= x²-3x0 =
the set builder notation would be {x|(x=2n)^(28>=x>=4)
don't know too
{x|~<x<-3}
X = {x:x is a factor of 15}
x/x g < 18
Not sure about the set builder notation, but Q = {0}, the set consisting only of the number 0.
Use set builder notation to represent the following set.{... -3, -2, -1, 0}
a builder notation is like this < x/x is a set of nos. up to 7>
A notation used to express the members of a set of numbers.
the set builder notation would be {x|(x=2n)^(28>=x>=4)
don't know too
describing of one object
i don't knoww
x|x is the letter of monkey
The set of all numbers that make an inequality true is known as the solution set. It consists of all the values of the variable that satisfy the given inequality. This set can be expressed using interval notation or set builder notation, depending on the context of the problem. The solution set is crucial in determining the range of values that satisfy the given conditions.
{x|~<x<-3}
A set can be represented using different notations, including roster notation, set-builder notation, and interval notation. In roster notation, a set is listed explicitly with its elements enclosed in curly braces, such as ( A = {1, 2, 3} ). Set-builder notation describes the properties of the elements in a set, for example, ( B = { x | x \text{ is an even number} } ). Interval notation is used primarily for sets of real numbers, indicating a range, such as ( (a, b) ) for all numbers between ( a ) and ( b ), excluding the endpoints.