Homework SourseShow that 1 x x2 is a unit in Qx and express 11 x x2 as
Show that 1 - x - x^2 is a unit in Q[[x]], and express 1/(1 - x - x^2) as a power series.![Show that 1 - x - x^2 is a unit in Q[[x]], and express 1/(1 - x - x^2) as a power series.SolutionAny element in Q[[x]] (the ring of formal power series ) is in](/WebImages/17/show-that-1-x-x2-is-a-unit-in-qx-and-express-11-x-x2-as-1033514-1761535924-0.webp "Show that 1 - x - x^2 is a unit in Q[[x]], and express 1/(1 - x - x^2) as a power series.SolutionAny element in Q[[x]] (the ring of formal power series ) is in")
Solution
Any element in Q[[x]] (the ring of formal power series ) is invertible , provided it has a non-zero constant term.
Hence 1-x-x2 is invertible in Q[[x]].
[1-x-x2 ]-1 = [1-(x+x2 )]-1 = 1+(x+x2) + (x+x2)2 +......(x+x2)n +.........(By considering either geometric series or binomial theorem)
is the power series expansion (and hence the inverse of 1-x-x2 in Q[[x]], in fact the coefficients are in Z)
