72.999999, 0, -10000234
y-30 < 43
y < 73
9514 1404 393x + y ≤ 130; 9.5x +5y ≥ 950(x, y) = (80, 45)
Let x and y represent the number of adult and student tickets sold, respectively. The various limits and goals can be expressed as ...
x + y ≤ 130 . . . . . . limit on available seats
9.50x + 5.00x ≥ 950 . . . . . goal for revenue achieved
The plots of these inequalities are shown in the attachment, along with one possible solution: (x, y) = (80, 45).
Sale of 80 adult tickets and 45 student tickets will achieve the desired goal.
Answer is in a photo. I couldn't attach it here, but I uploaded it to a file hosting. link below! Good Luck!
Answer is in a photo. I can only upload it to a file hosting service. link below!
The inequality is:
The solution of the given inequality.
Multiply both sides by 3.
Divide both sides by -8 and change the sign of inequality.
It can be written as:
Therefore, the correct option is A.
An inequality does not use the equal sign (=). Instead, it uses >, ≥, <, or ≤ signs.
The answer is option D.
I don’t really know
the answer is c)8
ou would have 12 of each
y < 43.5