Those are the cubes of the numbers 1-10. Just calculate the cube of 1, the cube of 2, the cube of 3, etc., up to the cube of 10.
101
1 and -1
151
If it was 1 one dot cube, you could only roll 1 number. If it was one dot cube. You could roll 6 numbers.
There is not a number that is a perfect square and perfect cube between 1 and 25.There is not a number that is a perfect square and perfect cube between 1 and 25.There is not a number that is a perfect square and perfect cube between 1 and 25.There is not a number that is a perfect square and perfect cube between 1 and 25.
Those are the cubes of the numbers 1-10. Just calculate the cube of 1, the cube of 2, the cube of 3, etc., up to the cube of 10.
101
1 and -1
Pr(Sum > 25) = Pr(Spinner = 30 or 40 and Cube = 6) = Pr(Spinner = 30 or 40)*Pr(Cube = 6) = 2/4 * 1/6 = 1/2*1/6 = 1/12 or 8.33... %
You cannot. And not all number cubes have the numbers 1-6 on them. For example, a doubling cube for backgammon.You cannot. And not all number cubes have the numbers 1-6 on them. For example, a doubling cube for backgammon.You cannot. And not all number cubes have the numbers 1-6 on them. For example, a doubling cube for backgammon.You cannot. And not all number cubes have the numbers 1-6 on them. For example, a doubling cube for backgammon.
151
Assuming the numbers on the cube are 1, 2, 3, 4, 5, and 6, 100% or 1. However, the question doesn't specify the numbers on the cube, so it technically could have 20, 21, 22, 23, 24, 25 written on it. The answer you are probably looking for is the first one, though a more rigorous answer would be "not enough information, the numbers on the cube aren't given".
If it was 1 one dot cube, you could only roll 1 number. If it was one dot cube. You could roll 6 numbers.
If the question is, "What are the 1st 5 cube numbers?" Then : 13 = 1 ; 23 = 8 ; 33 = 27 ; 43 = 64 and 53 = 125.
Just calculate the cube of 0, the cube of 1, the cube of 2, etc.
The first six cube numbers are equal to 1, 2, 3, 4, 5 and 6 cubed. Then these numbers are 1, 8, 27, 64, 125 and 216.