- #1
- 1,995
- 7
I want to show that if I and J are coprime ideals of a ring R, so I+J=R, then for any positive numbers m and n we also have [itex]I^n+I^m=R[/itex].
I thought the easiest way to do it was to show that [itex]1 \in I^n+J^m[/itex] given that there exist [itex]i\in I[/itex] and [itex]j\in J[/itex] such that [itex]i+j=1[/itex]. But I haven't had much luck yet. Any hint would be appreciated.
I thought the easiest way to do it was to show that [itex]1 \in I^n+J^m[/itex] given that there exist [itex]i\in I[/itex] and [itex]j\in J[/itex] such that [itex]i+j=1[/itex]. But I haven't had much luck yet. Any hint would be appreciated.