[a, b] : a ≤ x ≤ b
[a, b) : a ≤ x < b
(a, b] : a < x ≤ b
(a, b) : a < x < b
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.
32
1,000,000 in Scientific Notation = 1 x 106
how Yu express 0.55 in engineering notation
325 kg in Scientific Notation = 3.25 x 102 kg
x - 2 is not a inequality and so the question does not make any sense.
An equality defines a specific point (or points). An inequality can define an interval.
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.
-4
(-3,3)
-4
Interval notation is a method of writing down a set of numbers. An example of this is all numbers that are greater than five.Ê
The inequality ( x < 7 ) defines the interval ( (-\infty, 7) ). This means that all real numbers less than 7 are included in the solution set, while 7 itself is not included. Conversely, if the inequality were ( x > 7 ), it would define the interval ( (7, \infty) ).
Why interval, notation cannot be used to represent instead of atomic masses
It seems there might be a typo in your question. If you meant to ask about the inequality ( x < 8 ), the graph would be a number line with an open circle at 8, indicating that 8 is not included, and shading to the left to show all numbers less than 8. In interval notation, this is expressed as ( (-\infty, 8) ). If you meant something else, please clarify!
The statement "X0" is unclear, but if you are referring to an inequality such as x > 0 or x ≤ 0, it indicates that there are infinite solutions within the specified range. For instance, if the inequality is x > 0, the solutions include all positive real numbers. These solutions can be represented on a number line or in interval notation, such as (0, ∞) for x > 0.
0 < a < ∞