src/com/android/calculator2/BoundedRational.java - platform/packages/apps/ExactCalculator - Git at Google

 /*
  * Copyright (C) 2015 The Android Open Source Project
  *
  * Licensed under the Apache License, Version 2.0 (the "License");
  * you may not use this file except in compliance with the License.
  * You may obtain a copy of the License at
  *
  *   http://www.apache.org/licenses/LICENSE-2.0
  *
  * Unless required by applicable law or agreed to in writing, software
  * distributed under the License is distributed on an "AS IS" BASIS,
  * WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
  * See the License for the specific language governing permissions and
  * limitations under the License.
  */

 package com.android.calculator2;

 import com.hp.creals.CR;

 import java.math.BigInteger;
 import java.util.Random;

 /**
  * Rational numbers that may turn to null if they get too big.
  * For many operations, if the length of the nuumerator plus the length of the denominator exceeds
  * a maximum size, we simply return null, and rely on our caller do something else.
  * We currently never return null for a pure integer or for a BoundedRational that has just been
  * constructed.
  *
  * We also implement a number of irrational functions.  These return a non-null result only when
  * the result is known to be rational.
  */
 public class BoundedRational {
     // TODO: Consider returning null for integers.  With some care, large factorials might become
     // much faster.
     // TODO: Maybe eventually make this extend Number?

     private static final int MAX_SIZE = 10000; // total, in bits

     private final BigInteger mNum;
     private final BigInteger mDen;

     public BoundedRational(BigInteger n, BigInteger d) {
         mNum = n;
         mDen = d;
     }

     public BoundedRational(BigInteger n) {
         mNum = n;
         mDen = BigInteger.ONE;
     }

     public BoundedRational(long n, long d) {
         mNum = BigInteger.valueOf(n);
         mDen = BigInteger.valueOf(d);
     }

     public BoundedRational(long n) {
         mNum = BigInteger.valueOf(n);
         mDen = BigInteger.valueOf(1);
     }

     /**
      * Convert to String reflecting raw representation.
      * Debug or log messages only, not pretty.
      */
     public String toString() {
         return mNum.toString() + "/" + mDen.toString();
     }

     /**
      * Convert to readable String.
      * Intended for output to user.  More expensive, less useful for debugging than
      * toString().  Not internationalized.
      */
     public String toNiceString() {
         final BoundedRational nicer = reduce().positiveDen();
         String result = nicer.mNum.toString();
         if (!nicer.mDen.equals(BigInteger.ONE)) {
             result += "/" + nicer.mDen;
         }
         return result;
     }

     public static String toString(BoundedRational r) {
         if (r == null) {
             return "not a small rational";
         }
         return r.toString();
     }

     /**
      * Returns a truncated (rounded towards 0) representation of the result.
      * Includes n digits to the right of the decimal point.
      * @param n result precision, >= 0
      */
     public String toStringTruncated(int n) {
         String digits = mNum.abs().multiply(BigInteger.TEN.pow(n)).divide(mDen.abs()).toString();
         int len = digits.length();
         if (len < n + 1) {
             digits = StringUtils.repeat('0', n + 1 - len) + digits;
             len = n + 1;
         }
         return (signum() < 0 ? "-" : "") + digits.substring(0, len - n) + "."
                 + digits.substring(len - n);
     }

     /**
      * Return a double approximation.
      * The result is correctly rounded if numerator and denominator are
      * exactly representable as a double.
      * TODO: This should always be correctly rounded.
      */
     public double doubleValue() {
         return mNum.doubleValue() / mDen.doubleValue();
     }

     public CR crValue() {
         return CR.valueOf(mNum).divide(CR.valueOf(mDen));
     }

     public int intValue() {
         BoundedRational reduced = reduce();
         if (!reduced.mDen.equals(BigInteger.ONE)) {
             throw new ArithmeticException("intValue of non-int");
         }
         return reduced.mNum.intValue();
     }

