- Problem 1 On A Certain Island There Is A Population Of Snakes Foxes Hawks And Mice Their Populations At Time Are 1 (28.35 KiB) Viewed 383 times
- Problem 1 On A Certain Island There Is A Population Of Snakes Foxes Hawks And Mice Their Populations At Time Are 2 (33.16 KiB) Viewed 383 times
- Problem 1 On A Certain Island There Is A Population Of Snakes Foxes Hawks And Mice Their Populations At Time Are 3 (11.86 KiB) Viewed 383 times
Problem #2: Continuing from the system of differential equations from Problem 1, each eigenvector represents a grouping of animals that changes with simple exponential growth or decay. The exponential rate of growth or decay is given by the corresponding eigenvalue. Because the matrix d is invertible and diagonalizable, any initial values for the animal population can be written as a combination of these four special groupings that each grow exponentially by their eigenvalue. Consider the initial population y(0) = [7 3 2 29]. Solve for constants c1 through c4 in order to write y(0) c1 x1 + 2x2 + C3 X3 + C4X4 where x1 through x4 are the eigenvectors as detailed in Problem 1 (i.e., the eigenvectors in order, and scaled so that the first component is 1). Enter the values of c1, c2, c3, and c4, separated with commas. Just Save Submit Problem #2 for Grading Problem #2 Attempt #1 Attempt #2 Attempt #3 Your Answer: Your Mark: Problem #2:
Problem #3: Based on the system of differential equations from Problem 1, with the initial population from problem 2. find the function for the population of mice, m(t). Problem #3: Enter your answer as a symbolic function of t, as in these examples Just Save Problem #3 Attempt #1 Attempt #3 Your Answer: Your Mark: Submit Problem #3 for Grading Attempt #2