How do I solve this problem by using mixed strategy Nash equilibrium?
\begin{pmatrix} (2,0)& (1,1)&(4,2)\\ (3,4)&(1,2)&(2,3)\\ (1,3)&(0,2)&(3,0) \end{pmatrix}I tried to compute the expected value of every row, but I did not get a solution for the probabilities
It is quite clear that row strategy 1 dominates row strategy 3. Hence, row player will always pick up row1 as BR over row3. Now, eliminating row 3, the 2 by 3 matrix indicates that column 2 is dominated by column 3. This will reduce the matrix to the size of 2 by 2. Now you can calculate PSNE and MSNE