Sure, here are the infimum and supremum of each set:

A := {2n : n ∈ N},
The infimum of set A is 2 because as n starts from 1 in natural numbers, the smallest value 2n can take is 2. The supremum does not exist because n can take any value in natural numbers, making 2n infinitely large.

B := {2−n : n ∈ N},
The infimum of set B is 0 because as n becomes infinitely large, 2^-n approaches 0. The supremum of set B is 2 because as n starts from 1 in natural numbers, the largest value 2^-n can take is 1/2.

C := {2n + 1 : n ∈ N},
The infimum of set C is 3 because as n starts from 1 in natural numbers, the smallest value 2n + 1 can take is 3. The supremum does not exist because n can take any value in natural numbers, making 2n + 1 infinitely large.

Question

Sure, here are the infimum and supremum of each set:

A := {2n : n ∈ N},
The infimum of set A is 2 because as n starts from 1 in natural numbers, the smallest value 2n can take is 2. The supremum does not exist because n can take any value in natural numbers, making 2n infinitely large.

B := {2−n : n ∈ N},
The infimum of set B is 0 because as n becomes infinitely large, 2^-n approaches 0. The supremum of set B is 2 because as n starts from 1 in natural numbers, the largest value 2^-n can take is 1/2.

C := {2n + 1 : n ∈ N},
The infimum of set C is 3 because as n starts from 1 in natural numbers, the smallest value 2n + 1 can take is 3. The supremum does not exist because n can take any value in natural numbers, making 2n + 1 infinitely large.

Knowee AI · Accepted Answer

Sure, here are the infimum and supremum of each set:

A := {2n : n ∈ N},
The infimum of set A is 2 because as n starts from 1 in natural numbers, the smallest value 2n can take is 2. The supremum does not exist because n can take any value in natural numbers, making 2n infinitely large.

B := {2−n : n ∈ N},
The infimum of set B is 0 because as n becomes infinitely large, 2^-n approaches 0. The supremum of set B is 2 because as n starts from 1 in natural numbers, the largest value 2^-n can take is 1/2.

C := {2n + 1 : n ∈ N},
The infimum of set C is 3 because as n starts from 1 in natural numbers, the smallest value 2n + 1 can take is 3. The supremum does not exist because n can take any value in natural numbers, making 2n + 1 infinitely large.

Find the infimum and supremum, if they exist, of each of the following sets.(Indicate that the infimum or supremum does not exist if they do not exist. Justificationsare not required.)A := {2n : n ∈ N},B := {2−n : n ∈ N},C := 12n + 1 : n ∈ N

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Find the infimum and supremum, if they exist, of each of the following sets.(Indicate that the infimum or supremum does not exist if they do not exist. Justificationsare not required.)A := {2n : n ∈ N},B := {2−n : n ∈ N},C := 12n + 1 : n ∈ N

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Find the infimum and supremum, if they exist, of each of the following sets.(Indicate that the infimum or supremum does not exist if they do not exist. Justificationsare not required.)A := {2n : n ∈ N},B := {2−n : n ∈ N},C := 12n + 1 : n ∈ N