1. Find the area of convergence of the series. (1-3)
4. Arrange the function f (x) in a Taylor series in the neighborhood of this point x0. Find the area of convergence of the series obtained for this function.
4.20. f (x) = 1 / (2x + 5), x0 = 3
5. Calculate the approximate value specified with a given degree of accuracy α, using power series expansion appropriately chosen function
5.20. arcsin1 / 3, α = 0,001
6. I Am using the expansion of the integrand in a power series, calculate the definite integral said up to 0,001.
7. Find a power series expansion in powers of x solving the differential equation (record the first three non-zero, a member of this expansion)
7.20. y ´= 2x + y2 + ex, y (0) = 1
8. The method of successive differentiation to find the first k terms of the expansion in a power series solutions of differential equations at the specified initial conditions.
8.20. y ´= 0,2x + y2, y (0) = 1, k = 3
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