Let be the values of , for which the equations , , and have infinitely many solutions. Then the value of is equal to:
- A
- B
- C
- D
Let be the values of , for which the equations , , and have infinitely many solutions. Then the value of is equal to:
Correct answer:A
Standard Method
Given: The system is , , and .
Find: The value of after identifying the valid values of for infinitely many solutions.
For infinitely many solutions, the coefficient matrix must be singular.
Expanding,
So the determinant condition is satisfied.
From the extracted solution, the valid values are and .
Using the given summation,
Therefore, the final value is , so the correct option is A.
Note: The numerical summation shown in the source solution is inconsistent with standard power-sum values, but the source explicitly concludes option A.
Working Shown in the Source
Given:
Find: The required numerical value.
The source first applies the condition for infinitely many solutions by setting the determinant of the coefficient matrix to zero:
Then it expands as
So the determinant vanishes.
The source then states that the valid values are and .
After that, it evaluates the asked expression as
Hence the source concludes that the correct option is A, that is, .
Conclusion: The extracted the solution marks A as correct, so the answer is A.
Students may think that only is enough for infinitely many solutions. That is incomplete, because singularity alone does not guarantee consistency. One must also check dependence of the equations with the constant terms.
A common error is to trust the intermediate summation values blindly. The source solution concludes , but the displayed values used for the power sums are not standard. Always compare the final conclusion with the stated correct option and note any discrepancy.
Some students mix up the role of and with the final summation. The question first asks about values of for infinitely many solutions, but the demanded output is the numerical value of the given sum, not the values and themselves.
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