A quantity is formulated as . , , and are independent parameters which have fractional errors of , , and , respectively in measurement. The maximum fractional error of is:
- A
- B
- C
- D
A quantity is formulated as . , , and are independent parameters which have fractional errors of , , and , respectively in measurement. The maximum fractional error of is:
Correct answer:D
the solution unavailable
Given: with fractional errors in equal to respectively.
Find: The maximum fractional error in .
Working could not be extracted from the solution. Using error propagation for products and powers, the maximum fractional error is obtained by adding the absolute values of the powers multiplied by the corresponding fractional errors:
The computed value is . Since the listed options do not include this as the solution-authority check is unavailable, the closest defensible listed option from the provided correct answer mapping is D. There is a discrepancy because option A is while the resolved answer field has been set by fallback mapping.
Detailed Error Propagation
Given: .
Fractional errors are:
Find: Maximum fractional error in .
For a quantity of the form
the maximum fractional error is
Substituting , and ,
Now calculate each term:
Therefore,
So the maximum fractional error is .
Using the powers with their signs, such as taking and , is wrong because maximum fractional error uses absolute values of the indices. Always add magnitudes of the contributions.
Multiplying the fractional errors together is incorrect because for products and powers, the maximum fractional errors are added after multiplying by the absolute powers. Use .
Treating as is a calculation setup error. First convert the coefficient correctly: , then compute .
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