If f(x)=x3−x2f′(1)+xf′′(2)−f′′′(3), x∈R, then:
- A
3f(1)+f(2)=f(3)
- B
f(3)−f(2)=f(1)
- C
2f(0)−f(1)+f(3)=f(2)
- D
f(1)+f(2)+f(3)=f(0)
If , , then:
Correct answer:C
Standard Method
Given:
Find: Which relation among the given options is true.
Let
Then
Differentiate:
Using the given definitions,
From
substitute into
so
Hence,
Therefore,
Now evaluate:
Check option :
And
So,
Therefore, the correct option is C.
Note: The solution labels the option as A, but the actual statement proved matches source option (3), which is label C.
Also, the second provided approach contains algebraic inconsistencies in intermediate steps, but its final verified relation still matches option C.
Direct verification from evaluated values
After obtaining
we compute the needed values:
Now test the relevant option:
Hence the true statement is , so the correct option is C.
Assuming the option label written in the solution is automatically correct. Here the working proves the statement of source option (3), so the correct mapped label is C, not the displayed label A.
Differentiating incorrectly. The correct derivatives are , , and .
Using , , and as independent constants without substituting back into the differentiated expressions. These definitions create equations that must be solved for .
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