P(x> y)=\displaystyle\sum_{x=1}^{3}\sum_{y=0}^{x-1}\dfrac{x+y}{30}=\sum_{x=1}^{3}\dfrac{x\cdot x+\frac{\left ( x-1 \right )\cdot x}{2}}{30}=\sum_{x=1}^{3}\dfrac{3x^2-x}{60} P(x> y)=\displaystyle\frac{3\left ( 1^2+2^2+3^2 \right )-\left ( 1+2+3 \right )}{60}=\frac{3 \cdot 14 -6}{60}=\frac{36}{60}=0.6

\displaystyle\mu_{{x}}={1.5625} \displaystyle\mu_{{y}}={2.8125} \displaystyle{\sigma_{{x}}^{{2}}}={0.24609375} \displaystyle{\sigma_{{y}}^{{2}}}={1.15234375} \displaystyle\rho\approx-{0.0366766} ...

Use the upper bound for \displaystyle{x} and the lower bound for \displaystyle{y} . The answer is \displaystyle{6.47} as required. Explanation: When a number has been rounded to \displaystyle{1} ...

You have that -1<x<1\ \ \&\ \ -1<y<1 Therefore, x<1\ \&\ y<1 implies that x-1<0 and y-1<0. Thus (x-1)(y-1)>0\Rightarrow xy-x-y+1>0\Rightarrow \frac{x+y}{1+xy}<1. x>-1\ \&\ y>-1 ...

Using substitution, we can find that \displaystyle{x}={1} and \displaystyle{y}=-\frac{{5}}{{2}} . Explanation: Let's solve the second equation for one variable. We'll choose \displaystyle{x} ...

Let \Gamma be the black circle. From Euclid's theorem we have: \operatorname{pow}_{\Gamma}(E) = IE\cdot EK= FE\cdot EG = EH^2 = EL^2 but since L\in\Gamma, it follows that LE\perp EA as ...