The sum of the following infinite series $\frac{4}{20}+\frac{4\cdot 7}{20\cdot 30}+\frac{4\cdot 7\cdot 10}{20\cdot 30 \cdot 40}+\cdots$

Question

The sum of the following infinite series $\displaystyle \frac{4}{20}+\frac{4\cdot 7}{20\cdot 30}+\frac{4\cdot 7\cdot 10}{20\cdot 30 \cdot 40}+\cdots$

$\bf{My\; Try::}$ We can write the given series as $$\left(1+\frac{4}{20}+\frac{4\cdot 7}{20\cdot 30}+\frac{4\cdot 7\cdot 10}{20\cdot 30 \cdot 40}+\cdots\right)-1$$

Now camparing with $$(1+x)^n = 1+nx+\frac{n(n-1)x^2}{2!}+\cdots$$

So we get $\displaystyle nx=\frac{4}{20}$ and $\displaystyle \frac{n(n-1)x^2}{2}=\frac{4\cdot 7}{20\cdot 30}$

So we get $$\frac{nx\cdot (nx-x)}{2}=\frac{4\cdot 7}{20\cdot 30}\Rightarrow \frac{4}{20}\cdot \left(\frac{4-20}{20}\right)\cdot \frac{1}{2}x^2=\frac{4}{20}\cdot \frac{7}{30}$$

But here $x^2=\text{Negative.}$

I did not understand how can I solve it

Help me, Thanks

It would improve the question to give an explicit expression for the summands. Apparently the numerators are products of terms in arithmetic progression with initial factor $4$ and common difference $3$ between consecutive factors, while the denominators are products of terms in arithmetic progression with initial factor $20$ and common difference $10$. — hardmath, Feb 12 '16 at 18:23
If hardmath is correct in his interpretation (and I think it most natural to read it that way), then using the binomial expansion is inappropriate. — Brian Tung, Feb 12 '16 at 19:31

2'5 9'2 · Answer 1 · 2016-02-13T16:18:16.597

The numerators suggest that you could make use of a power series involving exponents that are rational numbers with denominator $3$.

$$\begin{align} \sum_{n=1}^{\infty}\frac{4\cdot7\cdot\cdots\cdot(3n+1)}{(n+1)!10^n} &=\sum_{n=1}^{\infty}\frac{\frac43\cdot\frac73\cdot\cdots\cdot\frac{3n+1}3}{(n+1)!\left(10/3\right)^n}\\ &=\sum_{n=1}^{\infty}\frac{1}{n+1}\binom{\frac{3n+1}{3}}{n}\left(\frac{3}{10}\right)^n\\ &=\left[\sum_{n=1}^{\infty}\frac{1}{n+1}\binom{\frac{3n+1}{3}}{n}x^n\right]_{x=3/10}\\ &=\left[\frac{1}{x}\sum_{n=1}^{\infty}\frac{1}{n+1}\binom{\frac{3n+1}{3}}{n}x^{n+1}\right]_{x=3/10}\\ &=\left[\frac{1}{x}\int_0^x\sum_{n=1}^{\infty}\binom{\frac{3n+1}{3}}{n}t^{n}\,dt\right]_{x=3/10}\\ &=\left[\frac{1}{x}\int_0^x\sum_{n=1}^{\infty}\binom{-\frac{4}{3}}{n}(-t)^{n}\,dt\right]_{x=3/10}\\ &=\left[\frac{1}{x}\int_0^x\left(\left(1-t\right)^{-4/3}-1\right)\,dt\right]_{x=3/10}\\ &=\left[\frac{1}{x}\left[3\left(1-t\right)^{-1/3}-t\right]_{t=0}^{t=x}\right]_{x=3/10}\\ &=\left[\frac{1}{x}\left(3\left(1-x\right)^{-1/3}-x-3\right)\right]_{x=3/10}\\ &=\frac{10}{3}\left(3\left(1-\frac{3}{10}\right)^{-1/3}-\frac{3}{10}-3\right)\\ &=10\left(\frac{7}{10}\right)^{-1/3}-11\\ &=\sqrt[3]{\frac{10^4}{7}}-11\\ \end{align}$$

Empy2 · Accepted Answer · 2016-02-12T19:58:17.140

6

Since the question asks about $X=\frac4{20}(1+\frac7{30}(1+...)))$, consider $$1+\frac1{10}(1+\frac4{20}(1+\frac7{30}(...)))$$ The $10,20,30$ have a factor $1,2,3$ which will become $n!$ in the denominator.
Then $\frac1{10},\frac4{10},\frac7{10}$ increase by $3/10$ each time. Take the factor $3/10$ out, and we have $\frac13,\frac43,\frac73$ which increase by 1 each time. Let $x=3/10,n=1/3$.
$$1+xn+\frac{x^2}{2!}n(n+1)+\frac{x^3}{3!}n(n+1)(n+2)+...\\=(1-x)^{-n}=0.7^{-1/3}$$
This equals $1+\frac1{10}(1+X)$, so your sum is $X=10(0.7)^{-1/3}-11$

edited Feb 12 '16 at 19:58

answered Feb 12 '16 at 18:44

Empy2

50,853

Could use a bit more expansion, but looks nicely done. – Brian Tung Feb 12 '16 at 19:35

The sum of the following infinite series $\frac{4}{20}+\frac{4\cdot 7}{20\cdot 30}+\frac{4\cdot 7\cdot 10}{20\cdot 30 \cdot 40}+\cdots$

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