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Question
If `root(3)(729)` = 9 then `root(3)(0.000729) = ?`
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Solution 1
It is given that ,
`root(3)(729)` = 9
`root(3)(0.000729) = root(3)(729/1000000)`
= `root(3)(729)/root(3)(1000000)`
= `root(3)(9^3)/root(3)((100)^3)`
= `9/100`
= 0.09
Solution 2
The cube root of `729` is 9 because `9×9×9=729`. Now, we need to determine the cube root of `0.000729.`
To solve for `root(3){0.000729}`, we can express the number in a form similar to 729:
`0.000729 = \frac{729}{10^6} = 729 \times 10^{-6}`
Using the property of cube roots:
`root(3)(729×10^{-6})=root(3)(729)×root(3)(10^{-6}`
Since `root(3)(729)=9 and root(3)(10^{-6})=10^{-2}`, we get:
`9×10^{-2}=9×0.01=0.09`
Thus, the cube root of 0.0007290 is:
`0.09`
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