Kushagra Nov 8, 2017 There's no need to simplify it, it can simply be multiplied, \displaystyle\frac{{{3}\times{10}\times{11}}}{{{5}\times{1}\times{12}}} \displaystyle\frac{{330}}{{60}} ...

\mathrm{Hom}_R(R/I,N)\simeq (0:_NI), where (0:_NI)=\{x\in N:Ix=0\}. Since R/J\otimes M\simeq M/JM one can take N=M/JM and get \mathrm{Hom}_R(R/I, R/J\otimes M)\simeq(JM:_MI)/JM.

When you say "E" happened with certainly, and are now interested in the probability of lung cancer, that's the same thing as calculating P(H|E). The "given" E part assumes that E happened. ...

It's easy to prove the formula if you just look at the individual basis vectors of the tensor product. Let's use (2j+1) and (2s+1) eigenvectors of j^2, j_z and s^2, s_z called |j,j_z\rangle ...

So, suppose G/B = \coprod_{w \in W} B w B. Then, pick (gB, hB) \in (G/B)^{2}. We can find w such that g^{-1}h \in BwB. Say g^{-1}hB = bwB. Then, b^{-1}g^{-1}h \in wB and hence, (gB, hB) = gb(eB, b^{-1}g^{-1}hB) = gb(eB, wB). ...

This is false. If N=H you have G/H \times G/H \cong G/H which is not possible for groups whose order is not prime (G/H is not trivial and is finite). In the case that N \neq H you have by ...