Let be a function such that , . Then is equal to
- A
- B
- C
- D
Let be a function such that , . Then is equal to
Correct answer:A
Standard Method
Given: ,
Find:
Substitute in the given equation:
Substitute in the given equation:
Now add the two equations:
Divide by :
Therefore, the correct option is A and the value of is .
Using a paired substitution
Given:
Find:
The key observation is that and are paired by the transformation because and .
So, substitute the two connected values directly:
Add them to eliminate the asymmetric coefficients:
Hence,
Therefore, the required sum is , so the correct option is A.
Add the two linked equations directly
Given:
Find:
Because and map into each other under , write the equation once at and once at :
A quick shortcut is to add them immediately, since both unknowns then get coefficient :
Therefore, the correct option is A.
Substituting only and trying to find from a single equation. This is wrong because one equation contains two unknowns, and . Instead, also substitute the linked value to form a solvable system.
Missing the pairing and . This breaks the structure of the functional equation. Always check how the transformation connects the required arguments.
Solving separately for and with unnecessary algebra. That is inefficient here because the question asks only for the sum. Add the two equations directly to obtain in one step.
Get unlimited AI-adaptive practice, mastery tracking, and an AI tutor that explains every step — free to start.