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I am new to Mathematica and my English isn't so good either. My apologies in advance for my bad English. I will try to do my best to write it effectively.

I have two questions:

Q1: I have three tables which give me values as {x1,y1,z1} ,{x2,y2,z2}...The code is given below:

    Table[Table[Table[ {xcord, ycord, zcord},  
                       {xcord, 0, 50, 5}],  
                       {ycord, 0, 50,5}],   
                       {zcord, 50, 150, 10}]  

Now I need an output like this

{1,x1,y1,z1}

{2,x2,y2,z2}

{3,x3,y3,z3}

.
.
{n,xn,yn,zn}

There are two problems with this.

First, I get my results formatted as something like this {x1,y1,z1},{x2,y2,z2} .... {xn,yn,zn}, but I want it formatted in this way:

 {x1,y1,z1}

 {x2,y2,z2}

 {x3,y3,z3}

 .
 .
 {xn,yn,zn}

Second, I can't number each set of elements adding the numbers in front of each set of elements like

{1,x1,y1,z1}

{2,x2,y2,z2}

{3,x3,y3,z3}

.
.
{n,xn,yn,zn}

I tried to make separate tables for each set of co-ordinates and number these corresponding to each set of the co-ordinates. Then I tried to get each of them in separate columns and join them but still I haven't been successful.

Q2: I would like to separate the values obtained from the tables above into a grid system like the one below. Something like how we all do in Excel where all values reside in a separate cells.

                 Number          X values  Y Values  Z values
                     1            x1        y1       z1
                     2            x2        y2       z2
                     .
                     .
                     n            xn        yn        zn
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3  
Incidentally, you don't have to nest Table like that. It accepts multiple iterators, i.e. Table[Table[ i + j, {j, 10}],{i,10}] is equivalent to Table[ i + j, {i, 10}, {j, 10}]. Note the order of the iterators is reversed. –  rcollyer Aug 26 '11 at 14:28
    
Thanks @rcollyer for letting me know an alternative way... –  Proj_UK Sep 2 '11 at 14:55
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2 Answers

up vote 2 down vote accepted

Perhaps:

i = 0; t2 = 
 Grid[Join[{{"Number", "X Values", "Y Values", "Z Values"}}, 
   Flatten[Table[{++i, xcord, ycord, zcord}, 
                              {xcord, 0, 50, 5}, 
                              {ycord, 0, 50, 5}, 
                              {zcord, 50, 150, 10}], 2]], 
 Frame -> All]

enter image description here

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Thanks a lot belisarius.. –  Proj_UK Aug 31 '11 at 22:24
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Perhaps this is what you are looking for.

The element numbers are added by two alternative methods, giving c and d.

a = Table[Table[Table[{xcord, ycord, zcord}, {xcord, 0, 50, 5}],
    {ycord, 0, 50, 5}], {zcord, 50, 150, 10}];
b = Flatten[a, 2];
c = MapIndexed[Flatten[{First[#2], #1}] &, b];
d = Transpose[Prepend[Transpose[b], Range[Length[b]]]];
Print[Row[{"c==d? ", c == d}]]
TableForm[Append[Take[c, 5], Table[".", {4}]],
 TableHeadings -> {None,
   {"Number", "X Values", "Y Values", "Z Values"}}]

c==d? True

Number X Values Y Values Z Values

1 0 0 50

2 5 0 50

3 10 0 50

4 15 0 50

5 20 0 50

. . . .

share|improve this answer
    
Thank you Chris –  Proj_UK Aug 31 '11 at 22:23
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