Mister Exam
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- Product of series
cos2n
sin(n+1/n)
pi
pi
pi
Sum of series pi
The solution
The radius of convergence of the power series
Given number:
$$\pi$$
It is a series of species
$$a_{j} \left(c x - x_{0}\right)^{d j}$$
- power series.
The radius of convergence of a power series can be calculated by the formula:
$$R^{d} = \frac{x_{0} + \lim_{j \to \infty} \left|{\frac{a_{j}}{a_{j + 1}}}\right|}{c}$$
In this case
$$a_{j} = \pi$$
and
$$x_{0} = 0$$
,
$$d = 0$$
,
$$c = 1$$
then
$$1 = \lim_{j \to \infty} 1$$
Let's take the limit
we find
$$\pi$$
It is a series of species
$$a_{j} \left(c x - x_{0}\right)^{d j}$$
- power series.
The radius of convergence of a power series can be calculated by the formula:
$$R^{d} = \frac{x_{0} + \lim_{j \to \infty} \left|{\frac{a_{j}}{a_{j + 1}}}\right|}{c}$$
In this case
$$a_{j} = \pi$$
and
$$x_{0} = 0$$
,
$$d = 0$$
,
$$c = 1$$
then
$$1 = \lim_{j \to \infty} 1$$
Let's take the limit
we find
True
False
The rate of convergence of the power series
Numerical answer
The series diverges
The graph
Examples of finding the sum of a series
- The Sum of the Power Series
x^n/n
(x-1)^n
- Factorial
1/2^(n!)
n^2/n!
x^n/n!
k!/(n!*(n+k)!)
- Flint Hills Series
csc(n)^2/n^3
- Basel problem
1/n^2
1/n^4
1/n^6
- Harmonic series
1/n
- Grandi's series
(-1)^n
- Alternating series
(-1)^(n + 1)/n
(n + 2)*(-1)^(n - 1)
(3*n - 1)/(-5)^n
(-1)^(n - 1)*n/(6*n - 5)
- Newton–Mercator series
(-1)^(n + 1)/n*x^n
- Exam the series for convergence
(3*n - 1)/(-5)^n