Can anyone help me with this question. ((14638)(259))^-1
I understand the normal way of multiplying permutation with cycle notation but here is an inverse sign so I don’t know what to do?
Many thanks.
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Welcome to MSE. Please read this text about how to ask a good question. – José Carlos Santos Jan 04 '21 at 08:42
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Hint: The cycles are disjoint and so the inverse of $\pi\rho= (14638)(259)$ is $(\pi\rho)^{-1} = \rho^{-1}\pi^{-1}$. So you have to form the inverse of cycles, which is quite easy:
The inverse permutation of $(x_1x_2\ldots x_n)$ is $(x_1x_n\ldots x_2)$.
Wuestenfux
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In a group, $(xy)^{-1}=y^{-1}x^{-1}.$ And the inverse of a cycle can be obtained by reversing the order of entries, e.g. $(acbd)^{-1}=(dbca).$
coffeemath
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