If , , then is equal to:
- A
- B
- C
- D
If , , then is equal to:
Correct answer:D
Standard Method
Given: and we need
Find: The value of .
Use the symmetry relation between and :
Now simplify the second term by dividing numerator and denominator by or rewriting appropriately. This gives
So any two terms whose arguments add to have sum .
In the required sum, the arguments are
These pair as
Each pair adds to , so each corresponding function pair adds to .
The total number of terms is , hence the number of pairs is
Therefore
So, the correct option is D.
Pairing Trick
Given: The sum contains values of for .
Find: The total sum quickly.
Notice that for every term
there is a matching term
From the solution property,
Hence each symmetric pair contributes exactly .
Since there are terms, there are such pairs. Therefore the sum is
So, the correct option is D.
Assuming the raw option label from the solution is final without checking the value. Here the solution text says option A, but also explicitly gives the value . The value must be matched with the listed options, which makes the correct option D.
Pairing the terms incorrectly. The correct pairing is with because these add to . Pairing consecutive terms does not use the identity .
Counting the number of pairs wrongly. There are terms, so the number of pairs is , not . Each pair contributes , not each individual term.
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