In Exercise 26 of Section 1 1 a Maclaurin series was integrated to approximate erf(1), where erf(x) is the normal distribution error function defined by a Use the Maclaurin series to construct a table for erf(x) that is accurate to within 104 for erf (xi), where xi 0 2i, for i 0, 1, , 5 b Use both ...

a b Linear interpolation with x 0 02 and x 1 04 gives ...

In Exercise 26 of Section 1.1 a Maclaurin series was integrated to approximate erf(1), where erf(x) is

Question:

In Exercise 26 of Section 1.1 a Maclaurin series was integrated to approximate erf(1), where erf(x) is the normal error function defined by

a. Use the Maclaurin series to construct a table for erf(x) that is accurate to within 10ˆ’4 for erf (xi), where xi = 0.2i, for i = 0, 1, . . . , 5.
b. Use both linear interpolation and quadratic interpolation to obtain an approximation to erf(1 3). which approach seems most feasible?

Distribution
The word "distribution" has several meanings in the financial world, most of them pertaining to the payment of assets from a fund, account, or individual security to an investor or beneficiary. Retirement account distributions are among the most...