Answer:
Correct option is (C)
Step-by-step explanation:
we are given that -Tim design a pair of shorts,S, and T-shirts,t.
Tim sell Sorts for $12 and T-shirts for $8 each.
Tim can work atmost 18 hours a day so we can write [tex]time\leq 18[/tex]
Time taken to design a T-shirt is 30 minutes and for Shorts, it is 45 minutes.
[tex]\frac{30}{60}t+\frac{45}{60}s\leq 18\\\text{Multiply both the sides by 60}\\30t+45s\leq 1080\\\text{Divide both the sides by 45}\\s+0.66t\leq 24\\\text{Subtract 0.66t from both the sides}\\s\leq 24-0.66t[/tex]
He must design 12 itesm each day, so we can write [tex]t+s\geq 12[/tex]
Further it can be written as
[tex]t+s\geq 12\\\text{Subtract t from both the sides}\\s\geq 12-t[/tex]
Also Tim can not design more than 30 items in one day, so we can write
[tex]t+s\leq 30\\\text{Subtsract t from both the sides}\\s\leq 30-t[/tex]
Hence from the above equations , its claer that
[tex]s\geq 12-t,s\leq 30-t,s\leq 24-0.66t,s\geq 0,t\geq 0[/tex]
