If is a complex number, then the number of common roots of the equations and is:
- A
- B
- C
- D
If is a complex number, then the number of common roots of the equations and is:
Correct answer:C
Using cube roots of unity
Given: We need the common roots of and .
Find: The number of values of satisfying both equations.
From , the roots are the non-real cube roots of unity, namely and , where and .
Now reduce the exponents modulo :
So for any root of , we get
But from the second equation,
Hence every root of also satisfies .
Therefore, both roots and are common roots. The number of common roots is .
The correct option is B.
Direct substitution of the two roots
The solution contains a mismatch: the question states the second equation as , while one part of the solution discusses a different equation . Using the question text and the consistent second approach in the solution gives the valid result.
If , then . Therefore,
So,
If , then
Hence,
Thus both roots of are common roots. So the number of common roots is . This does not match the answer key, but it is the defensible answer from the equations in the question.
Reducing the exponents incorrectly modulo . Since roots of satisfy with , powers must be reduced modulo before substitution.
Using the mismatched polynomial from the solution instead of the actual question. Always verify that the solution corresponds to the same equation appearing in the question.
Assuming the roots and make equal to or by treating both exponents as having the same remainder modulo . Here and , so the two terms are different.
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