on 19-Sep-2018 (Wed)

Annotation 3317069909260

 A line object is a special edge object because it is straight whereas a edge object can be curved (see objects circle , ellipse , and arc )

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Annotation 3317071482124

 o build circle : New entity Basic Circle The circle object will create a curved edge object that closes on itself. So it has only one object vertex (but which is not the center!)

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Annotation 3317076725004

 The Bezier curve ( ): is a edge curved object defined by its control points (Beziers polynomials). The set constitutes a (single) object edge curve (which can constitute an open or closed curve). This object contains two vertex objects and one edge object for the open case and one vertex object for the closed case. It can also be defined by a parametric parametric equation with three parameters. Since this curve is not interpolating, it does not pass through all vertex objects but only by the first and the last

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Annotation 3317084589324

 extruding a wire will create an object of type shell extruding a face will create an object of type solid

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Annotation 3317086424332

 n Salome, an object block is a geometric entity that will allow to mesh with rectangles or hexahedrons.

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Annotation 3317099007244

 Fusing and cutting can only be done between objects of the same topolgical dimension

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Annotation 3317100580108

 The operation makes the partition by creating a compound object

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Annotation 3317102152972

 Inspection Normal to a Face to get the normal to a face object

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Annotation 3317103725836

 For dimensioning objects, you can change the display properties (units, size and font color) in the File Preferences menu.

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Annotation 3317105298700

 It is a good reflex to use Inspection Check Shape before performing complex topological operations.

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Annotation 3317106871564

 The notion of publish: the objects displayed in the tree are published objects. They can be unpublished without removing them to lighten the tree

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Annotation 3317108444428

 An unpublished object is not deleted but simply disappears from the object browser

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Annotation 3317110017292

 When creating complex objects, you can ask Salome to display a dependency tree of these objects with Show Dependency tree in the context menu attached to the object in the tree

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Annotation 3317111590156

 here is a more global utility to clean up a study of its objects, either by deleting them or by unpublishing them. This utility is activated by the contextual menu on an object, by selecting Reduce study

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Annotation 3317113163020

 Difference between compound and fusing

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Flashcard 3317412793612

Question
Coulomb’s law is only applicable for

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Annotation 3317416201484

 It may be useful to modify the order of creation of the sub-meshes for example when there are geometrical entities common to each other. For this purpose Mesh Change sub-mesh priority is used.

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Annotation 3317423803660

 There are duplicate nodes between plate and beam. You can "glued" plate and beam in code aster with command LIAISON ELEM but only if the plate used quadratic elements. If you merge duplicate nodes, the rotational degree of freedom from beam must been clamped

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Flashcard 3317427473676

Question
A nominal measurement scale satisfies the condition of [...]
An ordinal scale satisfies [...]
An interval scale satisfies [...]
A ratio scale satisfies [...]
1. Identity : each value has a unique meaning.
2. Identity AND magnitude : values can be ordered from smaller to larger
3. Identity, magnitude AND equal intervals : difference between 3 and 4 is the same than the difference between 19 and 20 for example
4. Identity, magnitude, equal intervals AND minimum of zero : example : Weight cannot be below zero.

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Flashcard 3317429832972

Question
How to find Pearson’s correlation for a population? For a sample?
Using $$\sum {xy} \over {\sqrt {\sum x^2 \times \sum y^2}}$$ for a population and $$r={1\over n-1} \times \sum ({(x_i -\hat{x})\over s_x}\times{(y_i -\hat{y})\over s_y})$$ for a sample

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Flashcard 3317558545676

Question
1X802.1X
[default - edit me]

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Flashcard 3317567720716

Question
How to Find a Linear Regression Equation?
The linear equation formula is
y'=a+bx

Here :
a = y - b * x
and
...

