Suppose we are looking for a root of some function, f(), and that we use the bisection method starting with the interval [ - 8.828, - 8.625]. How many iterations of the bisection method are required to find an estimate of the root correct to 5 decimal places? Find the minimum number required. Your answer should be a positive integer. The minimum number of iterations is Find the minimum number required. Your answer should be a positive integer.Suppose we are looking for a root of some function, m), {i.e., we are trying to find a: for which f(:::) = 0). We use the bisection method starting with some interval [a., b], and we know that rm) : 30.22, and ll) : 7 25.11. If a is the midpoint of the interval [(1,1)] and f((:) 2 44.41 then what is the next step in the bisection mehod? Choose the correct statement: > The product f(c) - b) is positive, so we put b = c and go to the next iteration. The product f(c) - b) is positive, so we put a. = cand go to the next iteration. The product f(c) f(b) is negative, so we put a. = c and go to the next iteration. The product f(c) f(b) is negative, so we put 5 = c and go to the next iteration. OOOOO con: None of the above