MCQMediumJEE 2024Simple Applications

JEE Mathematics 2024 Question with Solution

Suppose 2p2^{-p}, pp, 2α2^{-\alpha}, α\alpha are the coefficients of four consecutive terms in the expansion of (1+x)n(1 + x)^n. Then the value of p2α2+6α+2pp^2 - \alpha^2 + 6\alpha + 2p equals:

  • A

    44

  • B

    1010

  • C

    88

  • D

    66

Answer

Correct answer:C

Step-by-step solution

Standard Method

Given: The four consecutive coefficients in the expansion of (1+x)n(1+x)^n are 2p, p, 2α, α2-p,\ p,\ 2-\alpha,\ \alpha.

Find: The value of p2α2+6α+2pp^2-\alpha^2+6\alpha+2p.

Let these coefficients be

(nk)=2p,(nk+1)=p,(nk+2)=2α,(nk+3)=α\binom{n}{k}=2-p, \quad \binom{n}{k+1}=p, \quad \binom{n}{k+2}=2-\alpha, \quad \binom{n}{k+3}=\alpha

Using Pascal's identity on the first two coefficients,

(nk)+(nk+1)=(n+1k+1)=2\binom{n}{k}+\binom{n}{k+1}=\binom{n+1}{k+1}=2

Similarly, for the last two coefficients,

(nk+2)+(nk+3)=(n+1k+3)=2\binom{n}{k+2}+\binom{n}{k+3}=\binom{n+1}{k+3}=2

So,

(n+1k+1)=(n+1k+3)\binom{n+1}{k+1}=\binom{n+1}{k+3}

Since these are different positions in the same row, symmetry gives

(k+1)+(k+3)=n+1(k+1)+(k+3)=n+1

Hence,

n=2k+3n=2k+3

Now compare the middle two coefficients:

(nk+2)=(2k+3k+2)=(2k+3k+1)=(nk+1)\binom{n}{k+2}=\binom{2k+3}{k+2}=\binom{2k+3}{k+1}=\binom{n}{k+1}

Therefore,

p=2αp=2-\alpha

So,

p+α=2p+\alpha=2

Now evaluate the expression:

p2α2+6α+2p=(pα)(p+α)+6α+2pp^2-\alpha^2+6\alpha+2p=(p-\alpha)(p+\alpha)+6\alpha+2p

Using p+α=2p+\alpha=2,

=(pα)2+6α+2p=2p2α+6α+2p=4p+4α=(p-\alpha)\cdot 2+6\alpha+2p=2p-2\alpha+6\alpha+2p=4p+4\alpha

Thus,

4p+4α=4(p+α)=42=84p+4\alpha=4(p+\alpha)=4\cdot 2=8

Therefore, the value of the expression is 88. Hence, the correct option is C.

The answer key marks option B, but the extracted solution working concludes 88, so the solution is taken as authoritative.

Quick Simplification

Given: The consecutive coefficients are 2p, p, 2α, α2-p,\ p,\ 2-\alpha,\ \alpha.

Find: p2α2+6α+2pp^2-\alpha^2+6\alpha+2p.

Add the first two and the last two coefficients:

(2p)+p=2,(2α)+α=2(2-p)+p=2, \qquad (2-\alpha)+\alpha=2

So two binomial coefficients in the next row are equal. By symmetry of binomial coefficients, the middle two coefficients in the original row become equal, giving

p=2αp+α=2p=2-\alpha \Rightarrow p+\alpha=2

Now write

p2α2+6α+2p=(pα)(p+α)+6α+2pp^2-\alpha^2+6\alpha+2p=(p-\alpha)(p+\alpha)+6\alpha+2p

Substitute p+α=2p+\alpha=2:

=2(pα)+6α+2p=4p+4α=4(p+α)=8=2(p-\alpha)+6\alpha+2p=4p+4\alpha=4(p+\alpha)=8

Therefore, the value is 88 and the correct option is C.

Common mistakes

  • Assuming the answer key must be right. Here the listed answer says B, but the solution working gives 88. Always trust the actual derivation and then match the resulting value with the options.

  • Using symmetry incorrectly as r1=r2r_1=r_2 only. For binomial coefficients, if (nr1)=(nr2)\binom{n}{r_1}=\binom{n}{r_2} and r1r2r_1\neq r_2, then use r1+r2=nr_1+r_2=n. Missing this gives the wrong relation between nn and kk.

  • Not noticing that the middle two coefficients become equal after finding n=2k+3n=2k+3. You must use (2k+3k+2)=(2k+3k+1)\binom{2k+3}{k+2}=\binom{2k+3}{k+1}, which gives p=2αp=2-\alpha.

Practice more Simple Applications questions

Get unlimited AI-adaptive practice, mastery tracking, and an AI tutor that explains every step - free to start.

Related questions