As we saw in Exercise 19 of Section 1.3, the spiking of a

Chapter , Problem 17

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As we saw in Exercise 19 of Section 1.3, the spiking of a neuron can be modeled by the differential equation d/dt = 1 cos + (1 + cos )I(t), where I(t) is the input. Assume that I(t) is constantly equal to 0.1. Using Eulers method with t = 0.1, graph the solution that solves the initial value (0) = 1.0 over the interval 0 t 5. When does the neuron spike?

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