Advertisements
Advertisements
प्रश्न
Which of the following are cubes of odd natural numbers?
125, 343, 1728, 4096, 32768, 6859
Advertisements
उत्तर
We know that the cubes of all odd natural numbers are odd. The numbers 125, 343, and 6859 are cubes of odd natural numbers.
Any natural numbers could be either even or odd. Therefore, if a natural number is not even, it is odd. Now, the numbers 125, 343 and 6859 are odd (It could be verified by divisibility test of 2, i.e., a number is divisible by 2 if it ends with 0, 2, 4, 6 or 8). None of the three numbers 125, 343 and 6859 are divisible by 2. Therefore, they are not even, they are odd. The numbers 1728, 4096 and 32768 are even.
Thus, cubes of odd natural numbers are 125, 343 and 6859.
APPEARS IN
संबंधित प्रश्न
Find the smallest number by which the following number must be divided to obtain a perfect cube.
192
What is the smallest number by which the following number must be multiplied, so that the products is perfect cube?
107811
Write true (T) or false (F) for the following statement:
If a divides b, then a3 divides b3.
What is the smallest number by which 8192 must be divided so that quotient is a perfect cube? Also, find the cube root of the quotient so obtained.
Find the cube root of the following integer −2744000 .
Find the cube-root of 3375.
Find the cube-root of `27/64`
Find the cube-root of `(-512)/(343)`
Cube roots of 8 are +2 and –2.
`root(3)(8 + 27) = root(3)(8) + root(3)(27)`.
