prove that 1/√(3) is an irrational number
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let us asuume 1/√3 is a rational number
then it can be written as p/q , where p and q are co prime . hence , 1/√3 = p/q
and q/p =√3 ,here q/p is a rational number.
hence raional is not equal to irrational.
then our assumption is wrong .
so we called 1/√3 as an irrational number.
then it can be written as p/q , where p and q are co prime . hence , 1/√3 = p/q
and q/p =√3 ,here q/p is a rational number.
hence raional is not equal to irrational.
then our assumption is wrong .
so we called 1/√3 as an irrational number.
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