y0=2,y1=3,y2=-5,y3=4,y4=7
, E is shift operator, Then
E^2 (yo) is,
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Answer:
Step-by-step explanation:
1. Numerical Methods - Finite Differences Dr. N. B. Vyas Department of Mathematics, Atmiya Institute of Tech. and Science, Rajkot (Guj.) nirav [email protected] Dr. N. B. Vyas Numerical Methods - Finite Differences
2. Finite Differences Forward difference Suppose that a function y = f(x) is tabulated for the equally spaced arguments x0, x0 + h, x0 + 2h, ..., x0 + nh giving the functional values y0, y1, y2, ..., yn. Dr. N. B. Vyas Numerical Methods - Finite Differences
3. Finite Differences Forward difference Suppose that a function y = f(x) is tabulated for the equally spaced arguments x0, x0 + h, x0 + 2h, ..., x0 + nh giving the functional values y0, y1, y2, ..., yn. The constant difference between two consecutive values of x is called the interval of differences and is denoted by h. Dr. N. B. Vyas Numerical Methods - Finite Differences
4. Finite Differences Forward difference Suppose that a function y = f(x) is tabulated for the equally spaced arguments x0, x0 + h, x0 + 2h, ..., x0 + nh giving the functional values y0, y1, y2, ..., yn. The constant difference between two consecutive values of x is called the interval of differences and is denoted by h. The operator ∆ defined by ∆y0 = y1 − y0 Dr. N. B. Vyas Numerical Methods - Finite Differences