# Convert vector into a triangular matrix

I have a vector of 874! elements, which I want to turn into a triangular matrix (i.e. the top right hand corner of a square matrix).

Example Input:

``````1
2
3
4
5
6
7
8
9
10
``````

Example Output:

``````1 2 4 7
3 5 8
6 9
10
``````

Blanks could be filled with NAs. I'd prefer if the matrix were this way around.

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Are the differences between consecutive elements at the same row/column necesarily incremental? – Pablo Francisco Pérez Hidalgo Mar 20 '14 at 12:06
No, they're not – Joni Mar 20 '14 at 12:07
I have edited my answer with a better calculation of the square matrix dimensions – Pablo Francisco Pérez Hidalgo Mar 20 '14 at 21:04

## 1 Answer

I don't know which programming language do you want to use neither do I understand which order do you want your numbers to be stored in.

You should consider that having N elements, if you want to generate an square matrix its dimensions (n rows and columns) are given by:

``````N = (n*(n+1))/2
``````

So a first approach (you should consider if your input vector has x^2/2 elements) in Python could be:

``````from math import sqrt

x = range(1,25+1) # This is your input vector
N = len(x)

#N = (n*(n+1))/2 # Number of elements being stored in a triangular matrix.
n = (-1.0+sqrt(1.0+8.0*N))/2.0 # Solve the equation given by the previous relation.
n = int(round(n)) # Making it integer...

while (n*(n+1))/2 < N: # ... losing precission so we should use the first n being able ...
if (n*(n+1))/2 < N: # ... to store your vector is used.
n += 1

res = [[0]*n for i in xrange(n)] # Here, we create a n*n matrix filled with zeros.
x = x[::-1] #Reverse the input so it can be consumed using pop (O(1) each extraction)

for j in xrange(n): # Fill the empty matrix following the triangular pattern and using...
if not x:
break
for i in xrange(j+1):
if not x:
break
res[i][j] = x.pop() # The elements from your input vector.

for row in res: # Let's print the result!
print(row)
``````

The idea is to consume x filling the square matrix (res) with is values in the right order. This can easily done once you now your target matrix dimesions.

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