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Since confederation in 1867 through to the contemporary era, decadal and demi-decadal census reports in Canada have compiled detailed immigration statistics. During this period, the highest annual immigration rate in Canada occurred in 1913, when 400,900 new immigrants accounted for 5.3 percent of the total population, [1] [2] while the greatest number of immigrants admitted to Canada in ...
This theory of deductive reasoning – also known as term logic – was developed by Aristotle, but was superseded by propositional (sentential) logic and predicate logic. [citation needed] Deductive reasoning can be contrasted with inductive reasoning, in regards to validity and soundness. In cases of inductive reasoning, even though the ...
The Immigration Act, 1976, insured by the Parliament of Canada, was the first immigration legislation to clearly outline the objectives of Canadian immigration policy, define refugees as a distinct class of immigrants, and mandate the Canadian government to consult with other levels of government in the planning and management of immigration.
A form of deductive reasoning in Aristotelian logic consisting of three categorical propositions that involve three terms and deduce a conclusion from two premises. category In mathematics and logic, a collection of objects and morphisms between them that satisfies certain axioms, fundamental to category theory. category theory
In addition to deductive inference and defeasible inference, there is also probabilistic inference. [12]: 65–69 A probabilistic version of the generalization, "birds can fly", might be: "There is a 75% chance that a bird will be found to be able to fly" or "if something is a bird it probably can fly". The probabilistic version is also capable ...
In philosophy of logic and logic, specifically in deductive reasoning, a rule of inference, inference rule or transformation rule is a logical form consisting of a function which takes premises, analyzes their syntax, and returns a conclusion (or conclusions).
A mathematical proof is a deductive argument for a mathematical statement, showing that the stated assumptions logically guarantee the conclusion. The argument may use other previously established statements, such as theorems ; but every proof can, in principle, be constructed using only certain basic or original assumptions known as axioms ...
In this way, it contrasts with deductive reasoning examined by formal logic. [35] Non-deductive arguments make their conclusion probable but do not ensure that it is true. An example is the inductive argument from the empirical observation that "all ravens I have seen so far are black" to the conclusion "all ravens are black".