prove that root 11 is a rational number
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let√11 be rational.
then it must in the form of p / q [q is not equal to 0] [p and q are co-prime]
√11 = p / q
=> √11 x q = p
squaring on both sides
=> 11q2= p2 ------> (1)
p2 is divisible by 11
p is divisible by 11
p = 11c [c is a positive integer] [squaring on both sides ]
p2 = 121 c2 --------- > (2)
subsitute p2 in equ (1) we get
11q2 = 121c2
q2 = 11c2
=> q is divisble by 11
thus q and p have a common factor 11
there is a contradiction
as our assumsion p & q are co prime but it has a common factor.
so √11 is an irrational
then it must in the form of p / q [q is not equal to 0] [p and q are co-prime]
√11 = p / q
=> √11 x q = p
squaring on both sides
=> 11q2= p2 ------> (1)
p2 is divisible by 11
p is divisible by 11
p = 11c [c is a positive integer] [squaring on both sides ]
p2 = 121 c2 --------- > (2)
subsitute p2 in equ (1) we get
11q2 = 121c2
q2 = 11c2
=> q is divisble by 11
thus q and p have a common factor 11
there is a contradiction
as our assumsion p & q are co prime but it has a common factor.
so √11 is an irrational
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