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Limit FactsFor these facts, assume limx-->c f(x) = L and limx-->c g(x) = K Scalar Productlimx-->c b f(x) = bL Sum and Difference limx-->c f(x)+g(x) = L+K Product and Quotientlimx-->c f(x) g(x) = L K Powerlimx-->c f(x)n = Ln Polynomial FunctionsBy combining the scalar product, sum, and power rules, we get this: If p is a polynomial function and c is a real number then Rational FunctionsA rational function r(x) is the ratio of two polynomial functions. If r is a rational function r(x) = p(x)/q(x), and c is real, and q(c) ¹
0, then If q(c)=0 and p(c) ¹ 0 then the rational function is unbounded, and the limit does not exist. If q(c)=0 and p(c)=0 as well, then divide both p(x) and q(x) by the monomial (x-c). The new rational function r'(x) = (p(x)/(x-c)) / (q(x)/(x-c)) is equal to r(x) for all values of x except x=c, so the Indeterminate Form rules can be used. Composition of FunctionsIf limx-->c g(x) = K and limx-->K f(x) = L then limx-->c f(g(x)) = L Missing PointIf f(x)=g(x) for all x¹c in an open interval containing c, and limx-->c f(x)=L then limx-->c g(x)=L Indeterminate FormIf limx-->c f(x)=0, and limx-->c g(x)=0, then limx-->c f(x)/g(x) is said to have "Indeterminate Form" Similarly, if limx-->c f(x)=¥, and limx-->c g(x)=¥, then limx-->c f(x)/g(x) is also said to have "Indeterminate Form" If a new function h(x) can be found such that h(x)=f(x)/g(x) for all x¹c in an open interval containing c, then the "Missing Point" rule can be used to solve the Indeterminate Form. Possible methods of finding such a function are: 1. Factor the numerator and denominator, and cancel common factors -- in particular, cancel the factor (x-c) 2. "Rationalize" the numerator, if it contains a radical. For example,
3. Using L'Hopital's Rule. Squeeze TheoremIf h(x) £ f(x) £
g(x) for all x in an open interval containing c (except possibly at c itself)
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