# CS106a Checkerboard optimization

I'm learning Java out of The Art & Science of Java by Roberts (Stanford's CS106a text). I'm using NetBeans as my IDE.

Chapter 4, exercise 14 asks you to expand on a Checkerboard program introduced earlier. Specifically, it asks you to center the checkerboard and draw a set of red & white checks corresponding to the initial state of the game.

I've accomplished as much as requested, but have two issues-

1. The board is not completely centered in the window. It is closer to the left side of the window than the right side. I am not sure how to center it more. Am I doing this right? Is there a setting in NetBeans I can/should change?

2. The checkers are supposed to take up a large portion of the tiles they sit on. I assigned the size of my checkers to be dependent on the size of tiles so that the setup would be simple and proportionate. Is there a better way to do this to make the checkers bigger?

``````import acm.graphics.*;
import acm.program.*;
import java.awt.*;

public class Checkerboard extends GraphicsProgram{

public void run(){

double sqSize = (double)getHeight() / N_ROWS;
for (int i = 0; i < N_ROWS; i++){
for(int j = 0; j < N_COLUMNS; j++){
double x = ((j * sqSize) + (getWidth() / N_COLUMNS));  //centers square??
double y = (i * sqSize);
GRect sq = new GRect( x, y, sqSize, sqSize );
sq.setFilled((i + j) % 2 != 0);
sq.setFillColor(Color.GRAY);
add(sq);

double circleCoord = (sqSize * .33);
double xx = ((j * sqSize) + (getWidth() / N_COLUMNS) + circleCoord);
double yy = ((i * sqSize) + circleCoord);

if((i + j) % 2 != 0 && i < 3 ){
GOval red = new GOval( xx, yy, circleCoord, circleCoord);
red.setFilled(true);
red.setFillColor(Color.RED);
add(red);

} else if((i + j) % 2 != 0 && i > 4 ){
GOval black = new GOval( xx, yy, circleCoord, circleCoord);
black.setFilled(true);
black.setFillColor(Color.BLACK);
add(black);
}

}
}
}
private static final int N_ROWS = 8;
private static final int N_COLUMNS = 8;

}
``````
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## 1 Answer

For 1. The center of the board should be in the center of the width, too. So we know that

The left edge of tile `N_COLUMNS/2` = `getWidth()/2` e.g. tile 4 in 0 indexing has its left edge in the center

And every tile left or right of that will have a movement of sqSize, so:

`double x = getWidth()/2 + (j-N_COLUMNS/2)*sqSize`

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Thank you, this solution makes sense and helps a lot! –  euphemism324 Feb 27 at 1:53
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