The management at a plastics factory has found that the maximum number of units a worker can produce In a day is 40. The learning curve for the number N of units produced per day after a new employee has worked t days Is modeled by N = 40(1 - e^kt). After 20 days on the job, a new employee produces 18 units. Find the learning curve for this employee (first, find the value of k). k = N = How many days should pass before this employee Is producing 23 units per day? (Round your answer to the nearest whole number.) days Solution N = 40( 1- e^kt) 20 days ---- 18 units plug this set of data to solve for k : 18 = 40(1-e^20k) 18/40 = 1-e^20k e^20k = 0.55 taking natural log on both sided: a) 20k = ln(0.55) ----> k =-0.030 N = 40( 1- e^-0.03t ) b) N = 23 find t=? 23 = 40 (1-e^-0.03t) e^-0.03t = 0.425 taking natural log on both sides: -0.03t = ln(0.425) t = 28.52 = 29 days.

1. The nephron loop is responsible for approximately 25% of the reabsorption of sodium. Loop
diuretics cause an overall __________________ in the reabsorption of sodium in this region
resulting in a(n) ________________________ in the osmolarity of the tubular filtrate.
Solution
1. Overall DECREASE in the reabsorption of sodium resulting in a DECREASE in the
osmolarity.
When sidium reabsorption is less the medulla becomes concentrated be vause water molevules
move to combat the reducedvsodium ckncentration.
So osmolarity decreases.