There are n! (n factorial) ways that n people can stand in line. So six people can stand in line in: 1*2*3*4*5*6 = 720 different ways
1. 1232. 1323. 2314. 2135. 3216. 312
6:00
Yes, that is possible.
Six ways:One dime, one nickel, and one penny.One dime, six pennies.Three nickels, one penny.Two nickels, six pennies.One nickel, 11 pennies.Sixteen pennies.
There are n! (n factorial) ways that n people can stand in line. So six people can stand in line in: 1*2*3*4*5*6 = 720 different ways
To calculate the number of ways 3 people can line up, you can use the factorial function. The factorial of a number is the product of all positive integers up to that number. In this case, the number of ways 3 people can line up is 3 factorial, which is equal to 3 x 2 x 1 = 6 ways. Therefore, there are 6 different ways for 3 people to line up.
Six ways.
6! = 720
Hkfg
Draw one side of the square and label it A.Suppose the other three sides of the square are B, C and D.You can draw these in orders:BCD, BDC, CBD, CDB, DBC and DCB. Six ways in all.Alternative answer:Use a pencil, a chalk, a crayon, a pen, a paint brush, and your finger in the sand.
54,45,5.4,4.5
1. 1232. 1323. 2314. 2135. 3216. 312
6:00
Yes, that is possible.
6/86.008
About six different ways : 1. Sixteen 2. 6 teen 3. 6-teen 4. 6teen 5. 16 6. Six teen