Advertisements
Advertisements
प्रश्न
Making use of the cube root table, find the cube roots 7
Advertisements
उत्तर
Because 7 lies between 1 and 100, we will look at the row containing 7 in the column of x.
By the cube root table, we have:
\[\sqrt[3]{7} = 1 . 913\]
Thus, the answer is 1.913.
APPEARS IN
संबंधित प्रश्न
Find the cube root of the following number by the prime factorisation method.
15625
Find the cube root of the following number by the prime factorisation method.
110592
\[\sqrt[3]{480} = \sqrt[3]{3} \times 2 \times \sqrt[3]{. . .}\]
\[\sqrt[3]{\frac{27}{125}} = \frac{. . .}{5}\]
\[\sqrt[3]{\frac{512}{. . .}} = \frac{8}{13}\]
Find The cube root of the numbers 3048625, 20346417, 210644875, 57066625 using the fact that 210644875 = 42875 × 4913 .
Making use of the cube root table, find the cube root
9800 .
Which is the smallest number that must be multiplied to 77175 to make it a perfect cube?
The least number by which 72 be multiplied to make it a perfect cube is ______.
Using prime factorisation, find the cube roots of 2197
