I don't think the term \frac57\frac57\frac{10}{49} is right. \frac57\frac57 is the probability that both are greater than 1, but if that happens the probability that i<j is quite a bit bigger ...

Case 1: You need also to check whether (-3,0) satisfies all other conditions: from stationarity 8-6\gamma_1=0 \Leftrightarrow \gamma_1=\frac43\ge 0 OK and \gamma_2=0\ge 0 OK. Case 2: No ...

Let C = \sup \limits_{s,t \in [0,1]} \lvert k(s,t)\rvert. Note that for any f \in E we have \|K(f) \|_\infty = \sup_{s \in [0,1]} \big\lvert \int_0^1 k(s,t) f(t) dt \big\rvert. For any s \in [0,1] ...

(see figure 1 below) Let us rewrite the 3 line equations under the equivalent form : (L_1) \ \left\{ \begin{array}[ccc] .(2-z)y &=& zx \\ \ \ z& =& 0 \end{array} \right. , \ \ \ \ \ (L_2) \ \left\{ \begin{array}[rcc] .(2-z)y &= &zx \\ \ \ z& =& 1 \end{array} \right., \ \ \ \ \ (L_3) \ \left\{ \begin{array}[rcc] .(2-z)y& =& zx \\ \ \ z &=& 2 \end{array} \right. ...

Once you have a parameterization of the surface, you can then manipulate it to eliminate the parameters and get an implicit equation for the surface. This is always possible for a quadric. For ...

xf_1+yf_2+zf_3=0\implies xf_1\in(y,z)\implies f_1\in(y,z)\implies f_1=yg_1+zh_1, so y(xg_1+f_2)+z(xh_1+f_3)=0\implies xg_1+f_2=zf, xh_1+f_3=-yf. Then (f_1,f_2,f_3)=(y,-x,0)g_1+(-z,0,x)(-h_1)+(0,z,-y)f ...