Please see the attached file for the fully formatted problems.
1. Given satisfying , ; π ; find
2. Given such that , ; list all possible solutions. For which of these does ?; ?
3. Suppose for it is known that
Where "a" is a parameter. Determine the value of this parameter which ensure the existence of a relation such that , C a constant, for all satisfying (1) and then deduce . What is C if .
First Order Differential Equations and Values of Parameters are investigated. The solution is detailed and well presented. The response received a rating of "5/5" from the student who originally posted the question.