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Question
Making use of the cube root table, find the cube root
0.86 .
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Solution
The number 0.86 could be written as\[\frac{86}{100}\] .
Now
\[\sqrt[3]{0 . 86} = \sqrt[3]{\frac{86}{100}} = \frac{\sqrt[3]{86}}{\sqrt[3]{100}}\]
By cube root table, we have: \[\sqrt[3]{86} = 4 . 414 \text{ and } \sqrt[3]{100} = 4 . 642\]
∴ \[\sqrt[3]{0 . 86} = \frac{\sqrt[3]{86}}{\sqrt[3]{100}} = \frac{4 . 414}{4 . 642} = 0 . 951\] (upto three decimal places)
Thus, the required cube root is 0.951.
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