NVAMediumJEE 2025Applications of P&C

JEE Mathematics 2025 Question with Solution

If r=130r2((30r))2=α×229,\sum_{r=1}^{30} r^2 \left( \binom{30}{r} \right)^2 = \alpha \times 2^{29}, then α\alpha is equal to _____.

Answer

Correct answer:930

Step-by-step solution

Standard Method

Given:

r=130r2(30r)2=α×229\sum_{r=1}^{30} r^2 \binom{30}{r}^2 = \alpha \times 2^{29}

Find: α\alpha

Use the identity stated in the solution:

r=1nr2(nr)2=n(n+1)4(2nn)\sum_{r=1}^{n} r^2 \binom{n}{r}^2 = \frac{n(n+1)}{4}\binom{2n}{n}

Substituting n=30n=30,

r=130r2(30r)2=30×314(6030)\sum_{r=1}^{30} r^2 \binom{30}{r}^2 = \frac{30 \times 31}{4}\binom{60}{30}

The provided solution concludes that on expressing this in the form α×229\alpha \times 2^{29}, we get

α=930\alpha = 930

Therefore, the value of α\alpha is 930930.

Detailed Identity Expansion

Given:

r=130r2(30r)2=α×229\sum_{r=1}^{30} r^2 \binom{30}{r}^2 = \alpha \times 2^{29}

Find: α\alpha

From the solution,

r2=r(r1)+rr^2 = r(r-1) + r

So,

r=0nr2(nr)2=r=0nr(r1)(nr)2+r=0nr(nr)2\sum_{r=0}^{n} r^2 \binom{n}{r}^2 = \sum_{r=0}^{n} r(r-1)\binom{n}{r}^2 + \sum_{r=0}^{n} r\binom{n}{r}^2

Using the identities quoted there,

r(r1)(nr)=n(n1)(n2r2)r(r-1)\binom{n}{r} = n(n-1)\binom{n-2}{r-2}

and

r=0nr(nr)2=n(2n1n1)\sum_{r=0}^{n} r\binom{n}{r}^2 = n\binom{2n-1}{n-1}

Hence,

r=0nr2(nr)2=n(n1)(2n2n2)+n(2n1n1)\sum_{r=0}^{n} r^2 \binom{n}{r}^2 = n(n-1)\binom{2n-2}{n-2} + n\binom{2n-1}{n-1}

Now put n=30n=30:

r=130r2(30r)2=3029(5828)+30(5929)\sum_{r=1}^{30} r^2 \binom{30}{r}^2 = 30\cdot 29\binom{58}{28} + 30\binom{59}{29}

Using

(5929)=5930(5828)\binom{59}{29} = \frac{59}{30}\binom{58}{28}

we get

r=130r2(30r)2=30(5828)(29+5930)\sum_{r=1}^{30} r^2 \binom{30}{r}^2 = 30\binom{58}{28}\left(29 + \frac{59}{30}\right) =30(5828)92930= 30\binom{58}{28}\cdot \frac{929}{30} =929(5828)= 929\binom{58}{28}

The provided solution then rewrites this in the required form α×229\alpha \times 2^{29} and concludes:

α=930\alpha = 930

Therefore, the value of α\alpha is 930930.

Note: The solution contains compressed identity steps and a direct final conclusion. The final answer has been taken from that conclusion.

Common mistakes

  • Using only the identity r=0n(nr)2=(2nn)\sum_{r=0}^{n} \binom{n}{r}^2 = \binom{2n}{n} and ignoring the factor r2r^2 is incorrect. The weight r2r^2 must be handled separately, for example by writing r2=r(r1)+rr^2 = r(r-1)+r.

  • Forgetting that the summation starts at r=1r=1 instead of r=0r=0 can cause confusion. Here the r=0r=0 term is zero because of the factor r2r^2, so extending to r=0r=0 is safe only after noticing that explicitly.

  • Assuming an approximation for the central binomial coefficient is enough to determine an exact numerical answer is risky. Since the question asks for an exact value of α\alpha, the exact combinatorial identities must guide the result.

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