Advertisements
Advertisements
Question
Making use of the cube root table, find the cube root
732 .
Advertisements
Solution
We have: \[730 < 732 < 740 \Rightarrow \sqrt[3]{730} < \sqrt[3]{732} < \sqrt[3]{740}\] From cube root table, we have:
\[\sqrt[3]{730} = 9 . 004 \text{ and } \sqrt[3]{740} = 9 . 045\]
For the difference (740 - 730), i.e., 10, the difference in values \[= 9 . 045 - 9 . 004 = 0 . 041\]
APPEARS IN
RELATED QUESTIONS
Find the cube root of the following number by the prime factorisation method.
512
Find the cube root of the following number by the prime factorisation method.
110592
You are told that 1331 is a perfect cube. Can you guess without factorization what is its cube root? Similarly, guess the cube roots of 4913, 12167, 32768
Using the method of successive subtraction examine whether or not the following numbers is perfect cube 792 .
\[\sqrt[3]{1728} = 4 \times . . .\]
Evaluate:
\[\sqrt[3]{121} \times \sqrt[3]{297}\]
Making use of the cube root table, find the cube roots 7
Making use of the cube root table, find the cube root
133100 .
The least number by which 72 be divided to make it a perfect cube is ______.
Using prime factorisation, find which of the following are perfect cubes.
729
