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weese
▪ I. weese, weeze, v. Obs. exc. dial. (wiːz) Forms: 1 wésan, 5 wese, 6–7 wheeze, 8–9 dial. weeze, 6– weese. [OE. wésan (:—*wōsjan), f. wós ooze n.1] intr. To ooze, drip or distil gently.c 1000 Sax. Leechd. II. 44 Þonne ærest onᵹinne se healsᵹund wesan. 14.. Seven Deadly Sins 58 in Pol. Rel. & L. Poe... Oxford English Dictionary
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Weese
Weese may refer to: Places Weese, Randolph County, West Virginia Weese, Webster County, West Virginia People with the name Weese Ben Weese (born 1929 ), American architect Harry Weese (1915–1998), American architect John Aaron Weese (1891–1981), Canadian politician Miranda Weese, American ballet dancer wikipedia.org
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weese allan
weese allan (also wease alley), an alleged local name of the skua (cf. scouty-aulin).1849 Zoologist VII. 2393 The common skua is a ‘wease-alley’. 1885 Swainson Prov. Names Birds 210 Richardson's Skua (Stercorarius crepidatus)... Weese allan (Orkney Isles). Oxford English Dictionary
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Weese, Randolph County, West Virginia
Weese is an unincorporated community in Randolph County, West Virginia, United States. wikipedia.org
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Ben Weese
Weese is the younger brother of Chicago architect Harry Weese. In 1977, Weese opened his own firm, Weese Seegers Hickey Weese, with his wife. wikipedia.org
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Weese, Webster County, West Virginia
Weese is an unincorporated community in Webster County, West Virginia, United States. wikipedia.org
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Possible typo in Just/Weese's set theory In Just Weese on page 197 there are the following corollaries: !enter image description here !enter image description here !enter image description here !enter image descri...
The next two paragraph give a proof of Corollary 24. The content of this proof is that if there are no inaccessible cardinals then we are done; otherwise there is a least inaccessible $\lambda$, in which case Lemma 25 proves that $\langle V_\lambda,\overline\in\rangle$ is a model of ZF+"There are no...
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John Aaron Weese
John Aaron Weese (6 March 1891 – 12 July 1981) was a Conservative member of the House of Commons of Canada. Weese attended school at Rossmore, Ontario. wikipedia.org
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If $Y$ not transitive then $\in$ not extensional? Let $W$ be a binary relation on a set $Y$. The relation $W$ is called extensional if $$ \forall x,y \in Y (x \neq y \rightarrow \exists z \in Y (( \langle z,x \rangle ...
Consider $Y=\\{\varnothing,\\{1\\}\\}$. From the point of view of $Y$ neither contain any elements, because $1\notin Y$. But these are different sets. To say that $\langle Y,\in\rangle$ is extensional is to say that the following is true: $$\forall x\in Y\forall y\in Y(x=y\leftrightarrow\forall z\in...
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Klaus Weese
Klaus Weese (born 20 November 1967) is a German former freestyle skier. He competed at the 1992 Winter Olympics and the 1994 Winter Olympics. wikipedia.org
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Constructing a bijection between $\xi$ and $\xi + 1$ I did the following exercise, can you tell me if I have it right, thank you (Just/Weese p 176): Show that $|\xi + 1|$ is either finite or equal to $|\xi|$. (here $...
It seems a bit convoluted. More simply you could say that if $\xi \ge \omega$ then you can define a bijection $f:\xi+1 \to \xi$ as follows: * $f(\xi) = 0$ * If $\alpha \in \xi$ and $\alpha < \omega$ then $f(\alpha)=\alpha+1$ * If $\alpha \in \xi$ and $\alpha \ge \omega$ then $f(\alpha) = \alpha$ Thi...
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Harry Weese
Early life and education Weese was born on June 30, 1915, in Evanston, Illinois, as the first son of Harry E. and Marjorie Weese. Weese moved back to Chicago after the war in 1945 and rejoined SOM. In 1947, Weese started his independent design firm, Harry Weese Associates. wikipedia.org
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Showing that the equivalence class of partial orders order isomorphic to $(X, \leq)$ is not a set I'm trying to do the following (original image): > EXERCISE 25(R):(a) Argue on the grounds of the architect's view of ...
Let $(P,\leq)$ be a poset with $P\neq\emptyset$. Let $x$ be any element of $P$ and $y$ be any element not in $P$. Replace $x$ by $y$ and you have an isomorphic poset containing $y$. So every set is contained in some equivalent poset and the class of equivalent posets cannot be bounded above in the c...
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Miranda Weese
Early life and training Weese was born in San Bernardino, California. In 1995, Weese won the Princess Grace Award. In 1996, shortly before she turned 21, Weese was named principal dancer. wikipedia.org
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How many cardinals are there? I'm trying to do the following exercise: > EXERCISE 9(X): Is there a natural end to this process of forming new infinite cardinals? We recommend this exercise instead of counting sheep w...
I don’t know what they have in mind, but the process as described goes only $\omega$ steps. To go further, you have take the union of what you already have and start over. That is, the process of repeatedly taking the power set will get you $\beth_0,\beth_1,\beth_2,\dots$ and hence $\beth_n$ for eac...
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