0.5586 Consider the regular subdivision of the interval [a, b] as a = x0

Numerical math

0.5586<br>Consider the regular subdivision of the interval [a, b] as a = x0 < x1 < x2 < x3 < x4 =<br>b, with the step size h = x+1 – X4, and define the function f on [a, b] such that f (a)<br>f(b)<br>%3D<br>= 1,f(x1) = 1.5, f(x2) = f(x3)<br>1, then the approximation of I = [°f(x)dx using composite Simpson's rule with n=4 is:<br>= 2. Suppose that the length of the interval [a, b] is<br>5/2<br>5/3<br>10/3<br>O 5<br>This P<br>

Extracted text: 0.5586 Consider the regular subdivision of the interval [a, b] as a = x0 < x1="">< x2="">< x3="">< x4="b," with="" the="" step="" size="" h="x+1" –="" x4,="" and="" define="" the="" function="" f="" on="" [a,="" b]="" such="" that="" f="" (a)="" f(b)="" %3d="1,f(x1)" =="" 1.5,="" f(x2)="f(x3)" 1,="" then="" the="" approximation="" of="" i="[°f(x)dx" using="" composite="" simpson's="" rule="" with="" n="4" is:="2." suppose="" that="" the="" length="" of="" the="" interval="" [a,="" b]="" is="" 5/2="" 5/3="" 10/3="" o="" 5="" this="">

Jun 04, 2022

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0.5586 Consider the regular subdivision of the interval [a, b] as a = x0

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