Let = up to terms and . If , then is equal to:
JEE Mathematics 2024 Question with Solution
Answer
Correct answer:353
Step-by-step solution
Standard Method
Given:
- up to terms
Find:
First identify the sequence whose squares are being added in :
The successive differences are , so the sequence is quadratic. Let its -th term be
Using
we get
Solving,
Hence
Therefore,
So,
From the detailed computation of the terms:
Hence,
Now compute
Substitute into the given relation:
Thus,
Therefore, the value of is .
Pattern Recognition Method
Given: the base sequence in is
Find:
Observe the pattern of differences:
This shows that each term can be written directly as
which gives
Now evaluate the first terms:
So
Also,
Hence,
Using
we get
Therefore, the value of is .
Common mistakes
A common mistake is to assume is an arithmetic progression. That is wrong because the first differences are not constant. Instead, check the successive differences and recognize the sequence as quadratic.
Some students compute as instead of . This changes the problem completely. The terms in are the squares of the sequence terms, so square each term before summing.
Another mistake is to use an incorrect formula for . Here , so the sum of fourth powers is required, not the sum of squares or cubes. Write the powers carefully before evaluating.
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