     // Approximate number of bits to left of binary point.
     // Negative indicates leading zeroes to the right of binary point.
     public int wholeNumberBits() {
         if (mNum.signum() == 0) {
             return Integer.MIN_VALUE;
         } else {
             return mNum.bitLength() - mDen.bitLength();
         }
     }

     private boolean tooBig() {
         if (mDen.equals(BigInteger.ONE)) {
             return false;
         }
         return (mNum.bitLength() + mDen.bitLength() > MAX_SIZE);
     }

     /**
      * Return an equivalent fraction with a positive denominator.
      */
     private BoundedRational positiveDen() {
         if (mDen.signum() > 0) {
             return this;
         }
         return new BoundedRational(mNum.negate(), mDen.negate());
     }

     /**
      * Return an equivalent fraction in lowest terms.
      * Denominator sign may remain negative.
      */
     private BoundedRational reduce() {
         if (mDen.equals(BigInteger.ONE)) {
             return this;  // Optimization only
         }
         final BigInteger divisor = mNum.gcd(mDen);
         return new BoundedRational(mNum.divide(divisor), mDen.divide(divisor));
     }

     static Random sReduceRng = new Random();

     /**
      * Return a possibly reduced version of r that's not tooBig().
      * Return null if none exists.
      */
     private static BoundedRational maybeReduce(BoundedRational r) {
         if (r == null) return null;
         // Reduce randomly, with 1/16 probability, or if the result is too big.
         if (!r.tooBig() && (sReduceRng.nextInt() & 0xf) != 0) {
             return r;
         }
         BoundedRational result = r.positiveDen();
         result = result.reduce();
         if (!result.tooBig()) {
             return result;
         }
         return null;
     }

     public int compareTo(BoundedRational r) {
         // Compare by multiplying both sides by denominators, invert result if denominator product
         // was negative.
         return mNum.multiply(r.mDen).compareTo(r.mNum.multiply(mDen)) * mDen.signum()
                 * r.mDen.signum();
     }

     public int signum() {
         return mNum.signum() * mDen.signum();
     }

     public boolean equals(BoundedRational r) {
         return compareTo(r) == 0;
     }

     // We use static methods for arithmetic, so that we can easily handle the null case.  We try
     // to catch domain errors whenever possible, sometimes even when one of the arguments is null,
     // but not relevant.

     /**
      * Returns equivalent BigInteger result if it exists, null if not.
      */
     public static BigInteger asBigInteger(BoundedRational r) {
         if (r == null) {
             return null;
         }
         final BigInteger[] quotAndRem = r.mNum.divideAndRemainder(r.mDen);
         if (quotAndRem[1].signum() == 0) {
             return quotAndRem[0];
         } else {
             return null;
         }
     }
     public static BoundedRational add(BoundedRational r1, BoundedRational r2) {
         if (r1 == null || r2 == null) {
             return null;
         }
         final BigInteger den = r1.mDen.multiply(r2.mDen);
         final BigInteger num = r1.mNum.multiply(r2.mDen).add(r2.mNum.multiply(r1.mDen));
         return maybeReduce(new BoundedRational(num,den));
     }

     /**
      * Return the argument, but with the opposite sign.
      * Returns null only for a null argument.
      */
     public static BoundedRational negate(BoundedRational r) {
         if (r == null) {
             return null;
         }
         return new BoundedRational(r.mNum.negate(), r.mDen);
     }

     public static BoundedRational subtract(BoundedRational r1, BoundedRational r2) {
         return add(r1, negate(r2));
     }

