What is the simplified form of (2/3)^3 PLEASE HURRY

Question

asked Aug 16, 2023 10.4k views

2 Answers

Thomas Gotwig · Answer 1 · 2023-08-21T01:33:40+0000

Answer:

$\boxed{\tt \cfrac{8}{27} }$

OR,

$\boxed{\tt ≈\: 0.296}$

Explanation:

Given arithmetic expression:-

$\bigg({ \cfrac{2}{3} } \bigg)^(3)$

We need to find the simplified form of the given arithmetic expression.

In words, the question may be represented as 2/3 raised to the power of 3.

$\sf \implies\bigg({ \cfrac{2}{3} } \bigg)^(3)$

$\sf \implies \: \bigg( {\cfrac{2}{3} \bigg) }^{} * \bigg( {\cfrac{2}{3} \bigg) }^{} * \bigg( {\cfrac{2}{3} \bigg) }^{}$

It Can be rewritten as,

$\sf \implies \cfrac{2 * 2 * 2}{3 * 3 * 3}$

Multiply it :-

$\sf \implies \cfrac{4* 2}{9* 3}$

$\sf \implies \: \cfrac{8}{27}$

In Decimal:-

$\sf\implies\: 0.296$

Hence, the simplest form of the arithmetic expression [exponent] is 8/27.

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I hope this helps!

Let me know if you have any questions.