Home / Mathematics /Estimate the minimum number of subintervals needed to approximate the integral with an error of magnitude less than 10-4 by the Trapezoidal Rule. 5 1+In s -dx a) n=28 b) n=24 C) n=32 d) n=18 n=14

Question Estimate the minimum number of subintervals needed to approximate the integral with an error of magnitude less than 10-4 by the Trapezoidal Rule. 5 1+In s -dx a) n=28 b) n=24 C) n=32 d) n=18 n=14

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Transcribed Image Text: Estimate the minimum number of subintervals needed to approximate the integral with an error of magnitude less than 10-4 by the Trapezoidal Rule. 5 1+In s -dx a) n=28 b) n=24 C) n=32 d) n=18 n=14

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J=int_(2)^(5)(1+ln x)/(10)By Trapezoidal Rule|E_(T)| <= (m(b-a)^(3))/(12n^(2))and |f^('')(x)|&in <= M for x in[a,b]{:[f(x)=(1+ln x)/(10)],[f^(')(x)=(1)/(10 x)],[|f^('')(2)|=(-1)/(10x^(2))∣⩽(1)/(10(2)^(2)) <= (1)/(40)],[m=(1)/(40)]:}{:[:.|E+| ... See the full answer

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