prove that the expressions n^2-3n+1/n-1 is not a prime number for all n summation N
Answers
Given : ( n² - 3n + 1) / (n - 1)
To Find : prove that the value of expression is not a prime number for all n€N
Solution:
( n² - 3n + 1) / (n - 1)
= ( n² -2n - n + 1) / (n - 1)
= ( n² -2n + 1 - n) / (n - 1)
= ( (n - 1)² - n) / (n - 1)
= n - 1 - n/(n - 1)
to be a prime number n/(n - 1) should be integer
which is only possible if n = 2
for n = 2
Value s
2 - 1 - 2/1
= 2 - 1 - 2
= - 1 which is not a prime number
Hence for any other value of n€N ( n² - 3n + 1) / (n - 1) is not even integer
Hence can not be a prime number.
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SOLUTION
TO PROVE
The below expressions is not a prime number for all n
EVALUATION
Here the given expression is
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
Which is not a prime
Hence
is not a prime number for all n
Hence proved
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