Java - toString method for polynomial Terms

I have created a polynomial class without using Polynomial, I am using my own `Term(coefficient, exponent)` to create the polynomial expression.

I have some conditions which are as follows:

``````coefficient = 0 -> Term(0,2) -> 0x^2 -> "0"
coefficient = 1 -> Term(1,2) -> 1x^2 -> "x^2"
coefficient = -1 -> Term(-1,2) -> -1x^2 -> "-x^2"
exponent = 1 = -> Term(5,1) -> 5x^1 -> "5x"
exponent = 0 = -> Term(5,0) -> 5x^0 -> "5"
``````

But implementing all of these to function in and around each other is causing me a massive headache, for example if I have `Term(-1,1)` I would like `"-x"` to appear, and `"x"` for `Term(1,1)`. Can anyone help with thinking of some sort of logic to group all of these "rules" together for a toString method?

-

I think, you don't expo will not be negative. Try something as below:

``````@Override
public String toString() {
if(coef ==0){
return "0";
}else if(expo ==0){
return ""+coef;
}else{
String pref = coef==1? "": coef==-1?"-":""+coef;
String suff = expo>1? "^"+expo:"";
return pref+"x"+suff;
}
}
``````

EDIT: To use `StringBuilder`, change last statement as below(I don't see much benefit though)

``````   return new StringBuilder(pref).append("x").append(suff).toString();
``````
-
This will return `1` for `Term(5,0)`. `5` is the right value, because `5*x^0` is `5*1` is `5`, not `1`. – dasblinkenlight Nov 16 '12 at 21:17
@dasblinkenlight: I got confused with x and simple powers. Updated the answer. Please check and let me know, if there is any gap left. To me it looks working fine. – Yogendra Singh Nov 16 '12 at 21:24
`5x^0` is representing `5 * x^0`, so while `x^0` is indeed 1, `5*1 = 5` – germainelol Nov 16 '12 at 21:24
@user1828314: Yes, I understood. I already updated the answer. Please check and let me know, if there is any gap left. To me it looks working fine. – Yogendra Singh Nov 16 '12 at 21:25
@YogendraSingh Yes this gives errors, for example test number one is (-7,0), which should print "-7", but yours is printing "1". – germainelol Nov 16 '12 at 21:28

You can combine the first special case with the last one. You can also combine the second and third cases by looking at the `abs` value of the coefficient.

``````// If the coefficient is zero or the exponent is zero,
// the result is simply the coefficient:
if (c == 0 || e == 0) {
return ""+c;
}
StringBuilder res = new StringBuilder();
// Do not print the number for the coefficient of +/- 1
if (Math.abs(c) == 1) {
// For +1 do not print the sign either
if (c == -1) {
res.append("-");
}
} else {
res.append(c);
}
res.append("x");
// For exponent of 1, do not print ^1
if (e != 1) {
res.append("^");
res.append(e);
}
return res.toString();
``````
-
I like the idea of using StringBuilder for this, when thinking the different rules through logically, it is a case of building a string to represent the polynomial expression as you go along which is what you have done. I don't like the idea of having hundreds of if statements as it is just confusing to look at so thank you. – germainelol Nov 16 '12 at 21:22

The order is important here. If you think it through, you will see that `coefficient = 0` should go first, since when it is zero nothing else matters. Next are the special cases for when the `exponent` equals `1` or `0`. Then you have when the `coefficient` is `-1`. All that is left then is the default case of either a negative `coefficient` other than `-1` or a positive `coefficient`. So the if statement should look like:

``````public String toString() {
if(coefficient == 0){
return "0";
} else if ( coefficient == 1 && exponent != 0){
return "x^"+exponent;
} else if ( exponent == 1){
return coefficient+"x";
} else if ( exponent == 0){
return ""+coefficient;
} else if ( coefficient == -1){
return "-x^"+exponent;
} else {
return coefficient+"x^"+exponent;
}
}
``````
-
@dasblinkenlight is correct yes – germainelol Nov 16 '12 at 21:22

This is as close as I got to to make it clear

``````public class Term {
private final int coefficient;
private final int exponent;

public Term (final int coefficient,final int exponent) {
this.coefficient = coefficient;
this.exponent = exponent;
}

@Override
public String toString() {
final String sign = getSign (coefficient);
final String number = getNumber (coefficient);
final String exponentStr = getExponentStr (coefficient, exponent);

return String.format ("%s%s%s",sign, number, exponentStr);
}

private String getExponentStr(final int coefficient, final int exponent) {
if (coefficient == 0 || exponent == 0) {
return "";
}
if (exponent == 1) {
return "x";
}
return "x^" + exponent;
}

private String getNumber(final int value) {
final int absValue = Math.abs(value);

return absValue == 1 ? "" : Integer.toString (absValue);
}

private String getSign(final int value) {
return value < 0 ? "-" : "";
}

public static void main(String[] args) throws Exception {
System.out.println(new Term (0, 2));
System.out.println(new Term (1, 2));
System.out.println(new Term (-1, 2));
System.out.println(new Term (5, 1));
System.out.println(new Term (5, 0));
}
}
``````

And a fiddle for it.

-

Hmmm there really isn't much you can do to make it easier. you essentially have the following cases:

Coefficient = 0 --> Display 0 (exponent irrelevant)
Coefficient = +/- 1 --> Display - if -1 (special case of (-1,0)), nothing otherwise
Other Coefficients --> Display as stored

Exponent = 0 --> display nothing
Otherwise, display x^exponent...

So.....

``````public String toString() {
String term = "";

if (coefficient == 0) {
return "0";
} elseif (coefficient == -1) {
if (exponent == 0) {
return "-1";
} else {
term += "-";
}
} elseif (coefficient != 1) {
term += String.valueOf(coefficient);
} else {
if (exponent == 0) {
return "1";
}
}

if (exponent != 0) {
if (exponent == 1) {
term += "x";
} else {
term += "x^" + String.valueOf(exponent);
}
}

return term;
}
``````

I think that covers it? I didn't put it through UnitTest to really be sure.

-
Only error here I get is with `(-5,1)` it should print `"-5x"` but it prints `"-5x^1"` – germainelol Nov 16 '12 at 21:32
My apologies, I completely skipped over that part of exponentials. I'll fix – Grambot Nov 16 '12 at 21:34