mixed numbers
-12 belongs to negative integers
2
From the set of numbers you gave, there is no solution.From the set of numbers you gave, there is no solution.From the set of numbers you gave, there is no solution.From the set of numbers you gave, there is no solution.
Assuming that "below" is a typo for "belong", the answer is any set that contains them!For example,{-23, -14, -5, 0, 6, 17, 28},{-23, -14, -5, 0, pi, 6, 9, 12, 17, 28},Z, the set of integers,Q, the set of rational numbers,R, the set of real numbers,C, the set of complex numbers,the set of integers between -30 and +30,the set of rational numbers between -97/4 and 141/5,the set of square roots of all non-negative numbers less than 900.
mixed numbers
Any set that contains -1.2, whether finite or infinite. For example, the set consisting of only -1.2 ie {-1.2}, the set consisting of -1.2 and 5 = {-1.2,5}, the set consisting of -1.2 and 3 and sqrt(17) = {-1.2,3,sqrt(17)}, and so on.
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.
-12 belongs to negative integers
It belongs to many many subsets including: {sqrt(13)}, The set of square roots of integers The set of square roots of primes The set of square roots of numbers between 12 and 27 {3, -9, sqrt(13)} The set of irrational numbers The set of real numbers
The answer is 12 every other numbers are odd numbers, but 12 is an even number
2
From the set of numbers you gave, there is no solution.From the set of numbers you gave, there is no solution.From the set of numbers you gave, there is no solution.From the set of numbers you gave, there is no solution.
Assuming that "below" is a typo for "belong", the answer is any set that contains them!For example,{-23, -14, -5, 0, 6, 17, 28},{-23, -14, -5, 0, pi, 6, 9, 12, 17, 28},Z, the set of integers,Q, the set of rational numbers,R, the set of real numbers,C, the set of complex numbers,the set of integers between -30 and +30,the set of rational numbers between -97/4 and 141/5,the set of square roots of all non-negative numbers less than 900.
12
12 and 18
To find the median of a set of numbers, you first need to arrange them in numerical order. In this case, the numbers are 10, 12, 19, 18, 12, 13, and 12. When arranged in ascending order, the numbers become 10, 12, 12, 12, 13, 18, 19. Since there are seven numbers in the set, the median is the middle number, which in this case is the fourth number, which is also 12. Therefore, the median of the given set of numbers is 12.