Consider the following data
x 1.0 1.3 1.6 1.9 2.2
f(x) 0.76519 0.62008 0.45540 0.28181 0.11036
Use stirling’s formula to approximate f(1.5) with x0 = 1.6
Compute integral 0 to 4, f(x)dx using the Romberg integral technique on the trapezoidal integrals evaluated by the trapezoidal rule taking h=1 and h=0.5.The tabulated values are given below.
x 0 0.5 1 1.5 2.0 2.5 3.0 3.5 4.0
f(x) 1 4 3 2 2.5 2.9 3.6 4 1.8
From the values of f(x) = xex given in the table
x 1.8 1.9 2.0 2.1 2.2
f(x) 10.8894 12.7032 14.7787 17.1489 19.8550
find f
00(2.0) using the central difference formula of O(h
2
) for h = 0.1 and h = 0.2.
Calculate T.E. and actual error.
Taking the endpoints of the last interval obtained in f(x) = x^3−5x^2 +1 = 0 as the initial
approximations, perform two iterations of the secant method to approximate the
root.
Find the interval of unit length that contains the smallest positive root of the
equation f(x) = x
3 −5x
2 +1 = 0. Starting with this interval, find an interval of
length 0.05 or less that contains the root, by Bisection method.
Perform four iterations of the inverse power method to compute the smallest
eigenvalue in magnitude, and the corresponding eigenvector of the matrix A given below above.
A=1 −1 1
2 0 3
1 4 −1
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