I work in Algebraic geometry, with theoretical examples of a Noeterian ring. For example, consider every closed-map of $R^{n}\to{} R^{n+1}$, in general $R^{n}$ has a closed ring since any point $p$ is a limit on spaces of $R^{n}$ . But if it is Noeterian, can every point $p$ of a Lie-maximal Group "be simple and compact in $R^{n}$ ? , or can the morphism of a closed-map be fulfilled in $R^{ n}\to{} G(R^{n+1}) ? . In general, if the ring of $R^{n}$ is Noeterian, it is true that $R^{n}\to{} R^{m}$ or a subspace of $R^{n}$ Which also writes the Noeterian ring as the subring of $R^{n}$ (In general for a Noeterian ring, not every point $p$ is a limit of $R^{n}$ If not for limits that correspond to a subspace "or subring" in $R^{m}$
Mam, my sister is a nice teacher like you. She also have good number of views on her channel but subscriber are not that much. Please guide us what should we do.
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I work in Algebraic geometry, with theoretical examples of a Noeterian ring. For example, consider every closed-map of $R^{n}\to{} R^{n+1}$, in general $R^{n}$ has a closed ring since any point $p$ is a limit on spaces of $R^{n}$ .
But if it is Noeterian, can every point $p$ of a Lie-maximal Group "be simple and compact in $R^{n}$ ? , or can the morphism of a closed-map be fulfilled in $R^{ n}\to{} G(R^{n+1}) ? .
In general, if the ring of $R^{n}$ is Noeterian, it is true that $R^{n}\to{} R^{m}$ or a subspace of $R^{n}$ Which also writes the Noeterian ring as the subring of $R^{n}$ (In general for a Noeterian ring, not every point $p$ is a limit of $R^{n}$ If not for limits that correspond to a subspace "or subring" in $R^{m}$
Thanku very much mam .ur teaching style is fabulous and very easy
lock down me aapka struggle ham puri zindgi nahi bhulenge
Thnx👏
Thank so much ma'am 🙏
Graph theory ka bhi video bnaeya na ma'am plz🙏
maim tu si great ho
Thank you so much mam
Excellent
For this reason, the Noetherian ring "discriminant of $R^{n}$ is local with a Riemannian metric in each given Tangent-space $T(M)\otimes{} T^{*}$
Thank you maam
Mam thanks for your videos. Just a question - Shouldn't subring contain UNITY elements too ?
Not necessary
Thanks mam
🙏🙏🙏🙏
Mam, my sister is a nice teacher like you. She also have good number of views on her channel but subscriber are not that much. Please guide us what should we do.
Mam ideal k baray ma koi video ni??
Bahut saare he
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Thank you ma'am 🤗
Thank you so much mam