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Find the largest interval containing x = 0 that the Remainder Estimation Theorem allows over which f(x) = sin(3x) can be approximated by p(x)
Find the largest interval containing x = 0 that the Remainder Estimation Theorem allows over which f(x) = sin(3x) can be approximated by p(x) = 3x - decimal-place accuracy throughout the interval. Check your answer by graphing |f(x) - p(x)| over the interval you obtained. (3x) to three Enter Interval in Interval Notation. [-0.218,0.218]
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Solution Step1 Given that fxsin 3x and px3x 3x 3 6 Since fxsin3x has derivatives of all orders ...
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Algebra and Trigonometry
Authors: Ron Larson
10th edition
9781337514255, 1337271179, 133751425X, 978-1337271172
