mirror of https://github.com/DanilaFe/abacus
352 lines
15 KiB
Java
Executable File
352 lines
15 KiB
Java
Executable File
package org.nwapw.abacus.plugin;
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import org.nwapw.abacus.function.Function;
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import org.nwapw.abacus.function.Operator;
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import org.nwapw.abacus.function.OperatorAssociativity;
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import org.nwapw.abacus.function.OperatorType;
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import org.nwapw.abacus.number.NaiveNumber;
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import org.nwapw.abacus.number.NumberInterface;
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import org.nwapw.abacus.number.PreciseNumber;
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import java.util.ArrayList;
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import java.util.HashMap;
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import java.util.function.BiFunction;
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/**
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* The plugin providing standard functions such as addition and subtraction to
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* the calculator.
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*/
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public class StandardPlugin extends Plugin {
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private static HashMap<Class<? extends NumberInterface>, ArrayList<NumberInterface>> factorialLists = new HashMap<Class<? extends NumberInterface>, ArrayList<NumberInterface>>();
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/**
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* The addition operator, +
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*/
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public static final Operator OP_ADD = new Operator(OperatorAssociativity.LEFT, OperatorType.BINARY_INFIX, 0, new Function() {
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@Override
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protected boolean matchesParams(NumberInterface[] params) {
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return params.length >= 1;
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}
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@Override
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protected NumberInterface applyInternal(NumberInterface[] params) {
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NumberInterface sum = params[0];
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for (int i = 1; i < params.length; i++) {
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sum = sum.add(params[i]);
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}
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return sum;
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}
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});
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/**
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* The subtraction operator, -
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*/
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public static final Operator OP_SUBTRACT = new Operator(OperatorAssociativity.LEFT, OperatorType.BINARY_INFIX, 0, new Function() {
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@Override
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protected boolean matchesParams(NumberInterface[] params) {
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return params.length == 2;
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}
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@Override
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protected NumberInterface applyInternal(NumberInterface[] params) {
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return params[0].subtract(params[1]);
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}
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});
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/**
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* The multiplication operator, *
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*/
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public static final Operator OP_MULTIPLY = new Operator(OperatorAssociativity.LEFT, OperatorType.BINARY_INFIX, 1, new Function() {
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@Override
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protected boolean matchesParams(NumberInterface[] params) {
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return params.length >= 1;
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}
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@Override
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protected NumberInterface applyInternal(NumberInterface[] params) {
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NumberInterface product = params[0];
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for (int i = 1; i < params.length; i++) {
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product = product.multiply(params[i]);
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}
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return product;
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}
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});
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/**
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* The division operator, /
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*/
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public static final Operator OP_DIVIDE = new Operator(OperatorAssociativity.LEFT, OperatorType.BINARY_INFIX, 1, new Function() {
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@Override
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protected boolean matchesParams(NumberInterface[] params) {
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return params.length >= 1;
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}
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@Override
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protected NumberInterface applyInternal(NumberInterface[] params) {
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NumberInterface product = params[0];
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for (int i = 1; i < params.length; i++) {
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product = product.multiply(params[i]);
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}
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return product;
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}
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});
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/**
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* The factorial operator, !
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*/
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public static final Operator OP_FACTORIAL = new Operator(OperatorAssociativity.RIGHT, OperatorType.UNARY_POSTFIX, 0, new Function() {
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//private HashMap<Class<? extends NumberInterface>, ArrayList<NumberInterface>> storedList = new HashMap<Class<? extends NumberInterface>, ArrayList<NumberInterface>>();
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@Override
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protected boolean matchesParams(NumberInterface[] params) {
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return params.length == 1;
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}
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@Override
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protected NumberInterface applyInternal(NumberInterface[] params) {
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if (params[0].signum() == 0) {
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return (new NaiveNumber(1)).promoteTo(params[0].getClass());
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}
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NumberInterface factorial = params[0];
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NumberInterface multiplier = params[0];
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//It is necessary to later prevent calls of factorial on anything but non-negative integers.
