hello, anyone Know how to solve this differntly than the other the solved ones in answers. ill make sure to leave a like. thank you for ur time and efforts.
Hello Anyone Know How To Solve This Differntly Than The Other The Solved Ones In Chegg Ill Make Sure To Leave A Like 1 (93.19 KiB) Viewed 16 times
Hello Anyone Know How To Solve This Differntly Than The Other The Solved Ones In Chegg Ill Make Sure To Leave A Like 2 (75.95 KiB) Viewed 16 times
Constructing a stage-matrix model for an animal species that has three life stages: juvenile (up to 1 year old), subadults and adult, like the dotted owls. Suppose the female adults give birth each year to an average of 12/11 female juveniles. Each year, -% 18% of the juveniles survive to become subadults, among the survived subadults % 91% stay 200 11 400 subadults and -% 36% become adults. Each year, 11 1000 11 -%~90% of the adults survive. For k ≥ 0, let Xk = (jk, Sk, ak), where the entries in X are the numbers of female juveniles, female subadults, and female adults in year k. The stage-matrix A such that Xk+1 = AX for k ≥ 0 is ГО 0 6 1 5 0 LO 2 5 2 1000 11 A== 11
As the largest eigenvalue of the stage-matrix A is more than one, the population of juvenile is growing. a. Compute the eventual growth rate of the population based on the determinant of A. [2 marks] b. Suppose that initially there are 6501 juveniles, 230 subadults and 2573 adults in the population. Write Xo = [6501 230 2573] as a linear combination of V₁, V₂ and V3. That is solve the below linear system to obtain C₁, C₂ and C3, [6501] 230 = C₁v₁ + C₂V₂2 + C3V3. [2573] [3 marks] c. Calculate the population of juveniles, subadults and adults after 10 years. [3 marks] d. Deduce the number of total population and the ratio of juveniles to adults after 10 years. [2 marks]
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