Mathematics, 13.09.2019 17:30, j015
2. recall from lecture 3-1 the definition of the restriction of a function f : a + b to a subset c ca, denoted flc. (a) let f: z r be defined by f(n) = sin " find a subset c cz with as many elements as possible, such that flc is injective. (b) let f.9: a + b be two functions. suppose that c and d are subsets of a which are not equal to a, such that flc = glc and fp = g|d. give an example of such sets a, b, c, d and functions f and g such that f and g are not equal. find a condition on c and d that guarantees that f = 9, and prove that your condition works. (try not to make your condition more restrictive than necessary! ) (c) now suppose that c, d are subsets of a, and that f: c β b and g: d β b are functions. what condition on f and g is necessary to ensure that there exists a function h: a + b such that hlc = f and h|d = g?
Answers: 3
Mathematics, 21.06.2019 17:00, Niyah3406
When you are making a circle graph by hand, how do you convert a number for a part into its corresponding angle measure in the circle graph? when you are making a circle graph by hand, what should you do if one of your angle measures is greater than 180Β°?
Answers: 2
Mathematics, 21.06.2019 23:40, nightmarewade03
Determine the standard form of the equation of the line that passes through (-2,0) and (8,-5)
Answers: 1
2. recall from lecture 3-1 the definition of the restriction of a function f : a + b to a subset c...
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