5
Irrational Numbers which are a subset of Real Numbers which are a subset of Complex Numbers ...
A square root can belongs to the following subsets:complex numbersreal numbersrational numbersintegers
Rational (ℚ) which is a subset of Real (ℝ) which is a subset of Complex (ℂ).
I'm just telling you this ahead of time...but i'm not 100% sure with this answer..: fractions belong in the Rational Numbers
Each of the following is a subset of the real numbers: -- the odd numbers -- the even numbers -- the numbers greater than 4 -- the numbers containing the digit '7' -- the abcissas of points in the 3rd quadrant -- the first 269 multiples of 'pi' -- the number of fish in each of the Seven Seas -- the numbers that have the letter 'L' in their English names
Negative numbers.
Irrational Numbers which are a subset of Real Numbers which are a subset of Complex Numbers ...
A square root can belongs to the following subsets:complex numbersreal numbersrational numbersintegers
-28 belongs to: Integers, which is a subset of rationals, which is a subset of reals, which is a subset of complex numbers.
No, they can belong to infinitely many subsets.
It belongs to the rational numbers which is a subset of the real numbers. The reals, in turn, is a subset of complex numbers.
They are irrational numbers
Rational (ℚ) which is a subset of Real (ℝ) which is a subset of Complex (ℂ).
It belongs to any set that contains it: for example, {4.75, -12, pi, sqrt(5), 29}. It belongs to the set of integers which is a proper subset of rational numbers which is a proper subset of real numbers which is a proper subset of complex numbers. So -12 belongs to all the above sets.
No, rational numbers are not a subset of integers.
A whole number is not a set of any kind and so cannot be a subset of rational numbers.
The subset consisting of the one number, 7.5 : {7.5}