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JEE Mathematics 2023 Question with Solution

The number of integral terms in the expansion of (312+514)680\left( 3^{\frac{1}{2}} + 5^{\frac{1}{4}}\right)^{680} is equal to:

  • A

    171171

  • B

    160160

  • C

    150150

  • D

    180180

Answer

Correct answer:A

Step-by-step solution

Standard Method

Given: We need the number of integral terms in the expansion of (312+514)680\left( 3^{\frac{1}{2}} + 5^{\frac{1}{4}}\right)^{680}.

Find: The count of terms that are integers.

The general term in the binomial expansion is

Tr=(680r)(312)680r(514)rT_r = \binom{680}{r} \left( 3^{\frac{1}{2}} \right)^{680-r} \left( 5^{\frac{1}{4}} \right)^r

So,

Tr=(680r)3680r25r4T_r = \binom{680}{r} \cdot 3^{\frac{680-r}{2}} \cdot 5^{\frac{r}{4}}

For TrT_r to be an integer, both exponents must be integers:

680r2Z,r4Z\frac{680-r}{2} \in \mathbb{Z}, \qquad \frac{r}{4} \in \mathbb{Z}

From r4Z\frac{r}{4} \in \mathbb{Z}, rr must be a multiple of 44.

Also, if rr is a multiple of 44, then rr is even, so 680r680-r is also even. Hence 680r2\frac{680-r}{2} is automatically an integer.

Therefore,

r=0,4,8,12,,680r = 0, 4, 8, 12, \dots, 680

This is an arithmetic progression with first term 00, last term 680680, and common difference 44.

Number of values of rr is

68004+1=170+1=171\frac{680-0}{4} + 1 = 170 + 1 = 171

Therefore, the number of integral terms is 171171. The correct option is A.

Divisibility Observation

Given: The expansion is (312+514)680\left( 3^{\frac{1}{2}} + 5^{\frac{1}{4}}\right)^{680}.

Find: How many terms are integral.

A term is integral only when the exponent of 55 becomes an integer:

r4Z\frac{r}{4} \in \mathbb{Z}

So rr must be divisible by 44.

Once rr is divisible by 44, it is even, and hence 680r680-r is even. Therefore,

680r2Z\frac{680-r}{2} \in \mathbb{Z}

also holds automatically.

So we only count multiples of 44 from 00 to 680680:

0,4,8,,6800, 4, 8, \dots, 680

Count:

6804+1=171\frac{680}{4} + 1 = 171

Therefore, the correct option is A.

Common mistakes

  • Assuming only 680r2\frac{680-r}{2} needs to be an integer. This is incomplete because the exponent r4\frac{r}{4} of 55 must also be an integer. Always check the integrality condition for both factors.

  • Counting multiples of 44 from 44 to 680680 and forgetting r=0r = 0. The first term of the expansion also counts, so include both endpoints when they satisfy the condition.

  • Treating the answer as the number of terms in the expansion, which is 681681. That counts all binomial terms, not only the integral ones. First impose the exponent conditions, then count valid rr values.

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