Let $A$ and $B$ be real matrices, with $A+iB$ non-singular. I need to show that there exist a real number $t$ such that $ A+tB $ is non-singular.
I don't have any idea how I can approach this question... could I please get a hint?
Let $A$ and $B$ be real matrices, with $A+iB$ non-singular. I need to show that there exist a real number $t$ such that $ A+tB $ is non-singular.
I don't have any idea how I can approach this question... could I please get a hint?