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indeterminacy
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indeterminacy
indeˈterminacy [f. next: see -acy.] a. The quality of being indeterminate; want of determinateness or definiteness.1649 Bp. Reynolds Hosea vi. 72 Such an indifferency and indeterminacy in the manner of working. 1879 Thomson & Tait Nat. Phil. I. i. §337 The linear transformation ceases to be wholly d...
Oxford English Dictionary
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Indeterminacy
Indeterminacy or underdeterminacy may refer to:
Law
Indeterminacy debate in legal theory
Underdeterminacy (law)
Linguistics
Indeterminacy of translation Referential indeterminacy
Philosophy
Indeterminacy (philosophy)
Indeterminism, the belief that not all events are causally determined
Deterministic
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Indeterminacy (philosophy)
Indeterminacy of meaning and translation
See:
Willard Van Orman Quine: indeterminacy of translation, indeterminacy of reference
Donald Davidson: indeterminacy (See Heisenberg's indeterminacy principle.)
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Indeterminacy (literature)
Indeterminacy is not ambiguity
In literature, indeterminacy is sometimes confused with the idea of ambiguity, as the two are very alike. So, indeterminacy is not always purposeful.
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Removing $1^{\infty}$ indeterminacy There is a way to remove $1^{\infty}$ indeterminate form by considering it as function as $(f(x)/g(x))^{h(x)}$ and then converting it to form $e^{((f(x)/g(x))-1)\cdot h(x)}$. Can y...
Basically, you can rewrite it as: $$\lim f(x)^{h(x)}=e^{\lim \ln (f(x)) h(x)}$$ Now you just resolve the upper limit whatever way you want. It entirely depends on each case. You may have noticed that it's not necessary to split $f(x)$ into a fraction, but it may be useful. As $\lim f(x)=1$, it could...
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Indeterminacy (music)
The former case is called 'indeterminacy of composition'; the latter is called 'indeterminacy of performance'." John Cage is regarded as a pioneer of indeterminacy in music.
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A simple problem with limit I would like to solve the indeterminacy presents in this limit $\displaystyle \lim_{x \rightarrow -\infty} x F(x)$, in which $F(x)$ is a distribution function of a random variable $X$. ...
This is actually false. Consider: $$F(x) = \begin{cases} \left|\frac{1}{x+2}\right| & x 0 \end{cases}$$ $F(x)$ is a cumulative distribution function (since it is continuously differentiable and nondecreasing, with limit to $-\infty$ at $0$ and limit to $+\infty$ at $1$), but $$\lim_{x \to -\infty} x...
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Indeterminacy in computation
explicit source of indeterminacy, as with deliberately randomized algorithms, for the benefits that this provides. algorithm
In concurrency:
indeterminacy in concurrent computation
unbounded nondeterminism
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Indeterminacy in concurrent computation
Indeterminacy in concurrent computation is concerned with the effects of indeterminacy in concurrent computation. Indeterminacy in arbiters produces indeterminacy in Actors.
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Generalization of L'Hospital's rule If $f$ and $g$ are differentiable functions at $(a,b)$ where $-\infty\leqslant a<b\leqslant +\infty$. Also $f(x),g(x)\to 0$ as $x\to a$ or $f(x),g(x)\to \pm \infty$ as $x\to a$ and ...
If $$\displaystyle\lim_{x\to a}\frac{f^{(k)}}{g^{(k)}}$$ exists and $f^{(k-1})$, $g^{(k-1)}\to 0$ or $\pm\infty$, then the theorem guarantees that $$\displaystyle\lim_{x\to a}\frac{f^{(k-1)}}{g^{(k-1)}}$$ exists and is equal. Then, if $f^{(k-2})$, $g^{(k-2)}\to 0$ or $\pm\infty$, $$\displaystyle\lim...
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Indeterminacy problem
The indeterminacy problem is posed as a kind of paradox in the study of the sociology and history of science.
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On the Forms and Thorns of Linguistic Indeterminacy in Chinese Law
Abstract and Figures. This study addresses the different types and implications of linguistic indeterminacy in Chinese law. It firstly draws on the studies of scholars of different disciplines ...
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Definite integral $\int\limits_{-\infty}^{\infty} x (\arctan x)' dx$ I need to calculate definite integral $$I = \int\limits_{-\infty}^{\infty} x (\arctan x)' dx$$ I try it as usual but I have indeterminacy $\ln |x^2...
Notice: $$f(x) = x(\arctan x)'=x \cdot \frac{1}{1+x^2}$$ This is an **odd** function (i.e. $f(x) = -f(-x)$), and thus the integration result is $0$. **EDIT per comment** The integration does not exist unless we consider Cauchy principle value: $$\int_{-\infty}^{+\infty}f(x) \,dx =: \lim_{R \rightarr...
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Indeterminacy of translation
Three aspects of indeterminacy arise, of which two relate to indeterminacy of translation. Indeterminacy of reference
Indeterminacy of reference refers to the interpretation of words or phrases in isolation, and Quine's thesis is that no unique
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