If , find the values of , , and .
Adding the three matrices on the left-hand side together gives
Equating the elements in the two matrices leads to the following equations:
These equations can now be solved simultaneously to find the values of , and .
First, solve the equation for .
Now, substitute this value of into the second equation and solve for .
Now, substitute the values of and into the third equation and solve for .
Therefore, the solution is , , and .