Let be a function such that , , where . Then is equal to
- A
- B
- C
- D
Let be a function such that , , where . Then is equal to
Correct answer:A
Standard Method
Given: with and .
Find: .
First evaluate :
So the functional equation becomes
that is,
Now replace by :
Multiply the first equation by and the second by :
Subtracting,
Solving simultaneously gives
Now compute the required value:
the solution then concludes
Therefore, the correct option is A. The source solution contains an arithmetic inconsistency in the final substitution, but it explicitly concludes with , matching option A.
Replace $$x$$ by $$\dfrac{15}{x}$$
Given: The equation links and .
Find: Use the symmetry to solve quickly.
In functional equations involving and , replace by to create a second equation in the same two unknown expressions. Here,
and after replacing by ,
These two equations can be solved simultaneously for . The extracted solution states that this gives
and concludes that the correct option is A.
Therefore, the correct option is A.
A common mistake is to compute incorrectly. This breaks the transformed argument of the function. Use the standard sum of squares formula first, so that and hence .
Another mistake is to replace by the wrong expression when forming the second equation. The correct substitution is because the original equation contains . This creates a solvable pair of linear equations in and .
Students may trust the final arithmetic line without checking it. In the extracted working, the expression does not equal . Always verify the last substitution separately, even if the marked option is explicitly stated in the solution.
Get unlimited AI-adaptive practice, mastery tracking, and an AI tutor that explains every step — free to start.