NVAMediumJEE 2023General Term

JEE Mathematics 2023 Question with Solution

If the term without xx in the expansion of (x23+αx3)22\left( x^{\frac{2}{3}} + \frac{\alpha}{x^3} \right)^{22} is 73157315, then α|\alpha| is equal to _____.

Answer

Correct answer:1

Step-by-step solution

Standard Method

Given: The term without xx in the expansion of (x23+αx3)22\left( x^{\frac{2}{3}} + \frac{\alpha}{x^3} \right)^{22} is 73157315.

Find: α|\alpha|.

For the expansion of (x23+αx3)22\left( x^{\frac{2}{3}} + \frac{\alpha}{x^3} \right)^{22}, the general term is

Tr+1=(22r)(x23)22r(αx3)rT_{r+1} = \binom{22}{r}\left(x^{\frac{2}{3}}\right)^{22-r}\left(\frac{\alpha}{x^3}\right)^r

So,

Tr+1=(22r)αrx23(22r)3rT_{r+1} = \binom{22}{r}\alpha^r x^{\frac{2}{3}(22-r)-3r}

For the term independent of xx, the exponent of xx must be zero:

23(22r)3r=0\frac{2}{3}(22-r)-3r = 0 4411r=044 - 11r = 0 r=4r = 4

Hence the constant term is

T5=(224)α4T_5 = \binom{22}{4}\alpha^4

Now,

(224)=22×21×20×194×3×2×1=7315\binom{22}{4} = \frac{22\times21\times20\times19}{4\times3\times2\times1} = 7315

Therefore,

7315α4=73157315\alpha^4 = 7315 α4=1\alpha^4 = 1

So,

α=1|\alpha| = 1

Therefore, the required value is 11.

Using the exponent of $$x$$ carefully

Given: The constant term in (x23+αx3)22\left( x^{\frac{2}{3}} + \frac{\alpha}{x^3} \right)^{22} is 73157315.

Find: α|\alpha|.

A common source of confusion is the form of the general term. If the first term is chosen 22r22-r times and the second term is chosen rr times, then

Tr+1=(22r)(x23)22r(αx3)rT_{r+1} = \binom{22}{r}\left(x^{\frac{2}{3}}\right)^{22-r}\left(\frac{\alpha}{x^3}\right)^r

Now simplify the power of xx:

Tr+1=(22r)αrx442r33rT_{r+1} = \binom{22}{r}\alpha^r x^{\frac{44-2r}{3}-3r} =(22r)αrx4411r3= \binom{22}{r}\alpha^r x^{\frac{44-11r}{3}}

For the constant term,

4411r3=0\frac{44-11r}{3} = 0 4411r=044-11r=0 r=4r=4

Thus,

T5=(224)α4T_5 = \binom{22}{4}\alpha^4

Given constant term =7315=7315, we get

(224)α4=7315\binom{22}{4}\alpha^4 = 7315

Since

(224)=7315\binom{22}{4} = 7315

we have

α4=1\alpha^4 = 1

Hence,

α=1|\alpha| = 1

Therefore, the answer is 11.

The solution used aa in place of α\alpha; this notation change does not affect the result.

Common mistakes

  • Using the general term in the wrong order. The powers should come from choosing x23x^{\frac{2}{3}} exactly 22r22-r times and αx3\frac{\alpha}{x^3} exactly rr times. Writing these exponents incorrectly gives a wrong condition for the constant term.

  • Setting only the positive exponent part equal to zero. The exponent of xx is the combined exponent 23(22r)3r\frac{2}{3}(22-r)-3r, not merely 2r3\frac{2r}{3}. Always combine both contributions before imposing the constant-term condition.

  • Forgetting that the question asks for α|\alpha|, not α\alpha itself. From α4=1\alpha^4=1, the required conclusion is directly α=1|\alpha|=1.

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