(1 point) let p(t) be the performance level of someone learning a skill as a function of the training time t. the derivative dpdt represents the rate at which performance improves. if m is the maximum level of performance of which the learner is capable, then a model for learning is given by the differential equation dpdt=k(m?p(t)) where k is a positive constant. a) first solve this differential equation for p(t) using c as your final (simplified) constant parameter introduced by integrating.
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Category: chemistry |
Author: Torquil Vilhelm
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