Approximating definite
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- Use series to approximate the definite integral to within the indicated accuracy: sin(x) dx, with an error < 10 4 Note: The answer you derive here should be the partial sum of an appropriate series (the number of terms determined by an error estimate). This number is not necessarily the correct value of the integral truncated to the correct number of decimal places. 0.234arrow_forwardI send the question a second time and pay for each question. Can I explain to you how to write the answer correctly? How can I explain that you write by hand, it is very bad and unreadable? Please give the final answer and you already answered it wrong.arrow_forward(a) Find a power series for the function f : (0, 0) → R given by f(x) = $in² about the point x = A. Hint: The Taylor series for xH sin x may be helpful. 2. = B. (b) Find the Taylor series for the function f : (0, 00) → R given by f(x) = log x about the point x =arrow_forward
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