Leslac
Posts: 45
Joined: 5/4/2020 Status: offline
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quote:
ORIGINAL: demiare Sigh. Game manual have 300+ pages describing purely game mechanics. This game isn't simple. But even then - game HAVE a tooltip about linear techs. Management -> Tech Tree. Hover mouse over any unlocked linear tech: Let's ignore your foolish condescending tone for a second and focus on the important thing in the tooltip. IT TELLS YOU NOTHING! Using the word "linear" means nothing to just about most people. And when the tooltip states that you should remember the "linear" tech is "linear and effects gradual" what the hell are you supposed to take away from that!? Well, "it's linear and gradual". "Sigh." Also, I take back what I said about not wanting people to explain it to me. jobu13 did it in his very first post on this forum. No google necessary for me now. Thank you! "The point is that they give you an incremental bonus for each % improvement. You're not necessarily intended to ever "fully" research them." That's beautifully put man. Vic should put that in the tooltip. That **** makes sense! Also I googled binary vs linear and all it wants me to read about is why either binary or linear search is best. Let D be the subcode of C spanned (as a vector space) by all words of C having even weight. Let w∈C be an odd weight word. One can begin by showing that, given two words w1 and w2∈C, the word w1+w2 has even weight iff the weights of w1 and w2 are of the same evenness. The claim follows from a couple of remarks. First, each word in the subcode D has even weight and the coset w+D consists of odd weight words only. Second, C is the disjoint union D∪(w+D). As the sets D and w+D have the same cardinality, D contains exactly half of all words of C, i.e. 2k−1 ones. Thus, the subcode D has codimension 1 . Also, as D can be described as the kerner of the (augmentation) homomorphism ϕ:C→F2,(x1,…,xn)↦ϕx1+…+xn, the claim can be proven (by means of linear algebra) using the isomorphism between C/kerϕ and imϕ. Notice that in this context D and w+D are the two classes in the quotient vector space C/D. Sigh.
< Message edited by Leslac -- 7/30/2020 10:20:26 PM >
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