Answer:
reductionist view
Explanation:
Reductionist view is the philosophical position characterized by the thesis that the properties of the whole can be reduced to the properties of its parts, thus reducing the number of elements in a theory or conclusion and can be applied to phenomena, theories, meanings, objects and even explanations. .
The problem with the reductionist view in a survey is that it can divert attention from larger units of analysis and this can compromise the outcome and completion of the survey and consequently will interfere with problem solving.
Answer:
B. we assess category membership probabilistically, by family resemblance.
Explanation:
Ludwig Joseph Johann Wittgenstein, one of the leading modern philosophers of the twentieth century, a mathematical scholar, member of the Vienna Circle, innovator of the history of logic in the 1920s, respected to this day as one of the creators of analytic philosophy, was born in the city of Vienna, in Austria, April 26, 1889, the result of the union between Karl and Leopoldine Wittgenstein.
He was the first person to advocate participation in a particular matter in a probabilistic manner. His early writings were inspired by the concepts of Arthur Schopenhauer, as well as the recent logical elaborations of Bertrand Russel and Gottlob Frege.
According to Wittgenstein, we must probabilistically evaluate category members of any subject by family resemblance.
Answer:
Loyalists were American colonists who stayed loyal to the British Crown during the American Revolutionary War, often called Tories, Royalists, or King's Men at the time. They were opposed by the Patriots, who supported the revolution, and called them "persons inimical to the liberties of America".
The current thought is that about 20 percent of the colonists were Loyalists — those whose remained loyal to England and King George. Another small group in terms of percentage were the dedicated patriots, for whom there was no alternative but independence.
Explanation:
Answer:
get a job .I'm sorry doing this for something
Explanation:
