If $A$ is a square matrix such that $A^{2} = A$, then $(I + A)^{3} - 7A$ will be:
Show Hint
- $A$
- $I - A$
- $I$
- $3A$
The Correct Option is C
Solution and Explanation
Step 1: Expand $(I+A)^{3$.}
\[
(I + A)^{3} = I^{3} + 3I^{2}A + 3IA^{2} + A^{3}
\]
\[
= I + 3A + 3A^{2} + A^{3}
\]
Step 2: Use the condition $A^{2 = A$.}
Since $A^{2} = A$,
\[
A^{3} = A \cdot A^{2} = A \cdot A = A
\]
So,
\[
(I + A)^{3} = I + 3A + 3A + A = I + 7A
\]
Step 3: Simplify expression.
\[
(I + A)^{3} - 7A = (I + 7A) - 7A = I
\]
Step 4: Conclusion.
The correct answer is (C) $I$.
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