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- Dictionaryobviously/ˈɒbvɪəsli/
adverb
- 1. in a way that is easily perceived or understood; clearly: "she was obviously unwell"
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3 days ago · Happiness, in psychology, a state of emotional well-being that a person experiences either in a narrow sense, when good things happen in a specific moment, or more broadly, as a positive evaluation of one’s life and accomplishments overall—that is, subjective well-being.
- Smiling
In human behaviour: The newborn infant. Smiling during...
- Smiling
3 days ago · letter or group of letters added to the end of a word to make a new word. in common parlance. using the words that most people use in ordinary conversation. building blocks. the basic parts that...
5 days ago · Here is the truth table for & : The logical operator & is analogous to multiplication in arithmetic. All the remaining logical operations can be defined in terms of !, |, and & ; for that reason (and their simplicity) the operations !, | and & are considered fundamental while the others are not.
4 days ago · Obviously, knowledge does not have strong interpersonal independence. The culprit is the truth axiom. Consider, for instance, the two sentences, \ (K_1p\) and \ (\lnot K_2 \lnot p\) for some atomic sentence p. Obviously, the first sentence is not a contradiction and the second is not a theorem.
5 days ago · creativity, the ability to make or otherwise bring into existence something new, whether a new solution to a problem, a new method or device, or a new artistic object or form. Individual qualities of creative persons. A number of personality characteristics have been shown to be associated with creative productivity.
5 days ago · Study with Quizlet and memorize flashcards containing terms like Determine whether the given topic is more obviously suitable for a report or an essay. The History of the Railroad, Determine whether the given topic is more obviously suitable for a report or an essay.
4 days ago · For , define (obviously, if then and , so we define , similarly for the case ), then is a well-defined function. To check that , we simply use the fact that they are inverses in ; if , then If we manage to show that is order-preserving, then by the above argument, .