under root 3 proved a irrational number
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The no. can be 1.757475747574789742687565...
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Answer:
Step-by-step explanation:
Let us assume that under root 3 is rational , to our contrary
so it can be written in the form p/q
so under root 3 = p/q
then q under root 3 = p
lets square the equation...
3q^2 = p^2
therefore p^2 & p is divisible by 3
therefore p and q has atleast 3 as a common factor
and p&q are coprime
so this contradiction has arisen coz of our incorrect assumption
so under root 3 is irrational
HOPE YOU GET THAT
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