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Annotation 3317588954380

 #aristoteles #wiki According to Aristotle in On the Heavens, the heavenly bodies are the most perfect realities, (or "substances"), whose motions are ruled by principles other than those of bodies in the sublunary sphere

On the Heavens - Wikipedia
is astronomical theory and his ideas on the concrete workings of the terrestrial world. It should not be confused with the spurious work On the Universe (De mundo, also known as On the Cosmos). <span>According to Aristotle in On the Heavens, the heavenly bodies are the most perfect realities, (or "substances"), whose motions are ruled by principles other than those of bodies in the sublunary sphere. The latter are composed of one or all of the four classical elements (earth, water, air, fire) and are perishable; but the matter of which the heavens are made is imperishable aether,

Flashcard 3317591837964

Tags
#aristoteles #wiki
Question
According to [...] in [...] , the heavenly bodies are the most perfect realities, (or "substances"), whose motions are ruled by principles other than those of bodies in the sublunary sphere
Aristotle
On the Heavens

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According to Aristotle in On the Heavens, the heavenly bodies are the most perfect realities, (or "substances"), whose motions are ruled by principles other than those of bodies in the sublunary sphere

Original toplevel document

On the Heavens - Wikipedia
is astronomical theory and his ideas on the concrete workings of the terrestrial world. It should not be confused with the spurious work On the Universe (De mundo, also known as On the Cosmos). <span>According to Aristotle in On the Heavens, the heavenly bodies are the most perfect realities, (or "substances"), whose motions are ruled by principles other than those of bodies in the sublunary sphere. The latter are composed of one or all of the four classical elements (earth, water, air, fire) and are perishable; but the matter of which the heavens are made is imperishable aether,

Flashcard 3317594197260

Tags
#aristoteles #wiki
Question
According to Aristotle in On the Heavens, the heavenly bodies are the most perfect realities, (or "[...]"), whose [...] are ruled by principles other than those of bodies in the sublunary sphere
substances
motions

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Open it
According to Aristotle in On the Heavens, the heavenly bodies are the most perfect realities, (or "substances"), whose motions are ruled by principles other than those of bodies in the sublunary sphere

Original toplevel document

On the Heavens - Wikipedia
is astronomical theory and his ideas on the concrete workings of the terrestrial world. It should not be confused with the spurious work On the Universe (De mundo, also known as On the Cosmos). <span>According to Aristotle in On the Heavens, the heavenly bodies are the most perfect realities, (or "substances"), whose motions are ruled by principles other than those of bodies in the sublunary sphere. The latter are composed of one or all of the four classical elements (earth, water, air, fire) and are perishable; but the matter of which the heavens are made is imperishable aether,

Annotation 3317596556556

 #aristoteles #wiki Aristotle seems to regard celestial bodies as living beings with a rational soul as their form

On the Heavens - Wikipedia
hich, unlike the earthly up-and down-ward locomotions, can last eternally selfsame. As substances, celestial bodies have matter (aether) and form (a given period of uniform rotation). Sometimes <span>Aristotle seems to regard them as living beings with a rational soul as their form[1] (see also Metaphysics, bk. XII). This work is significant as one of the defining pillars of the Aristotelian worldview, a school of philosophy that dominated intellectual thinking fo

Flashcard 3317600226572

Tags
#aristoteles #wiki
Question
[...] seems to regard celestial bodies as living beings with a rational soul as their form
Aristotle

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Aristotle seems to regard celestial bodies as living beings with a rational soul as their form

Original toplevel document

On the Heavens - Wikipedia
hich, unlike the earthly up-and down-ward locomotions, can last eternally selfsame. As substances, celestial bodies have matter (aether) and form (a given period of uniform rotation). Sometimes <span>Aristotle seems to regard them as living beings with a rational soul as their form[1] (see also Metaphysics, bk. XII). This work is significant as one of the defining pillars of the Aristotelian worldview, a school of philosophy that dominated intellectual thinking fo

Annotation 3317601799436

 #aristoteles #wiki Aristotelian philosophy and cosmology was influential in the Islamic world, where his ideas were taken up by the Falsafa school of philosophy

On the Heavens - Wikipedia
s derived. Contents 1 Historical connections 2 Translations 2.1 English 2.2 French 2.3 German 2.4 Italian 3 See also 4 References 5 Further reading 6 External links Historical connections <span>Aristotelian philosophy and cosmology was influential in the Islamic world, where his ideas were taken up by the Falsafa school of philosophy throughout the later half of the first millennia AD. Of these, philosophers Averroes and Avicenna are especially notable. Averroes in particular wrote extensively about On The Heavens,

