Prove that √3 is Irrational Number.
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the decimal expansion of √3 is non terminating and non repeating therefore it is an irrational number
Kristina887:
for proof...we hve to assume sq.rt 3 as rational
this is the only thing to prove that a number is irrational
yes kristina is right
We do not have so much time to find the value of √3
then there exist two coprime integers a and b such tht sq.rt 3 = a/b
then....b×sq.rt 3 = a
this question doesn't comes in exam and if it comes its for only 1mark
squaring bth sides we get
rohit u r wrong
of course
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since √3 = 1.732050807 is neither terminating nor repeating decimal
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