upto terms is equal to
- A
- B
- C
- D
upto terms is equal to
Correct answer:B
Standard Method
Given: The series is and we need the sum of the first terms.
Find: The total sum of these terms.
Terms alternate between plain odd numbers and squared odd numbers, with the first two terms and plain. Therefore, in the first terms:
The plain terms are and . So,
The squared terms are . Their bases are for . Thus,
Using
and
we get
Therefore,
So, the correct option is B.
Separate the Series into Parts
Given: The series is upto terms.
Find: Its total sum.
Separate the series into two parts:
From the pattern used in the solution, the first terms contain plain odd terms and squared odd terms.
For plain terms:
So,
For squared terms:
Write these as
Hence,
Now add both parts:
Therefore, the sum upto terms is , so the correct option is B.
Treating the pattern as if every alternate odd number is squared from the very beginning. This is wrong because the first two terms are plain, so the counting of plain and squared terms must match the actual displayed pattern. Count the first terms carefully before summing.
Using the sum of the first odd numbers directly for the plain part. This is wrong because the plain terms here are not consecutive odd numbers after the first term; they form and then an AP with common difference . Sum that actual sequence instead.
Writing the squared-term bases incorrectly. The squared terms are based on , which follow . If you use all odd numbers or use the wrong first term, the final total changes completely. First identify the correct base sequence, then square and sum.
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