t (hours) 0 1 3 4 7 8 9 |
L(t) (people) 120 156 176 126 150 80 0
Concert tickets went on sale at noon (t = 0) and were sold out within 9 hours. The number of people waiting in line to purchase tickets at time t is modeled by twice-differentiable function L for 0 (less than or equal to) t (less than or equal to) 9. Values of L(t) at various times t are shown in the table above.
(a) Use the data in the table to estimate the rate at which the number of people waiting in line was changing at 5:30 P.M. (t = 5.5). Show the computations that lead to your answer. Indicate units of measure.
If, after getting help with this question I need help for the other parts, I'll post another question, just in case anyone wants to have more points and help me
Thank you.
L(t) (people) 120 156 176 126 150 80 0
Concert tickets went on sale at noon (t = 0) and were sold out within 9 hours. The number of people waiting in line to purchase tickets at time t is modeled by twice-differentiable function L for 0 (less than or equal to) t (less than or equal to) 9. Values of L(t) at various times t are shown in the table above.
(a) Use the data in the table to estimate the rate at which the number of people waiting in line was changing at 5:30 P.M. (t = 5.5). Show the computations that lead to your answer. Indicate units of measure.
If, after getting help with this question I need help for the other parts, I'll post another question, just in case anyone wants to have more points and help me
Thank you.