How do I prove that if $|x|<1$, then $\lim_{n\to\infty}x^n=0$?

Question

Prove that: If $|x|<1$, then $\lim_{n\to\infty}x^n=0$.

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My thought:

Since it's a theory so I'm not able to solve it mathematically also I'm too confused about "infinity algebra". I have just memorized "infinity algebra results."

So, according to me, infinity is a very large number, therefore if any number is raised to power infinity then ultimately we'll get infinity.

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Answer:It's a simple algebra if you'll increase power of $\vert x \vert<1$ then it'll keep decreasing the value hence you'll get $0$ too simple.

Edit:Thanku dear teachers for helping.I know it was too simple but sometimes we get struck on silly doubts like this.

Answer 1

Bernoulli's inequality is all you need.

If $0 < x < 1$ then $x = \dfrac1{1+a}$ where $a = \dfrac1{x}-1 \gt 0$.

Then $(1+a)^n \ge 1+na \gt na =n(\dfrac1{x}-1)$ so

$\begin{array}\\ x^n &=\dfrac1{(1+a)^n}\\ &\lt\dfrac1{n(\dfrac1{x}-1)}\\ &=\dfrac{x}{n(1-x)}\\ &\to 0 \text{ as } n \to \infty\\ \end{array} $

Answer 2

we know that $|x| < 1$, so $|x^n| < 1$ for every $n \in \Bbb{N}$. This means that the sequnece $a_n = x^n$ is bounded, its sufficient to prove that $a_n$ is convergent and then we can find the desires limit. Without losing generality we can suppose that $x > 0$, for $x = 0$ the statement is true, then its easy to show that: $$x^{n+1} \le x \cdot x^n < x^n \quad \Longrightarrow \quad a_{n+1} < a_n, \forall n \in \Bbb{N}$$ This means that $a_n$ is a monotone sequence and then $a_n$ is convergent and has limit $\ell$, and then: $$\lim_{n\rightarrow \infty} a_n = \ell = \lim_{n\rightarrow \infty} a_{n+1} = x \lim_{n\rightarrow \infty} a_n, \quad \Longrightarrow \quad \ell = x \cdot \ell, \quad \Longrightarrow \quad \ell = 0 $$ For $x < 0$, we can choose two distint subsequnce of $a_n$ for both even and odd power of $x$, then both of sequnces are convergent and prove is complete.

Answer 3

For $$-1<x<1$$ you can define $$x'=\frac{1}{x}$$ if $$x\neq 0$$

Answer 4

If $$-1<x<1$$ and you raise it to any power $n > 1 $ the value of it decreases.

Eg say$ x = 0.1 , x ^2 = 0.01, x^3 = 0.001$ or $x ^n = 0.1 ^ n = \frac{1}{10^n}$ and as $ n$ keeps getting bigger , the denominator approaches $\infty $ and the numerator approaches $0 $