# Printing the patterns using only one loop

I have printed this pattern using one loop:

``````*
**
***
****
*****

String s = "";
for (i = 1; i <= n; ++i) {
s += "*";
System.out.println(s);
}
``````

Now i want how to print following patterns using only one loop.

``````1)
*
* *
* * *
* * * *
* * * * *

2)
* * * * *
* * * *
* * *
* *
*

3)
1 2 3 4 5
1 2 3 4
1 2 3
1 2
1
``````

and other similar patterns using only one loop, I have done all of them using more than one loop.

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So what do you think you would need to do? How do you turn two loops into one? e.g. what is the difference between loop 0..N-1 { loop 0..M-1 } and loop 0..N*M-1. They both go around the same number of times. ;) – Peter Lawrey Dec 18 '12 at 16:14
Why is this specific requirement of single loop? – Rohit Jain Dec 18 '12 at 16:15
@RohitJain I am pretty sure these sort of questions are only as an acedemic exercise. ;) – Peter Lawrey Dec 18 '12 at 16:16
I want optimization. The time complexity of two loops will be O(n^2) whereas for only one loop it will be O(n). And O(n) < O(n^2). – coder005 Dec 18 '12 at 16:17
Yes, printing triangle patterns can be very resources intensive in modern business information systems. It is understandable you need to reduce the complexity of it. This would give you a great deal of advantages before your competitors. – dotvav Dec 18 '12 at 16:22

I want optimization. The time complexity of two loops will be O(n^2) whereas for only one loop it will be O(n). And O(n) < O(n^2).

You realise that 99.999% of the time will be spent updating the console. If you want to save time, don't write anything. The time taken to loop is trivial by comparison.

BTW The number of stars you produce will be O(N^2) so the time complexity with be O(N^2) whether you use 1, 2 or 3 loops.

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can you explain briefly.I didn't got it.How can it be O(N^2) as there is only one for loop? – coder005 Dec 18 '12 at 16:35
You need to produce N^2 stars, so the one loop has to iterate N^2 times. If you use three loops, it would still be O(N^2) The O is not just a matter of counting the number of loops. ;) – Peter Lawrey Dec 18 '12 at 16:38
``````    *
* *
* * *
* * * *
* * * * *
``````

Write some requirements - then the solution becomes clear:

• on iteration 0, print 1 `"* "` sequence at position 4
• on iteration 1, print 2 `"* "` sequences at position 3
• on iteration 2, print 3 `"* "` sequences at position 2
• on iteration 3, print 4 `"* "` sequences at position 1
• on iteration 4, print 5 `"* "` sequences at position 0
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but the no. of lines is to be taken input from user then?? it should be generalised. – coder005 Dec 18 '12 at 16:40
You showed three patterns with five lines each. No requirement for `n` lines. (which, btw. is trivial: start with `int numLines=5;` and implement the loop, then change the value to something else and read from the console, once the algorithm gives expected results for all input (including negative values, 0 and incredibly big numbers)) – Andreas_D Dec 18 '12 at 16:45

int col=1; int space=4;

``````   for(int i=1;i<=5;i++){
for(int j=1;j<=space;j++){
System.out.print(" ");

}
space--;

for(int j=1;j<=col;j++){
System.out.print("*");
}
System.out.println();
col=col+2;
``````
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why does this solve the question? don't dump your code here, explain! – stefan Oct 2 '13 at 20:13

I want optimization. The time complexity of two loops will be O(n^2) whereas for only one loop it will be O(n). And O(n) < O(n^2).

Would the optimal solution be no loops?

``````System.out.println("     *\n    * *\n   * * *\n  * * * *\n* * * * *");
``````

If you really want to do this with one loop, you can use the power of the comma operator and the String `format()` and `replace()` methods:

``````int j = triangle_levels - 1; // triangle_levels is some int you can make 5, but this
// is more generic
for(int i = 0; i < triangle_levels; j--, i++) {
System.out.println("%" + j + "s", " ");
System.out.println("%0" + (i+1) + "d", 0).replace("0", "* "));
}
``````

This will allow you to print the number of spaces without a second loop, followed by a pattern of `*`'s.

You can use this type of solution to make a triangle of any orientation.

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