If satisfies and , where , then is equal to:
- A
- B
- C
- D
If satisfies and , where , then is equal to:
Correct answer:A
Standard Method
Given: satisfies .
Find: Express as and compute .
From , the roots are the non-real cube roots of unity. So we may take where and .
Using ,
Since , we have , so . Therefore,
Now from , we get . Hence,
Identify Coefficients
Comparing with for ,
Therefore,
So the correct option is A.
The solution lists the final value as , even though the answer key is inconsistent.
Treating as an arbitrary complex number instead of a cube root of unity is incorrect. From , we must use the root-of-unity relation .
Reducing powers incorrectly is a common error. Since , powers must be reduced modulo , so , not or .
After obtaining , stopping there is incomplete. It must be rewritten using as to match the form .
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