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while ((multiplier = multiplier.subtract(NaiveNumber.ONE.promoteTo(multiplier.getClass()))).signum() == 1) {
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factorial = factorial.multiply(multiplier);
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}
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return factorial;
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/*if(!storedList.containsKey(params[0].getClass())){
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storedList.put(params[0].getClass(), new ArrayList<NumberInterface>());
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storedList.get(params[0].getClass()).add(NaiveNumber.ONE.promoteTo(params[0].getClass()));
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storedList.get(params[0].getClass()).add(NaiveNumber.ONE.promoteTo(params[0].getClass()));
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}*/
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}
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});
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/**
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* The caret / pow operator, ^
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*/
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public static final Operator OP_CARET = new Operator(OperatorAssociativity.RIGHT, OperatorType.BINARY_INFIX, 2, new Function() {
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@Override
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protected boolean matchesParams(NumberInterface[] params) {
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return params.length == 2;
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}
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@Override
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protected NumberInterface applyInternal(NumberInterface[] params) {
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return FUNCTION_EXP.apply(FUNCTION_LN.apply(params[0]).multiply(params[1]));
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}
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});
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/**
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* The absolute value function, abs(-3) = 3
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*/
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public static final Function FUNCTION_ABS = new Function() {
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@Override
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protected boolean matchesParams(NumberInterface[] params) {
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return params.length == 1;
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}
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@Override
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protected NumberInterface applyInternal(NumberInterface[] params) {
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return params[0].multiply((new NaiveNumber(params[0].signum())).promoteTo(params[0].getClass()));
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}
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};
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/**
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* The exponential function, exp(1) = e^1 = 2.71...
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*/
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public static final Function FUNCTION_EXP = new Function() {
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@Override
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protected boolean matchesParams(NumberInterface[] params) {
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return params.length == 1;
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}
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@Override
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protected NumberInterface applyInternal(NumberInterface[] params) {
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NumberInterface maxError = getMaxError(params[0]);
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int n = 0;
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if(params[0].signum() <= 0){
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NumberInterface currentTerm = NaiveNumber.ONE.promoteTo(params[0].getClass()), sum = currentTerm;
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while(FUNCTION_ABS.apply(currentTerm).compareTo(maxError) > 0){
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n++;
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currentTerm = currentTerm.multiply(params[0]).divide((new NaiveNumber(n)).promoteTo(params[0].getClass()));
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sum = sum.add(currentTerm);
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}
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return sum;
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}
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else{
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//We need n such that x^(n+1) * 3^ceil(x) <= maxError * (n+1)!.
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//right and left refer to lhs and rhs in the above inequality.
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NumberInterface sum = NaiveNumber.ONE.promoteTo(params[0].getClass());
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NumberInterface nextNumerator = params[0];
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NumberInterface left = params[0].multiply((new NaiveNumber(3)).promoteTo(params[0].getClass()).intPow(params[0].ceiling())), right = maxError;
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do{
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sum = sum.add(nextNumerator.divide(factorial(params[0].getClass(), n+1)));
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n++;
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nextNumerator = nextNumerator.multiply(params[0]);
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left = left.multiply(params[0]);
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NumberInterface nextN = (new NaiveNumber(n+1)).promoteTo(params[0].getClass());
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right = right.multiply(nextN);
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//System.out.println(left + ", " + right);
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}
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while(left.compareTo(right) > 0);
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//System.out.println(n+1);
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return sum;
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}
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}
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};
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/**
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* The natural log function.
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*/
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public static final Function FUNCTION_LN = new Function() {
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@Override
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protected boolean matchesParams(NumberInterface[] params) {
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return params.length == 1;
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}
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@Override
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protected NumberInterface applyInternal(NumberInterface[] params) {
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NumberInterface param = params[0];
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int powersOf2 = 0;
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while (FUNCTION_ABS.apply(param.subtract(NaiveNumber.ONE.promoteTo(param.getClass()))).compareTo((new NaiveNumber(0.1)).promoteTo(param.getClass())) >= 0) {
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if (param.subtract(NaiveNumber.ONE.promoteTo(param.getClass())).signum() == 1) {
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param = param.divide(new NaiveNumber(2).promoteTo(param.getClass()));
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powersOf2++;
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if (param.subtract(NaiveNumber.ONE.promoteTo(param.getClass())).signum() != 1) {
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break;
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//No infinite loop for you.
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}
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} else {
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param = param.multiply(new NaiveNumber(2).promoteTo(param.getClass()));
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powersOf2--;
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if (param.subtract(NaiveNumber.ONE.promoteTo(param.getClass())).signum() != 1) {
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break;
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//No infinite loop for you.
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}
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}
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}
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return getLog2(param).multiply((new NaiveNumber(powersOf2)).promoteTo(param.getClass())).add(getLogPartialSum(param));
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}
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/**
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* Returns the partial sum of the Taylor series for logx (around x=1).
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* Automatically determines the number of terms needed based on the precision of x.
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* @param x value at which the series is evaluated. 0 < x < 2. (x=2 is convergent but impractical.)
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* @return the partial sum.
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*/
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private NumberInterface getLogPartialSum(NumberInterface x) {
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NumberInterface maxError = getMaxError(x);
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x = x.subtract(NaiveNumber.ONE.promoteTo(x.getClass())); //Terms used are for log(x+1).
