If o = (134)(25) then order of o is
Answers
Answer:
2x+3;x;9−3x
2x+3;x;3x−9
x;2x+3;3x−9
2(x+3);x;9−3x
The order of g = 6
Given :
g = (1 3 4)(2 5)
To find :
The order of g
Solution :
Step 1 of 3 :
Write down the given permutation
Here the given permutation is
g = (1 3 4)(2 5)
Step 2 of 3 :
Check the permutation commute or not
(1 3 4) and (2 5) are disjoint
So the permutation commute
Step 3 of 3 :
Find the order
o(1 3 4) = 3 , o(2 5)
We know that if a and b are elements of a group such that o(a) = m , o(b) = n and gcd(m, n) = 1 then o(ab) = mn
Using this result we get
The order of g
= Order of (1 3 4)(2 5)
= o(1 3 4) × o(2 5)
= 3 × 2
= 6
Correct question : If g = (1 3 4)(2 5) then order of g is
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