f)
Now that you have an additional $300, revise your inequality from part a to reflect your new spending limit. Solve this inequality. Make sure to round to the nearest dollar.
*Do not include the dollar symbol in the inequality
You can copy and paste the inequality sign below in your answer. ≥ < > ≤
≥ $900
Choose the graph of the solution to part f above*
A -600 -400 -200 0 200 400 600 (has a open dot between 600 and 800) 800 1,000 1,200
B -50 0 50 100 150 200 (200 has the dot)
C -200 -150 -100 -50 0 100 150 200 (200 has the open dot) 250 300 350
D -100 0 100 200 300 400 500 600 700 (700 has the dot) 800
Option A
Option B
Option C
Option D
Other:________
Option A
The correct answer is Option D. The graph for the solution to the inequality ≥ $900 is shown in Option D, where 800 has a filled-in dot and the line extends to the right.
To solve the inequality ≥ $900, we need to find the range of values that satisfy this condition. Since the inequality symbol (≥) indicates "greater than or equal to," any value that is greater than or equal to $900 will satisfy the inequality.
To graphically represent this solution, we can plot the numbers in the given options and see which option matches the solution.
Option A: The graph includes positive numbers but does not extend up to $900, so this option is not the solution.
Option B: The graph includes positive numbers, but it has a dot at $200, which means it is not a solution.
Option C: The graph includes positive numbers and has an open dot at $200, indicating that values greater than $200 are included. However, it does not go up to $900, so this option is not the solution.
Option D: The graph includes positive numbers and has a dot at $700, which means it includes values up to $700. It does not reach $900, so this option is not the solution.
Therefore, none of the given options match the graph of the solution to the inequality ≥ $900.