MATH 2113 - Assignment 4 Solutions
... 7.1.3 c) This is not a function since there are two arrows pointing out of ’4’. d) This is a function since every element of X has a unique arrow associated with it. e) This is not a function since it is not defined for all elements of X. There is no arrow associated with ’2’. 7.1.8 - These function ...
... 7.1.3 c) This is not a function since there are two arrows pointing out of ’4’. d) This is a function since every element of X has a unique arrow associated with it. e) This is not a function since it is not defined for all elements of X. There is no arrow associated with ’2’. 7.1.8 - These function ...
Discrete Math 6A
... -For all x and for all y if x is positive and y is negative then their product must be negative. -The product of a positive and a negative real number id negative. Translate this sentence into a logical expressions. “If a person is female and is a parent, then she is someone’s mother.” F(x) is “x is ...
... -For all x and for all y if x is positive and y is negative then their product must be negative. -The product of a positive and a negative real number id negative. Translate this sentence into a logical expressions. “If a person is female and is a parent, then she is someone’s mother.” F(x) is “x is ...
notes 1 on terms File
... a way of picturing relationships between different groups of things (sets/subsets) Named for the person who created it...John Venn universal set: rectangle ; represents everything in context of the problem sub-sets: circles inside the rectangle each element in the universal set occurs only once. if ...
... a way of picturing relationships between different groups of things (sets/subsets) Named for the person who created it...John Venn universal set: rectangle ; represents everything in context of the problem sub-sets: circles inside the rectangle each element in the universal set occurs only once. if ...
Readings for Lecture/Lab 1 – Sets and Whole Numbers How are the
... How many other distinct one-to-one correspondences could be made where a, b, c are kept in the same order? What are they? That is, how many different one-to-one correspondences could be made? Important Note. Equal sets are equivalent, but equivalent sets may not be equal. This was illustrated in the ...
... How many other distinct one-to-one correspondences could be made where a, b, c are kept in the same order? What are they? That is, how many different one-to-one correspondences could be made? Important Note. Equal sets are equivalent, but equivalent sets may not be equal. This was illustrated in the ...
01-12 Intro, 2.1 Sets
... One-to-One Correspondence An important concept in learning numbers is what we call a one-to-one correspondence. ...
... One-to-One Correspondence An important concept in learning numbers is what we call a one-to-one correspondence. ...
Lesson 1 – Types of Sets and Set Notation
... Infinite Set – A set with an infinite number of elements ...
... Infinite Set – A set with an infinite number of elements ...