     /**
      * Return product of r1 and r2 without reducing the result.
      */
     private static BoundedRational rawMultiply(BoundedRational r1, BoundedRational r2) {
         // It's tempting but marginally unsound to reduce 0 * null to 0.  The null could represent
         // an infinite value, for which we failed to throw an exception because it was too big.
         if (r1 == null || r2 == null) {
             return null;
         }
         // Optimize the case of our special ONE constant, since that's cheap and somewhat frequent.
         if (r1 == ONE) {
             return r2;
         }
         if (r2 == ONE) {
             return r1;
         }
         final BigInteger num = r1.mNum.multiply(r2.mNum);
         final BigInteger den = r1.mDen.multiply(r2.mDen);
         return new BoundedRational(num,den);
     }

     public static BoundedRational multiply(BoundedRational r1, BoundedRational r2) {
         return maybeReduce(rawMultiply(r1, r2));
     }

     public static class ZeroDivisionException extends ArithmeticException {
         public ZeroDivisionException() {
             super("Division by zero");
         }
     }

     /**
      * Return the reciprocal of r (or null if the argument was null).
      */
     public static BoundedRational inverse(BoundedRational r) {
         if (r == null) {
             return null;
         }
         if (r.mNum.signum() == 0) {
             throw new ZeroDivisionException();
         }
         return new BoundedRational(r.mDen, r.mNum);
     }

     public static BoundedRational divide(BoundedRational r1, BoundedRational r2) {
         return multiply(r1, inverse(r2));
     }

     public static BoundedRational sqrt(BoundedRational r) {
         // Return non-null if numerator and denominator are small perfect squares.
         if (r == null) {
             return null;
         }
         r = r.positiveDen().reduce();
         if (r.mNum.signum() < 0) {
             throw new ArithmeticException("sqrt(negative)");
         }
         final BigInteger num_sqrt = BigInteger.valueOf(Math.round(Math.sqrt(r.mNum.doubleValue())));
         if (!num_sqrt.multiply(num_sqrt).equals(r.mNum)) {
             return null;
         }
         final BigInteger den_sqrt = BigInteger.valueOf(Math.round(Math.sqrt(r.mDen.doubleValue())));
         if (!den_sqrt.multiply(den_sqrt).equals(r.mDen)) {
             return null;
         }
         return new BoundedRational(num_sqrt, den_sqrt);
     }

     public final static BoundedRational ZERO = new BoundedRational(0);
     public final static BoundedRational HALF = new BoundedRational(1,2);
     public final static BoundedRational MINUS_HALF = new BoundedRational(-1,2);
     public final static BoundedRational THIRD = new BoundedRational(1,3);
     public final static BoundedRational QUARTER = new BoundedRational(1,4);
     public final static BoundedRational SIXTH = new BoundedRational(1,6);
     public final static BoundedRational ONE = new BoundedRational(1);
     public final static BoundedRational MINUS_ONE = new BoundedRational(-1);
     public final static BoundedRational TWO = new BoundedRational(2);
     public final static BoundedRational MINUS_TWO = new BoundedRational(-2);
     public final static BoundedRational TEN = new BoundedRational(10);
     public final static BoundedRational TWELVE = new BoundedRational(12);
     public final static BoundedRational THIRTY = new BoundedRational(30);
     public final static BoundedRational MINUS_THIRTY = new BoundedRational(-30);
     public final static BoundedRational FORTY_FIVE = new BoundedRational(45);
     public final static BoundedRational MINUS_FORTY_FIVE = new BoundedRational(-45);
     public final static BoundedRational NINETY = new BoundedRational(90);
     public final static BoundedRational MINUS_NINETY = new BoundedRational(-90);

     private static final BigInteger BIG_TWO = BigInteger.valueOf(2);

     /**
      * Compute integral power of this, assuming this has been reduced and exp is >= 0.
      */
     private BoundedRational rawPow(BigInteger exp) {
         if (exp.equals(BigInteger.ONE)) {
             return this;
         }
         if (exp.and(BigInteger.ONE).intValue() == 1) {
             return rawMultiply(rawPow(exp.subtract(BigInteger.ONE)), this);
         }
         if (exp.signum() == 0) {
             return ONE;
         }
         BoundedRational tmp = rawPow(exp.shiftRight(1));
         if (Thread.interrupted()) {
             throw new CR.AbortedException();
         }
         return rawMultiply(tmp, tmp);
     }

