Zero divided by three is zero. Figure it out from there.

0/3=0. An integer is a non-decimal, non-fractional real number. A whole number is a non-negative integer. A natural number is a positive whole number. I have given you a hint, but it is really up to you to do your own homework.

Depends on context! This will help you answer it: Integers are ...,-4,-3,-2,-1,0,1,2,3,4,... Whole numbers certainly include the numbers 1,2,3,4,... BUT whether whole numbers include 0 or negative numbers depends on who you ask. Natural numbers are 1,2,3,4,... Many people, but not all, call 0 a natural number too. No one includes negative numbers in natural numbers. Normally these sets of numbers are separate. It would be stated which set the "Zero" and the "Three" came from, so you would know what kind of number to expect already, and if natural or whole number you would be told whether zero and negative numbers were included before you even get to the zero divided by three bit. But mathematicians get all excited and say, hey look, these natural numbers behave just like integers, etc, and so the distinction between the sets can get a bit blurry. This is called homomorphism!

[^^^] = [ ( 0 ) ÷ 3 = ( 0 ) ] = [ ( 1 - 1 ) ÷ 3 = ( 0 ) ] = [ ( 1 - 1 ) / 3 = ( 0 ) ] = [ 1/3 - 1/3 = ( 0 ) ] = [ ( 0 ) = ( 0 ) ] -------------------------------- LB121. [ ( 0 ) ÷ 1 = ( 0 ) ], Proof 0. ( N ) = ( Number ), ( / ) = ( ÷ ) = ( Division ), [ N - N = ( 0 ) ], [ Living Zero ( 0 ) = ( N - N ) ] [ 1 - 1 = ( 0 ) ], [ Living Zero ( 0 ) = ( 1 - 1 ) ] [ - { ( 0 ) } ] = [ + { ( 0 ) } ] [ - { N - N } ] = [ + { N - N } ] [ - { 1 - 1 } ] = [ + { 1 - 1 } ] 1. [ ( 0 ) ] = [ We have no (Partial Fortune). ] 2. Proof ( directly ) [^^^] = [ ( 0 ) X N = ( 0 ) ] = [ { ( 0 ) } X N = ( 0 ) ] = [ { N - N } X N = ( 0 ) ] = [ { N X N } - { N X N } = ( 0 ) ] = [ { N^2 } - { N^2 } = ( 0 ) ] = [ N^2 - N^2 = ( 0 ) ] 3. Proof, [ at the proof of [ ( 0 ) X N = ( 0 ) ] ] [^^^] = [ ( 0 ) X N = ( 0 ) ] = [ < ( 0 ) > X N = ( 0 ) ] = [ < ( 0 ) > = ( 0 ) ÷ N ] = [ ( 0 ) ÷ N = < ( 0 ) > ] = [ ( 0 ) ÷ N = ( 0 ) ] 4. Proof ( directly ) [^^^] = [ ( 0 ) ÷ N = ( 0 ) ] = [ { ( 0 ) } ÷ N = ( 0 ) ] = [ { N - N } ÷ N = ( 0 ) ] = [ { N - N } ÷ N = ( 0 ) ] = [ { N - N } / N = ( 0 ) ] = [ { N / N } - { N / N } = ( 0 ) ] = [ { 1 } - { 1 } = ( 0 ) ] = [ 1 - 1 = ( 0 ) ] = [ ( 0 ) = ( 0 ) ] 5. Example [^^^] = [ ( 0 ) ÷ 1 = ( 0 ) ] = [ { ( 0 ) } ÷ 1 = ( 0 ) ] = [ { 1 - 1 } ÷ 1 = ( 0 ) ] = [ { 1 - 1 } ÷ 1 = ( 0 ) ] = [ { 1 - 1 } / 1 = ( 0 ) ] = [ { 1 / 1 } - { 1 / 1 } = ( 0 ) ] = [ { 1 } - { 1 } = ( 0 ) ] = [ 1 - 1 = ( 0 ) ] = [ ( 0 ) = ( 0 ) ] http://www.youtube.com/user/trapassing http://www.flickr.com/photos/trapassing I cannot english. 1/5. [ Copyright of Image and Sentence ] 2/5. Copyright Notice : Copyright © (Coupdetat.net) 3/5. Do not Editing 4/5. Free Copyright (Use Only) : Personal Homepage and Blog 5/5. Copyright (No Use) : Profit-Making, Enterprise, Government