Flashcard 3317604683020

Tags
#aristoteles #wiki
Question
Aristotelian philosophy and cosmology was influential in the Islamic world, where his ideas were taken up by the [...] school of philosophy
Falsafa (uma indicação para parte filosófica islâmica de matematica, lógica e física)

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Aristotelian philosophy and cosmology was influential in the Islamic world, where his ideas were taken up by the Falsafa school of philosophy

Original toplevel document

On the Heavens - Wikipedia
s derived. Contents 1 Historical connections 2 Translations 2.1 English 2.2 French 2.3 German 2.4 Italian 3 See also 4 References 5 Further reading 6 External links Historical connections <span>Aristotelian philosophy and cosmology was influential in the Islamic world, where his ideas were taken up by the Falsafa school of philosophy throughout the later half of the first millennia AD. Of these, philosophers Averroes and Avicenna are especially notable. Averroes in particular wrote extensively about On The Heavens,

Annotation 3317608877324

 #aristoteles #wiki Aristotle argues that the cosmos and its heavenly bodies are in perpetual motion and always has been

Ancient Greek Philosophy | Internet Encyclopedia of Philosophy
y tanned, and is actually in the process of this potentiality. So, motion is the actuality of the potentiality of a being, in the very way that it is a potentiality. In Book 8.1 of the Physics, <span>Aristotle argues that the cosmos and its heavenly bodies are in perpetual motion and always has been. There could not have been a time with no motion, whatever is moved is moved by itself or by another. Rest is simply a privation of motion. Thus, if there were a time without motion, th

Flashcard 3317611760908

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#aristoteles #wiki
Question
Aristotle argues that the cosmos and its heavenly bodies are in perpetual [...] and always has been
motion

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Aristotle argues that the cosmos and its heavenly bodies are in perpetual motion and always has been

Original toplevel document

Ancient Greek Philosophy | Internet Encyclopedia of Philosophy
y tanned, and is actually in the process of this potentiality. So, motion is the actuality of the potentiality of a being, in the very way that it is a potentiality. In Book 8.1 of the Physics, <span>Aristotle argues that the cosmos and its heavenly bodies are in perpetual motion and always has been. There could not have been a time with no motion, whatever is moved is moved by itself or by another. Rest is simply a privation of motion. Thus, if there were a time without motion, th

Annotation 3317614644492

 #anaximandro #wiki Anaximander (pré-socrático) speculated and argued about "the Boundless" as the origin of all that is.

Anaximander | Internet Encyclopedia of Philosophy
t Encyclopedia of Philosophy Internet Encyclopedia of Philosophy Search Primary Menu Skip to content A B C D E F G H I J K L M N O P Q R S T U V W X Y Z × search Anaximander (c. 610—546 B.C.E.) <span>Anaximander was the author of the first surviving lines of Western philosophy. He speculated and argued about "the Boundless" as the origin of all that is. He also worked on the fields of what we now call geography and biology. Moreover, Anaximander was the first speculative astronomer. He originated the world-picture of the open universe,

Flashcard 3317618314508

Tags
#anaximandro #wiki
Question
Anaximander (pré-socrático) speculated and argued about "the [...]" as the origin of all that is.

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Anaximander (pré-socrático) speculated and argued about "the Boundless" as the origin of all that is.

Original toplevel document

Anaximander | Internet Encyclopedia of Philosophy
t Encyclopedia of Philosophy Internet Encyclopedia of Philosophy Search Primary Menu Skip to content A B C D E F G H I J K L M N O P Q R S T U V W X Y Z × search Anaximander (c. 610—546 B.C.E.) <span>Anaximander was the author of the first surviving lines of Western philosophy. He speculated and argued about "the Boundless" as the origin of all that is. He also worked on the fields of what we now call geography and biology. Moreover, Anaximander was the first speculative astronomer. He originated the world-picture of the open universe,

Flashcard 3317620673804

Tags
#anaximandro #wiki
Question
Anaximander (pré-socrático) speculated and argued about "the Boundless" as the [...] of all that is.