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g is a vector function and g(p)>=0 or g(p)<=0.
we have function g,in Real numbers dimension m and value p (with p=(p1,...,pm)) is positive.
For at least one p,that g(p)>zero or equal to zero or g(p)<zero or equal to zero,is true.Also,p*g(p)=0 for p positive.
Then,proof that g(p)=0.
We have the real positive(only) numbers space of dimension two.
C={(x,y) belong to RxR and x+2*y<=2) and f(x,y)=min{x,y}.What is the minimum,x or y?
We have the real positive(only) numbers space of dimension n.We have also a relation of two members(sorry),continuous,absoletuly monotonic(only >),cursive,in this space.
Also x,y are arrays and x>y in this space and 0<a<1.
How can we proove that a*x+(1-a)*y>y ?. (*: multiplication)
(G. Aliprantis, D. Brown and O. Burhinshaw, Existence and Optimality of Competitive Equilibrium, Springer-Verlag, 1990.)
sorry for my english.
we have a pentagram.How we can with two lines create nine not covertly triangles?
terms of sequence 10,2,1,9,6,...
what are the others terms?
do not exist other data.
this is a solution and why?
10,2,1,9,6,7,0,8,5,4,3
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