MCQMediumJEE 2024Sum of Series

JEE Mathematics 2024 Question with Solution

Evaluate 1×22+2×32++100×(101)2/(12×22+22×32++1002×101)1\times 2^2 + 2\times 3^2 + \ldots + 100\times (101)^2 \, / \, (1^2\times 2^2 + 2^2\times 3^2 + \ldots + 100^2\times 101):

  • A

    306306

  • B

    305305

  • C

    3232

  • D

    3131

Answer

Correct answer:B

Step-by-step solution

Standard Method

Given: Evaluate the ratio

1×22+2×32++100×101212×22+22×32++1002×101\frac{1\times 2^2 + 2\times 3^2 + \ldots + 100\times 101^2}{1^2\times 2^2 + 2^2\times 3^2 + \ldots + 100^2\times 101}

Find: The correct option.

Let

N=k=1100k(k+1)2N = \sum_{k=1}^{100} k(k+1)^2

and

D=k=1100k2(k+1)D = \sum_{k=1}^{100} k^2(k+1)

Using summation formulas for the numerator and denominator, compute the ratio. The given solution states that this ratio evaluates to 305305.

Therefore, the correct option is B.

Common mistakes

  • Expanding only the numerator and not the denominator consistently can distort the ratio. Write both sums in sigma form first, then apply the correct summation formulas to each.

  • Confusing k(k+1)2k(k+1)^2 with k2(k+1)k^2(k+1) is a structural error because the powers belong to different factors in numerator and denominator. Keep the two series separate before simplification.

  • Using incorrect formulas for k2\sum k^2 or k3\sum k^3 leads to a wrong final value. Verify the standard summation identities before substituting n=100n=100.

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