I have created a very modular and easy to follow solution.

**Edit**: Converted `digitAtIndex()`

to a purely numerical calculation.

Kept the original and called it `digitAtStrIndex()`

.

```
public class IntegerColumns {
public IntegerColumns() {
int[] arr = new int[] {9, 21, 501, 63};
printColumnMajorOrder(arr);
}
public static void main(String[] args) {
new IntegerColumns();
}
// --------------------- Primary Functions --------------------------
// Prints out an Array of Integers, each in a vertical column
public void printColumnMajorOrder(int[] arr) {
int cols = arr.length;
int rows = maxDigits(arr);
for (int r = 0; r < rows; r++) {
for (int c = 0; c < cols; c++) {
int d = digitAtIndex(arr[c], r);
System.out.printf("%s\t", d >= 0 ? Integer.toString(d) : " ");
}
System.out.println();
}
}
// Returns the length of an Integer
public int numDigits(int i) {
if (i <= 0) return 0;
return (int)Math.floor(Math.log10(i))+1;
}
// Numeric calculation to find a digit at a specified index
public int digitAtIndex(int num, int index) {
int digits = numDigits(num);
int deg = digits - index - 1;
int pow = (int)Math.pow(10, deg);
return pow > 0 ? (int)(num/pow)%10 : -1;
}
// Returns the number of digits for the longest Integer in an Array
public int maxDigits(int[] arr) {
int max = 0;
for (int i : arr) {
int size = numDigits(i);
if (size > max) max = size;
}
return max;
}
// ---------------------- Extra Functions ---------------------------
// Hybrid of Integer and Substrings - String manipulation = slow
public int digitAtStrIndex(int number, int i) {
String n = Integer.toString(number);
return n.length() > i ? Integer.parseInt(n.substring(i, i+1)) : -1;
}
// Prints the digits of a number vertically
public void printNumberVertical(int num) {
for (int i = 0; i < numDigits(num); i++)
System.out.println(digitAtIndex(num, i));
}
}
```