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Question

The coefficient of x203 in (1x)(2x2)(3x3)(20x20) is
(correct answer + 1, wrong answer - 0.25)

A
11
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B
21
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C
13
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D
15
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Solution

The correct option is C 13
We have,
(1x)(2x2)(3x3)(20x20)
=(x1)(x22)(x33)(x2020)
Highest possible coefficient of x in above expansion is x210.

Consider integer partitions with distinct part of 210203=7.

The ways of writing 7 as a sum of distinct positive integers are 7,6+1,5+2,4+3,4+2+1

So, in order to obtain x203 coefficient, x7 coefficient from the product of terms has to be excluded.
Required coefficient is given by 7+16+25+34124=13

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