Polynomial ring/Ordered field/Ordered quotient field/Not archimedean/Exercise
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Let be an ordered field, let be the polynomial ring over and set
![{\displaystyle {}K[X]}](https://wikimedia.org/api/rest_v1/media/math/render/svg/7861df9df3d7463835d927c4d0d4c27f5e2f8416)
the field of rational functions over . Show, using exercise, that can be made into an ordered field, which is not an
archimedean ordered field.