Answer:
x≤3.33, y≤9.67
Explanation:
Number of hours landscaping =x
Number of hours clearing tables= y
If she can work a maximum of 13 total hours. Then:
x+y≤13
Mila makes $13 per hour landscaping and making $10 per hour clearing tables.
Income: 13x+10y
She must earn a minimum of $140.
Therefore:
13x+10y≥140
We then solve the two resulting simultaneous inequalities.
x+y≤13
13x+10y≥140
From the graph, at the point of intersection of the two inequalities. One possible solution is:
x≤3.33, y≤9.67
Therefore, to meet her minimum target, she can work 3.33 hours landscaping and 9.67 hours clearing tables.
Check:
From the first inequality: x≤13-y
Substitute into 13x+10y≥140
13(13-y)+10y≥140
169-13y+10y≥140
-3y≥140-169
-3y≥-29
Divide both sides by -3
y≤9.67
Recall:
x≤13-y
x≤13-9.67
x≤3.33