Explain in your own words what the Intermediate Value Theorem says and why it seems plausible. .A. The Intermediate Value Theorem states that for a continuous function​ f(x) over the closed interval​ [a,b], f(x) takes on every value between​ f(a) and​ f(b). This seems plausible because if the function did not take on every value between​ f(a) and​ f(b), there would be a value for​ f(x) that did not​ exist, and thus the function would not be continuous. B The Intermediate Value Theorem states that for every value of x between a and b in​ f(x), if​ f(a) exists, then​ f(b) must exist if b is in the domain. This seems plausible because if the function did not take on every value between​ f(a) and​ f(b), there would be a value for​ f(x) that did not​ exist, and thus the function would not be co

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(A) I (B) II (C) I and II (D) I and III (E) II and III

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