Microsoft Math Solver

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 ...

Don't multiply equations by 2: as 2 is not coprime to 8 you're not getting equivalent equations. One way: given: \begin{align}3x+7y\equiv 2 \pmod 8\\4x+5y\equiv 7\pmod 8\end{align} Take away ...

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] ...

Hint: The Frobenius norm of an m \times n matrix A is defined as the square root of the sum of the absolute squares of its elements. Example: Consider matrix A = \left( \begin{array}{ccc} ~~~~1 & -2 & ~~~~~~3 \\ -4 & ~~5 & ~-6 \\ ~~~7 & -8 & ~~~~~~9 \\ \end{array} \right) ...

Suppose z = w this will maximize zw (relative to xy) z = w = \frac {x+y}{2} zw = \frac {x^2 + y^2 + 2xy}{4} = 2xy\\ x^2 + y^2 - 6xy = 0 divide through by y (\frac {x}{y})^2 - 6\frac {x}{y} + 1 = 0 ...

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 ...