1]^2 by ...

Your answers are fine. The chain rule gives us \frac{\partial}{\partial x} f(g(x,y)) = f'(g(x,y))\cdot \frac{\partial g}{\partial x} The only real work is the second piece. In calculating \frac{\partial g}{\partial x} ...