To calculate the number of 5-digit number combinations from 1 to 60, we first need to determine the total number of 5-digit numbers possible within this range. The smallest 5-digit number starting from 1 is 10,000, and the largest 5-digit number within the range is 60,000. To find the total number of combinations, we subtract the smallest from the largest and add 1: 60,000 - 10,000 + 1 = 50,001. Therefore, there are 50,001 different 5-digit number combinations possible from 1 to 60.
60!/55! x 5! = 60 x 59 x 58 x 57 x 56/5 x 4 x 3 x 2 = 5,461,512
There are 60 possible numbers for the first number, A, in the combination (1,2,3,...,59,60).For each of outcome of A, there are 60 outcomes for the second number, B, giving a two digit combination 60x60=360 possibilities.For each of these 360 outcomes, there are 60 outcomes for the third number, C, making the number of possible combinations 360x60=21600.Or 60 possibilities x 60 possibilities x 60 possibilities = 21,600 possibilities.
The possible combinations of a set of 60 different numbers would be 60! or 60 factorial. This is a very number at 8.3209871 x 10 ^ 81, or a figure with 81 zeroes behind it. The official short scale name would be 8.3209871 "Sesvigintillion".
60
Sixty and sixty-eight thousandths can be written as 60.068 in decimal form. In this representation, the number 60 represents the whole number part, the digit 0 represents the tenths place, the digit 6 represents the hundredths place, and the digit 8 represents the thousandths place. This number falls between 60 and 61 on the number line.
60!/55! x 5! = 60 x 59 x 58 x 57 x 56/5 x 4 x 3 x 2 = 5,461,512
It can be calculated as factorial 44! = 4x3x2x1= 60
There are 60 combinations
There are 60 possible numbers for the first number, A, in the combination (1,2,3,...,59,60).For each of outcome of A, there are 60 outcomes for the second number, B, giving a two digit combination 60x60=360 possibilities.For each of these 360 outcomes, there are 60 outcomes for the third number, C, making the number of possible combinations 360x60=21600.Or 60 possibilities x 60 possibilities x 60 possibilities = 21,600 possibilities.
The digit in the units column of the number 60 is the 0.
60
If you assume that each number can only be used once, you have 60 choices for the first number, 59 for the second, 58, for the third, and 57 for the fourth. This would be 60 x 59 x 58 x 57 = 11,703,240 ways. If you assume that each number can be used multiple times, you have 60 choices for each of the four numbers. This would be 60 x 60 x 60 x 60 = 12,960,000 ways.
They are: 2*2*3*5 = 60
The "combination" for a lock is actually a permutation, an ordered sequence. So for example: 1,2,3 and 3,2,1 are the same combination, but a different permutation. When opening a lock, obviously the sequence is important, so we want to calculate the permutations. To do that, you multiply the number of possible choices for the first position times the number of possible choices for the second position, etc. Assuming that you can use the same number in all three positions (so 60 to the left, 60 to the right and 60 to the left is a valid choice), there are 60 x 60 x 60 possible permutations, or "combinations" for the lock = 216,000. If you were not allowed to use the same number twice, it would be 60 x 59 x 58 = 205,320. If you could repeat the same number, but not in sequence (so 20, 30, 20 is OK; but 20, 20, 30 is not), then there would be 60 x 59 x 59 = 208,860.
The possible combinations of a set of 60 different numbers would be 60! or 60 factorial. This is a very number at 8.3209871 x 10 ^ 81, or a figure with 81 zeroes behind it. The official short scale name would be 8.3209871 "Sesvigintillion".
60 is the number in which the digit 6 have a greater value as compared to 106.
60