Prove that 6+√2 is irrational.
Guys please tell this question.
❌❌ NO SPAMMING ❌❌
Answers
Answer:
its irritational
Step-by-step explanation:
Let us assume 6+
2
is rational. Then it can be expressed in the form
q
p
, where p and q are co-prime
Then, 6+
2
=
q
p
2
=
q
p
−6
2
=
q
p−6q
-----(p,q,−6 are integers)
q
p−6q
is rational
But,
2
is irrational.
This contradiction is due to our incorrect assumption that 6+
2
is rational
Hence, 6+
2
is irrational
Answer:
its irritational
Step-by-step explanation:
Let us assume 6+
2
is rational. Then it can be expressed in the form
q
p
, where p and q are co-prime
Then, 6+
2
=
q
p
2
=
q
p
−6
2
=
q
p−6q
-----(p,q,−6 are integers)
q
p−6q
is rational
But,
2
is irrational.
This contradiction is due to our incorrect assumption that 6+
2
is rational
Hence, 6+
2
is irrational
Hope this answer will help you.✌️