I will mark brainliest!
Analyze the set below and complete the instructions that follow.
M=(xIx∈R)

Define the complement of the given set. U=R

a. M^c=∅
b. M^c=R
c. M^c=(xIx∈R)
d. M^c=(xIx≤0)

It looks like M is composed of all real numbers and that U = R also means its composed of all real numbers. This means that M and U are equal and both are composed of all real numbers.

To define the complement of M, it includes all values which are not in M. However, since M already has all real numbers and U doesn't have any values that M doesn't then the complement is nothing. It is an empty set with no items in it. This means A is the correct answer.

I will mark brainliest! Analyze the set below and complete the instructions that follow. M=(xIx∈R)Define the complement of the given set. U=Ra. M^c=∅b. M^c=Rc. M^c=(xIx∈R)d. M^c=(xIx≤0)

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I will mark brainliest!
Analyze the set below and complete the instructions that follow.
M=(xIx∈R)

Define the complement of the given set. U=R

a. M^c=∅
b. M^c=R
c. M^c=(xIx∈R)
d. M^c=(xIx≤0)