Overlapping Sets Flashcards
Set matrix
what are some unique formulas that arise when dealing with overlap of TWO sets A, and B
1) total number of unique elements in the set = (# only A) + (# only B) + (neither A or B) + (both A & B)
2) total # unique elements in the set = (# A) + (#B) - (both A & B) + (neither A or B)
how do we deal with cases where the number of items in a set are not given, and instead are represented as a % of the total?
1) either assume the total number of items is 100
2) assign a variable to represent the total number of items in set
how do we deal with cases where the number of items are represented in fractional form instead of given explicitly or represented as a percent?
1) let the total be the LCM of all the fraction denominators
2) let the total be some variable
if some of the item numbers are actually defined as opposed to being percents or fractions of the total, how do we do our calculations?
have to base them off the total number - cant use notional “100” total for percents or LCM of denominators for fractions
when algebra is required in setting up overlapping set matrix…
pay very careful attention to language describing amounts of each item so you don’t mess up
what do we need to determine the number of elements belonging to exactly one group?
values for the total, both, and neither
what is the formula for finding the number of members in either set A or set B?
members in either A or B = (# in A only) + (# in B only) + (# in both A and B)
how do you determine the total number of members in either set A or B when you are given total number of items in set A and B?
members in either A or B = total in A + total in B - # items in both A and B
three set overlap venn diagram
whenever there is an overlap in sets A and B, what is the problem with assuming that the sum of the members of groups A and B is the total number of members?
since there are some members part of both groups, it double counts
another screenshot
the number of elements in the entire Group A circle represent the total number of elements that belong to group A, same for groups B and C
in A only + # in B only + # in C only = ?
number of elements with the three sets that belong to only one group
in any X and Y region (overlap in venn diagram of sets X and Y) there will also be elements of Z (from the portion of the overlap in the very center that contains the intersection of X and Y and Z
this means that saying the venn diagram region of “X and Y” is not equivelant to saying “X and Y only”
number in A & B only =?
(number in A and B) - (number in A, B, and C only)
the total number of unique elements in a group is the sum of all the elements belonging to exactly one group, all the elements belonging to exactly two groups, all the elements belong to exactly three groups, and all the elements belonging to none of the groups - represented as the sum of all the variables in the following screenshot
What formula do you use if you:
1) are given the sum of the X and Y only region (the double overlap region)
2) are asked to find the sum of the X and Y regions
* note the - 2*[# in exactly three groups]
