Only 1004.
There is no solution to: 4(2x + 2) + 12 > 1004(2x + 2) + 12 > 100 For 4(2x + 2) + 12 > 1004(2x + 2) + 12 to have a solution x < -1 which makes 1004(2x + 2) + 12 < 12, BUT 1004(2x + 2) + 12 is supposed to be greater than 100. Perhaps there is a missing operator in the digits of 1004?
1004
4*1/1004*1/1004*1/1004*1/100
31.685959
1004
Four - zeros between significant digits are significant.
The possible 4 digit codes using the numbers 0-9 are every number between 0 and 9999. For numbers that have less than 4 digits, just precede the number with 0's. 10,000 possibilities
There is no solution to: 4(2x + 2) + 12 > 1004(2x + 2) + 12 > 100 For 4(2x + 2) + 12 > 1004(2x + 2) + 12 to have a solution x < -1 which makes 1004(2x + 2) + 12 < 12, BUT 1004(2x + 2) + 12 is supposed to be greater than 100. Perhaps there is a missing operator in the digits of 1004?
50% of 1004: = 50% x 1004 = 0.50 x 1004 = 502
0, 1, 2, 3, 4, 5, 6, 7,.......101, 102, 103, 104, 105, 1001, 1002, 1003, 1004, 1005,........ 5001, 5002, 5003, 5004, 5005,.......9996, 9997, 9998, 9999 If it MUST be all four digits then the first thousand would just be changed to 0000, 0001, 0002, 0003 and so on.
0
1004
-1004
The positive integer factors of 1004 are: 1, 2, 4, 251, 502, 1004
MIV = 1004MIV = 1004MIV = 1004MIV = 1004MIV = 1004MIV = 1004MIV = 1004MIV = 1004MIV = 1004
4*1/1004*1/1004*1/1004*1/100
1, 2, 4, 251, 502, 1004.