Let be a real matrix such that , where and are the identity and null matrices, respectively. If , where , , and are real constants, then is equal to:
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Let be a real matrix such that , where and are the identity and null matrices, respectively. If , where , , and are real constants, then is equal to:
Correct answer:A
Standard Method
Given:
Find: using the relation obtained for the higher power of .
From the given equation,
So,
Hence,
Now compute the next powers.
Substituting ,
Next,
Again substituting ,
Therefore,
So,
Therefore, the correct option is A.
The solution contains a notation mismatch: the question states , but the worked solution correctly uses . Using the worked solution gives .
Repeated Reduction Using the Polynomial Relation
Given:
Find: from the reduced form of .
The key idea is to repeatedly replace every occurrence of using
Then,
Now,
Thus,
Therefore, the correct option is A.
Using the relation for and stopping there is incorrect because the constants are obtained from the reduced form of the higher power used in the solution, namely . Reduce powers step-by-step until the required power is reached.
Expanding incorrectly is a common error. The correct expansion is , because distributing over gives .
While computing or , students often substitute incorrectly and combine like matrix terms wrongly. After substitution, collect the coefficients of , , and carefully before comparing with the required form.
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