If M is a square matrix such that \( M^3 = M \), then how many values of |M| are possible ?
- A. One
- B. Two
- C. Three ✓
- D. Four
Correct Answer: C. Three
Explanation
Taking the determinant of both sides gives |M|^3 = |M|, which means |M|(|M|^2 - 1) = 0. This results in three possible values: 0, 1, and -1.
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