You should be able to answer this question after studying Unit 9. You should use Maxima to answer this question. Include a printout or screenshot of your Maxima worksheet with your solution. Your solution should include a clear statement of the problem and the method used. You are not expected to annotate your Maxima worksheet with explanation. However, remember that for good mathematical communication you should present your answer clearly. An athletics stadium is host to events for local athletics clubs. Clubs can enter teams at three levels: junior, senior and veteran. The number of people in a team depends on the level. In 2017 the stadium hosted 8 junior teams, 11 senior teams and 5 veteran teams, and the total number of athletes competing was 504. In 2018 the stadium hosted 7 junior teams, 10 senior teams and 7 veteran teams, and the total number of athletes competing was 492. In 2019 the stadium hosted 9 junior teams, 12 senior teams and 8 veteran teams, and the total number of athletes competing was 596. By modelling the problem as a system of three simultaneous linear equations, find the number of athletes in a junior team, in a senior team and in a veteran team. (5 Question 4 10 marks You should be able to answer this question after studying Unit 10. infinite geometric sequence (2n) whose first four terms are You should be able to answer this question after studying Unit 9. You should use Maxima to answer this question. Include a printout or screenshot of your Maxima worksheet with your solution. Your solution should include a clear statement of the problem and the method used. You are not expected to annotate your Maxima worksheet with explanation. However, remember that for good mathematical communication you should present your answer clearly. An athletics stadium is host to events for local athletics clubs. Clubs can enter teams at three levels: junior, senior and veteran. The number of people in a team depends on the level. In 2017 the stadium hosted 8 junior teams, 11 senior teams and 5 veteran teams, and the total number of athletes competing was 504. In 2018 the stadium hosted 7 junior teams, 10 senior teams and 7 veteran teams, and the total number of athletes competing was 492. In 2019 the stadium hosted 9 junior teams, 12 senior teams and 8 veteran teams, and the total number of athletes competing was 596. By modelling the problem as a system of three simultaneous linear equations, find the number of athletes in a junior team, in a senior team and in a veteran team. (5 Question 4 10 marks You should be able to answer this question after studying Unit 10. infinite geometric sequence (2n) whose first four terms are