Respuesta :
Answer:
The rate of change of the divers elevation is approximately 24.71 feet/minute
Step-by-step explanation:
The given information are;
The depth to which the scuba diver dove =[tex]-79\frac{9}{10} \ feet[/tex]
The rate at which he dove = -21.3 feet/minute
The time which he spent at that elevation = 10.5 minutes
The elevation the diver then ascended to = [tex]-8\frac{9}{10} \ feet[/tex]
The total time for the dive = [tex]17\frac{1}{8} \ minutes[/tex]
Therefore, the time, [tex]t_d[/tex], with which the scuba diver descended to [tex]-79\frac{9}{10} \ feet[/tex] is given as follows;
[tex]t_d = \dfrac{Distance}{Speed} = \dfrac{-79\frac{9}{10} }{-21.3} \approx 3.75 \ minutes[/tex]
The time, [tex]t_e[/tex], it took the scuba diver to elevate to [tex]-8\frac{9}{10} \ feet[/tex] is given as follows;
[tex]t_e[/tex] = [tex]17\frac{1}{8} \ minutes[/tex] - (3.75 + 10.5) minutes ≈ 2.8738 minutes
The rate of change of the divers elevation = (Final elevation - Initial elevation)/(Time taken)
∴ The rate of change of the divers elevation = ([tex]-8\frac{9}{10} \ feet[/tex] - ([tex]-79\frac{9}{10} \ feet[/tex] ))/(2.87 minutes) = 71/2.8738 ≈ 24.71 feet/minute to the nearest hundredth
The rate of change of the divers elevation ≈ 24.71 feet/minute.
