Math, asked by manvithabrajofficial, 2 months ago

prove that the value of the expression n^2-3n+1 /n-1 is not a prime number for all n is natural numbers N e n

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Answers

Answered by pulakmath007
3

SOLUTION

TO PROVE

The below expressions is not a prime number for all n

\displaystyle  \sf{ \frac{ {n}^{2} - 3n + 1 }{n - 1} }

EVALUATION

Here the given expression is

\displaystyle  \sf{ \frac{ {n}^{2} - 3n + 1 }{n - 1} }

The above expression is undefined when n = 1

So the expression is not defined for all values of n

Moreover if we take n = 3 then we get

\displaystyle  \sf{ =  \frac{ {3}^{2} - 3 \times 3 + 1 }{3 - 1} }

\displaystyle  \sf{ =  \frac{9- 9 + 1 }{2} }

\displaystyle  \sf{ =  \frac{ 1 }{2} }

Which is not a prime

Hence

\displaystyle  \sf{ \frac{ {n}^{2} - 3n + 1 }{n - 1} }

is not a prime number for all n

Hence proved

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