Updated for performance

src/main/java/mattrixwv/ProjectEuler/Problems/Problem27.java

@@ -1,11 +1,11 @@
-//ProjectEuler/Java/Problem27.java
+//ProjectEulerJava/src/main/java/mattrixwv/ProjectEuler/Problems/Problem27.java
 //Matthew Ellison
 // Created: 09-15-19
-//Modified: 09-15-19
+//Modified: 06-17-20
 //Find the product of the coefficients, |a| < 1000 and |b| <= 1000, for the quadratic expression that produces the maximum number of primes for consecutive values of n, starting with n=0.
 //Unless otherwise listed all non-standard includes are my own creation and available from https://bibucket.org/Mattrixwv/JavaClasses
 /*
-	Copyright (C) 2019  Matthew Ellison
+	Copyright (C) 2020  Matthew Ellison
 
 	This program is free software: you can redistribute it and/or modify
 	it under the terms of the GNU Lesser General Public License as published by
@@ -30,11 +30,11 @@ import java.util.ArrayList;
 
 public class Problem27 extends Problem{
 	//The A for the most n's generated
-	private Integer topA = 0;
+	private int topA = 0;
 	//The B for the most n's generated
-	private Integer topB = 0;
+	private int topB = 0;
 	//The most n's generated
-	private Integer topN = 0;
+	private int topN = 0;
 	//A list of all primes that could possibly be generated with this formula
 	private ArrayList<Integer> primes = Algorithms.getPrimes(12000);
 
@@ -46,12 +46,12 @@ public class Problem27 extends Problem{
 		timer.start();
 
 		//Start with the lowest possible A and check all possibilities after that
-		for(Integer a = -999;a <= 999;++a){
+		for(int a = -999;a <= 999;++a){
 			//Start with the lowest possible B and check all possibilities after that
-			for(Integer b = -1000;b <=1000;++b){
-				//Start with n=0 and check the formula to see how many primes you can get get with concecutive n's
-				Integer n = 0;
-				Integer quadratic = (n * n) + (a * n) + b;
+			for(int b = -1000;b <=1000;++b){
+				//Start with n=0 and check the formula to see how many primes you can get with concecutive n's
+				int n = 0;
+				int quadratic = (n * n) + (a * n) + b;
 				while(Algorithms.isFound(primes, quadratic)){
 					++n;
 					quadratic = (n * n) + (a * n) + b;
@@ -79,5 +79,5 @@ public class Problem27 extends Problem{
 The greatest number of primes found is 70
 It was found with A = -61, B = 971
 The product of A and B is -59231
-It took 4.772 seconds to solve this problem.
+It took 3.184 seconds to solve this problem.
 */