What is $root(oo)(125)$ ?

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Answer 1 · 2015-09-11T00:17:03

It is equal to $1$

Assuming that you mean $sqrt(sqrt(sqrt(sqrt(...(sqrt125)$

we can write as $(125)^((1/2)^n)$ where $n$ is the number of square roots applied.

As $n->+oo$ then $(1/2)^n->0$ hence $125^(0)=1$

Answer 2 · 2015-09-11T00:38:03

I'm not sure what you intend to mean, but:

$root(oo)(125) = lim_(n->oo)root(n)(125) = 1$

or perhaps you mean the result of applying square root an infinite number of times, with the same result.

Inifiniteth root

The "infiniteth root" of $x$ could be defined as a limit:

$root(oo)(x) = lim_(n->oo) root(n)(x)$ where $n in ZZ$ .

Then:

$root(oo)(x) = { (1, "if x > 0"), (0, "if x = 0"), ("undefined", "if x < 0") :}$

So $root(oo)(125) = 1$

Apply square root an infinite number of times

If we write $sqrt()^((n))(x)$ to mean $sqrt(sqrt(..(sqrt(x))..))$ , with $n$ $sqrt()$ 's, then we could define:

$sqrt()^((oo))(x) = lim_(n->oo) sqrt()^((n))(x)$

Again we find:

$sqrt()^((oo))(x) = { (1, "if x > 0"), (0, "if x = 0"), ("undefined", "if x < 0") :}$

So $sqrt()^((oo))(125) = 1$

What is root(oo)(125)root(oo)(125) ?