Describe a graph of the solution to x−0.3<3.2 ?(1 point) (closed circle, open circle, etc?)
To sketch the graph of the solution to the inequality x - 0.3 < 3.2, we need to determine the type of circle to use to represent the solution.
First, let's isolate x in the inequality:
x - 0.3 < 3.2
x < 3.2 + 0.3
x < 3.5
This inequality states that x is less than 3.5. Therefore, the graph of the solution will include all values that are less than 3.5.
To represent this on a number line graph, we use an open circle to indicate that the point 3.5 is not included in the solution. This means that the circle representing 3.5 is not shaded. The arrow on the number line starts from 3.5 and extends to the left, indicating all values less than 3.5.
Therefore, the graph of the solution to x - 0.3 < 3.2 is an open circle on 3.5, with the line extending to the left.