[Guest]

There are exactly four positive integers in existence that are equal to the sum of the cubes of their digits ... Can you find them ?

P.S. This is kind of like the inverse of Ben Law's problem here.

[Guest]

Hope I did got the problem right.

Found 2, but it seems there are more then 4.

153 and 1

[Guest]

Hope I did got the problem right.

Found 2, but it seems there are more then 4.

153 and 1

You got it wrong ....

153 => 1+5+3=9 => 9*9*9= 729 and 153 is not equal to 729

[Guest]

Hope I did got the problem right.

Found 2, but it seems there are more then 4.

153 and 1

You got it wrong ....

153 => 1+5+3=9 => 9*9*9= 729 and 153 is not equal to 729

Ostap, you are correct in both cases. 1 is actually not a number I considered in the "exactly 4" from the OP, but it is 100% correct, so there are actually 5 and you have found 2.

Ben, you mixed up the sum and cubing steps. 153 => 1^3 + 5^3 + 3^3 = 1 + 125 + 27 = 153

[Prime]

What do you mean only 4?

I found 6.

0 = 0³

1 = 1³

153 = 1³ + 5³ + 3³

370 = 3³ + 7³ + 0³

371 = 3³ + 7³ + 1³

407 = 4³ + 0³ + 7³

[Guest]

What do you mean only 4?

I found 6.

0 = 0³

1 = 1³

153 = 1³ + 5³ + 3³

370 = 3³ + 7³ + 0³

371 = 3³ + 7³ + 1³

407 = 4³ + 0³ + 7³

Yay, Prime found all four of mine, the "1" that I forgot about and was discussed earlier, and "0" isn't actually a positive integer so it doesn't really count.

[Prime]

Yay, Prime found all four of mine, the "1" that I forgot about and was discussed earlier, and "0" isn't actually a positive integer so it doesn't really count.

Is zero negative, or is it not an integer?

[Guest]

Is zero negative, or is it not an integer?

I don't think it is negative OR positive. It is an integer though.

In any case, Wolfram agrees that it is not a positive integer: http://mathworld.wolfram.com/PositiveInteger.html

[Guest]

I got 153, 370, 371, and 407. Not sure if 1 is included because its too simple .