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NumberInterface currentNumerator = x, currentTerm = x, sum = x;
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int n = 1;
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while (FUNCTION_ABS.apply(currentTerm).compareTo(maxError) > 0) {
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n++;
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currentNumerator = currentNumerator.multiply(x).negate();
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currentTerm = currentNumerator.divide(new NaiveNumber(n).promoteTo(x.getClass()));
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sum = sum.add(currentTerm);
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}
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return sum;
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}
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/**
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* Returns natural log of 2 to the required precision of the class of number.
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* @param number a number of the same type as the return type. (Used for precision.)
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* @return the value of log(2) with the appropriate precision.
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*/
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private NumberInterface getLog2(NumberInterface number) {
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NumberInterface maxError = getMaxError(number);
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//NumberInterface errorBound = (new NaiveNumber(1)).promoteTo(number.getClass());
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//We'll use the series \sigma_{n >= 1) ((1/3^n + 1/4^n) * 1/n)
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//In the following, a=1/3^n, b=1/4^n, c = 1/n.
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//a is also an error bound.
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NumberInterface a = (new NaiveNumber(1)).promoteTo(number.getClass()), b = a, c = a;
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NumberInterface sum = NaiveNumber.ZERO.promoteTo(number.getClass());
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int n = 0;
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while (a.compareTo(maxError) >= 1) {
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n++;
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a = a.divide((new NaiveNumber(3)).promoteTo(number.getClass()));
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b = b.divide((new NaiveNumber(4)).promoteTo(number.getClass()));
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c = NaiveNumber.ONE.promoteTo(number.getClass()).divide((new NaiveNumber(n)).promoteTo(number.getClass()));
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sum = sum.add(a.add(b).multiply(c));
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}
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return sum;
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}
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};
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/**
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* The square root function.
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*/
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public static final Function FUNCTION_SQRT = new Function() {
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@Override
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protected boolean matchesParams(NumberInterface[] params) {
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return params.length == 1;
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}
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@Override
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protected NumberInterface applyInternal(NumberInterface[] params) {
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return OP_CARET.getFunction().apply(params[0], ((new NaiveNumber(0.5)).promoteTo(params[0].getClass())));
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}
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};
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public StandardPlugin(PluginManager manager) {
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super(manager);
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}
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/**
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* Returns a partial sum of a series whose terms are given by the nthTermFunction, evaluated at x.
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*
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* @param x the value at which the series is evaluated.
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* @param nthTermFunction the function that returns the nth term of the series, in the format term(x, n).
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* @param n the number of terms in the partial sum.
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* @return the value of the partial sum that has the same class as x.
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*/
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private static NumberInterface sumSeries(NumberInterface x, BiFunction<Integer, NumberInterface, NumberInterface> nthTermFunction, int n) {
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NumberInterface sum = NaiveNumber.ZERO.promoteTo(x.getClass());
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for (int i = 0; i <= n; i++) {
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sum = sum.add(nthTermFunction.apply(i, x));
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}
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return sum;
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}
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/**
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* Returns the maximum error based on the precision of the class of number.
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*
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* @param number Any instance of the NumberInterface in question (should return an appropriate precision).
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* @return the maximum error.
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*/
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private static NumberInterface getMaxError(NumberInterface number) {
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return (new NaiveNumber(10)).promoteTo(number.getClass()).intPow(-number.getMaxPrecision());
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}
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@Override
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public void onEnable() {
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registerNumber("naive", NaiveNumber.class);
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registerNumber("precise", PreciseNumber.class);
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registerOperator("+", OP_ADD);
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registerOperator("-", OP_SUBTRACT);
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registerOperator("*", OP_MULTIPLY);
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registerOperator("/", OP_DIVIDE);
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registerOperator("^", OP_CARET);
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registerOperator("!", OP_FACTORIAL);
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registerFunction("abs", FUNCTION_ABS);
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registerFunction("exp", FUNCTION_EXP);
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registerFunction("ln", FUNCTION_LN);
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registerFunction("sqrt", FUNCTION_SQRT);
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}
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@Override
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public void onDisable() {
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}
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public static NumberInterface factorial(Class<? extends NumberInterface> numberClass, int n){
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if(!factorialLists.containsKey(numberClass)){
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factorialLists.put(numberClass, new ArrayList<NumberInterface>());
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factorialLists.get(numberClass).add(NaiveNumber.ONE.promoteTo(numberClass));
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factorialLists.get(numberClass).add(NaiveNumber.ONE.promoteTo(numberClass));
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}
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ArrayList<NumberInterface> list = factorialLists.get(numberClass);
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if(n >= list.size()){
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while(list.size() < n + 16){
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list.add(list.get(list.size()-1).multiply(new NaiveNumber(list.size()).promoteTo(numberClass)));
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}
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}
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return list.get(n);
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}
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}
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