t (hours) R(t) (liters/hour) 3 3.7 5 ст 3.5 7 3.1 10 2.9 13 2.8 14 2.6 15 2.1 16. A tank contains 60 liters of water at time t = 3 hours. Water is being drained out of the tank at a rate R(t), where R(t) is measured in liters per hour, and this measured in hours. Selected values of R(t) are given in the table above. Using a midpoint Riemann Sum with three subdivisions and data from the table, what is the approximation of the number of liters of water that are in the tank at time t= 15 hours?

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
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Question
t (hours)
R(t) (liters/hour)
O (A) 21.0
O (B) 23.4
O (C) 26.6
3
O (D) 96.6
3.7
5
3.5
7
3.1
10
2.9
13
2.8
14
16. A tank contains 60 liters of water at time t = 3 hours. Water is being drained out of the tank at a rate R(t),
where R(t) is measured in liters per hour, and tis measured in hours. Selected values of R(t) are given in the
table above. Using a midpoint Riemann Sum with three subdivisions and data from the table, what is the
approximation of the number of liters of water that are in the tank at time t= 15 hours?
2.6
15
2.1
Transcribed Image Text:t (hours) R(t) (liters/hour) O (A) 21.0 O (B) 23.4 O (C) 26.6 3 O (D) 96.6 3.7 5 3.5 7 3.1 10 2.9 13 2.8 14 16. A tank contains 60 liters of water at time t = 3 hours. Water is being drained out of the tank at a rate R(t), where R(t) is measured in liters per hour, and tis measured in hours. Selected values of R(t) are given in the table above. Using a midpoint Riemann Sum with three subdivisions and data from the table, what is the approximation of the number of liters of water that are in the tank at time t= 15 hours? 2.6 15 2.1
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