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(20-²(x - 2)x) cos(x) + 8(x - 1) sin(x) Let f(x) = 2776 10 (1) P3(x) 3(x - 2)² 3(x - 2) πTA (x - 2)³ + 776 is the cubic
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(20-²(x - 2)x) cos(x) + 8(x - 1) sin(x) Let f(x) = 2776 10 (1) P3(x) 3(x - 2)² 3(x - 2) πTA (x - 2)³ + 776 is the cubic
(20-²(x - 2)x) cos(x) + 8(x - 1) sin(x) Let f(x) = 2776 10 (1) P3(x) 3(x - 2)² 3(x - 2) πTA (x - 2)³ + 776 is the cubic Taylor 2774 6772 polynomial of f(x) at x = 2. (2) The Taylor series of f(x) at x = 2 is NOT alternating. - (3) f(¹) (x) = (2x − x²) cos(xxa) - Find the maximum possible error in using P3 (2) to approximate f(x) in the interval 0 ≤ x ≤ 2. You are given that:
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