Consider a loan repayment plan described by the following initial value problem, where the amount borrowed is B(0) = $40,000, the monthly payments are $600, and B(t) is the unpaid balance of the loan. Use the initial value problem to answer parts a through c. B' (+) =0.03B - 600, B(0) = 40,000 a) Find the solution of the initial value problem and explain why B is an increasing solution. B(t) = Why is B an increasing function? O A. The function is increasing because it is an exponential function with a positive coefficient and a negative exponent. O B. The function is increasing because it is an exponential function with a positive coefficient and a positive exponent. O C. The function is increasing because it is an exponential function with a positive exponent. O D. The function is increasing because it is an exponential function with a positive coefficient. b) What is the most that you can borrow under the terms of this loan without going further into debt each month? The most you could borrow is $ c) Now consider the more general loan repayment plan described by the value problem B' (t) =rB -m, B(0) = Bo where r> 0 reflects the interest rate, m > 0 is the monthly payment, and Bo > 0 is the amount borrowed. In terms of m and r, what is the maximum amount Bo that can be borrowed without going further into debt?