Prove that V45is an irrational number,
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Answered by
1
Answer:
vggv vgv. vdb. fyv
Step-by-step explanation:
vvvvv. vfvv vg. dhb ggcd. fgg vfddv ffc. drv.
Answered by
1
Answer:
To Prove :- √45 = irrational.
Proof :-
√45 can be written as :- 3√5
So,
Let, 3√5 be rational, written in form of a / b where a & b are co-primes and b =/= 0.
a
- - - - = 3√5
b
a
- - - - = √5
3b
But how can this be possible, as √5 is irrational and a / 3b is rational.
If on both sides there would be rational, then the number would be rational
Hence it contradicts the fact, our consumption was wrong.
hope this helps you
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