55 + (55/5) = 66
It can't be done using only five 5s, but using six 5s you can get it: 37 = 555/(5+5+5) it can be done using five 5's (5+5/5) ** 5) + 5 ** = power operation actually the above should be written as: ((5+5)/5)^5 + 5 5!/(5+5) + (5*5) will work also
To get 80 using four number 5s, you can use the following mathematical expression: (5 x 5) + (5 x 5) + (5 - 5) = 80. This equation breaks down to 25 + 25 + 0 = 80. By multiplying two fives to get 25 twice and subtracting 5 from 5 to get 0, you can achieve a total of 80.
Five thousand, five hundred respectively.
They are fifty = 50 and five = 5
The perimeter of a regular pentagon is the total length of all its sides, which can be expressed as 5 times the length of one side (s). If the perimeter is given as (10s - 20), we can set up the equation (5s = 10s - 20). Solving for (s), we rearrange the equation to (20 = 10s - 5s), which simplifies to (5s = 20). Thus, (s = 4), meaning each side of the pentagon is 4 units long.
If: 5s = 33 Then: s = 33/5 = 6.6
It can't be done using only five 5s, but using six 5s you can get it: 37 = 555/(5+5+5) it can be done using five 5's (5+5/5) ** 5) + 5 ** = power operation actually the above should be written as: ((5+5)/5)^5 + 5 5!/(5+5) + (5*5) will work also
5!/(5+5) + (5*5)
To get 80 using four number 5s, you can use the following mathematical expression: (5 x 5) + (5 x 5) + (5 - 5) = 80. This equation breaks down to 25 + 25 + 0 = 80. By multiplying two fives to get 25 twice and subtracting 5 from 5 to get 0, you can achieve a total of 80.
5S in Total Quality Management (TQM) is a systematic approach to workplace organization. 5S is about efficiency, competitiveness and survival.
The five on the left is ten times the five on the right.
Five thousand, five hundred respectively.
The five on the left is ten times the five on the right.
(5 x 5) + (5 x 5) + 5 = 25 + 25 + 5 = 50 + 5 = 55
They are fifty = 50 and five = 5
The perimeter of a regular pentagon is the total length of all its sides, which can be expressed as 5 times the length of one side (s). If the perimeter is given as (10s - 20), we can set up the equation (5s = 10s - 20). Solving for (s), we rearrange the equation to (20 = 10s - 5s), which simplifies to (5s = 20). Thus, (s = 4), meaning each side of the pentagon is 4 units long.
3.5555 repeating