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Question

Polynomial P(x) contains only terms of odd degree. When P(x) is divided by (x3), the remainder is 6. If P(x) is divided by (x29), then the remainder is g(x). Then the value of g(2) is

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Solution

P(x) contains only terms of odd degree.
So, P(x) is an odd function.
P(3)=P(3)=6

Let P(x)=Q(x)(x29)+ax+b
where Q(x) is the quotient and ax+b=g(x) is the remainder.

Now, P(3)=3a+b=6 (1)
P(3)=3a+b=6 (2)
Solving (1) and (2), we get
a=2,b=0
g(x)=2x
g(2)=4

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