how would I do this

To solve the inequality 23x ≤ 5, you need to divide both sides of the inequality by 23 to isolate x.

Dividing both sides by 23:

x ≤ 5/23

The solution is x is less than or equal to 5/23.

Now, to determine which graph shows the solution, you would look for the graph that represents values of x that are less than or equal to 5/23.

Solve the inequality 2/3x≤5 . Which of the following graphs shows the solution?  how would I do this

To solve the inequality 2/3x ≤ 5, you need to multiply both sides of the inequality by 3/2 to isolate x.

Multiplying both sides by 3/2:

(3/2)(2/3)x ≤ (3/2)(5)
x ≤ 15/2

The solution is x is less than or equal to 15/2.

To determine which graph shows the solution, you would look for the graph that represents values of x that are less than or equal to 15/2.

what does that mean when the graphs only go to 10

If the graphs only go up to 10 and the solution of the inequality is 15/2, it means that the given graphs do not show the complete solution to the inequality. The solution to x ≤ 15/2 extends beyond the range of the graphs provided. Therefore, none of the given graphs would show the complete solution to the inequality x ≤ 15/2.

so which do I pick one goes to 7.5 one goes to almost 6 one goes to 3 and one goes to 4 they're all closed circles

Based on the values provided, you should choose the graph that goes up to 7.5, as it is the closest approximation to the solution 15/2. Select the graph that extends the furthest to the right or has the highest maximum value among the given options.