Which of the following accurately describes the limit: lim f()=L - Select all that apply. When x gets sufficiently close to a the function value f(x) gets arbitrarily close to the real number L. If someone picked any number "close" to L. we can always find a function value, fix), closer to L The function value f(x) is close enough to that we can say that fla) -L. If we were to randomly pick an x-value close to a we could assume that the function output f(x)is L. Question 2 O pts Let's say that for some function f(x). we look at the limit lim f(x) does not exist. Which of the following would serve as a reason for the limit's non-existence? Select all that apply. The function value fa didn't exist The one-sided limits were the same both the same value, but the two-sided limit was a different value The left sided limit and the right-sided limit were not the same value. As x gets closer and closer to the function values, bounce around between different values and never seem to approach one of them