125, 216, 343 and 512.
100
125,216,343,512
To find a cube number between 400 and 600, we need to calculate the cube root of the two limits. The cube root of 400 is approximately 7.37, and the cube root of 600 is approximately 8.66. Therefore, the cube numbers between 400 and 600 are the cubes of integers between 8 and 7, inclusive. The cube of 8 is 512, which falls within the range specified.
The perfect squares between 100 and 600 are 121, 144, 169, 196, 225, 256, 289, 324, 361, 400, 441, 484, 529, and 576. These correspond to the squares of integers from 11 to 24.
The only cube of an integer in the range 600 - 800 is 9 because 9x9x9= 729.
100/600 or 1/6
100 and 600 WHAT?
To find a number that, when cubed, is greater than 600 but less than 800, we can test the cube roots. The cube root of 600 is approximately 8.43, and the cube root of 800 is about 9.28. Thus, a number like 9 will work, as (9^3 = 729), which is between 600 and 800.
Assume the surface area is 600 cm2 and NOT 600 cm as stated. Suppose the side of the cube is x cm. Then the surface area is 6x2 cm So 6x2 = 600 => x2 = 100 => x = 10 cm.
496
There are infinitely many cubes between any two numbers - no matter how close together they are. However, there may be a more useful answer in terms of "perfect" cubes: 43 = 64 < 100 < 53 = 125 and 83 = 512 < 600 < 93 = 729 So there are 4 perfect cubes in the range - those of 5 6, 7 and 8.
100 is out of production, 600 is not and it has some slight modifications to it