Question

Two employees of a company, Paul and Pierre, each received, at the end of 2020, a premium following the profits made. For the year 2020, Pierre received 100 euros and Paul received 120 euros. As the company is thriving, Paul hopes for an annual increase in his premium of € 10 per year and Pierre hopes for an increase in his premium of 5% per year. The premiums received, expressed in euros, by Paul and Pierre are modeled using two suites (a) and (vn). For any natural integer n, a and v, therefore represent the premium received respectively by Paul and Peter the year 2020 + n. So we have ug = 100 and vo = 120. 1. Calculate the premiums that Paul and Pierre will receive in 2021. 2. Give the nature of each of the sequences (u,) and (v,). Specify, for each, its reason. 3. Deduce therefrom the expressions, for any natural integer n, of the general terms u, and v, depending on n. 4. Paul and Pierre decide to save, each for their part, all the premiums that he receive every end of the year since 2020. Indicate, explaining the approach used, which of Paul or Peter will have saved the largest amount of money in 2030.

Answer 1

Step-by-step explanation:

1 }; int n = 5; for (int i = 0; i < n; i = i + 1) { for (int j = 0; j < n; j = j + 1) { if (arr[i] % cat[j] == 0) { int temp = arr[j];