     /**
      * Compute an integral power of this.
      */
     public BoundedRational pow(BigInteger exp) {
         if (exp.signum() < 0) {
             return inverse(pow(exp.negate()));
         }
         if (exp.equals(BigInteger.ONE)) {
             return this;
         }
         // Reducing once at the beginning means there's no point in reducing later.
         return reduce().rawPow(exp);
     }

     public static BoundedRational pow(BoundedRational base, BoundedRational exp) {
         if (exp == null) {
             return null;
         }
         if (exp.mNum.signum() == 0) {
             // Questionable if base has undefined value.  Java.lang.Math.pow() returns 1 anyway,
             // so we do the same.
             return new BoundedRational(1);
         }
         if (base == null) {
             return null;
         }
         exp = exp.reduce().positiveDen();
         if (!exp.mDen.equals(BigInteger.ONE)) {
             return null;
         }
         return base.pow(exp.mNum);
     }


     private static final BigInteger BIG_FIVE = BigInteger.valueOf(5);
     private static final BigInteger BIG_MINUS_ONE = BigInteger.valueOf(-1);

     /**
      * Return the number of decimal digits to the right of the decimal point required to represent
      * the argument exactly.
      * Return Integer.MAX_VALUE if that's not possible.  Never returns a value less than zero, even
      * if r is a power of ten.
      */
     public static int digitsRequired(BoundedRational r) {
         if (r == null) {
             return Integer.MAX_VALUE;
         }
         int powersOfTwo = 0;  // Max power of 2 that divides denominator
         int powersOfFive = 0;  // Max power of 5 that divides denominator
         // Try the easy case first to speed things up.
         if (r.mDen.equals(BigInteger.ONE)) {
             return 0;
         }
         r = r.reduce();
         BigInteger den = r.mDen;
         if (den.bitLength() > MAX_SIZE) {
             return Integer.MAX_VALUE;
         }
         while (!den.testBit(0)) {
             ++powersOfTwo;
             den = den.shiftRight(1);
         }
         while (den.mod(BIG_FIVE).signum() == 0) {
             ++powersOfFive;
             den = den.divide(BIG_FIVE);
         }
         // If the denominator has a factor of other than 2 or 5 (the divisors of 10), the decimal
         // expansion does not terminate.  Multiplying the fraction by any number of powers of 10
         // will not cancel the demoniator.  (Recall the fraction was in lowest terms to start
         // with.) Otherwise the powers of 10 we need to cancel the denominator is the larger of
         // powersOfTwo and powersOfFive.
         if (!den.equals(BigInteger.ONE) && !den.equals(BIG_MINUS_ONE)) {
             return Integer.MAX_VALUE;
         }
         return Math.max(powersOfTwo, powersOfFive);
     }
 }
	/*
	* Copyright (C) 2015 The Android Open Source Project
	*
	* Licensed under the Apache License, Version 2.0 (the "License");
	* you may not use this file except in compliance with the License.
	* You may obtain a copy of the License at
	*
	* http://www.apache.org/licenses/LICENSE-2.0
	*
	* Unless required by applicable law or agreed to in writing, software
	* distributed under the License is distributed on an "AS IS" BASIS,
	* WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
	* See the License for the specific language governing permissions and
	* limitations under the License.
	*/

	package com.android.calculator2;

	import com.hp.creals.CR;

	import java.math.BigInteger;
	import java.util.Random;

	/**
	* Rational numbers that may turn to null if they get too big.
	* For many operations, if the length of the nuumerator plus the length of the denominator exceeds
	* a maximum size, we simply return null, and rely on our caller do something else.
	* We currently never return null for a pure integer or for a BoundedRational that has just been
	* constructed.
	*
	* We also implement a number of irrational functions. These return a non-null result only when
	* the result is known to be rational.
	*/
	public class BoundedRational {
	// TODO: Consider returning null for integers. With some care, large factorials might become
	// much faster.
	// TODO: Maybe eventually make this extend Number?

	private static final int MAX_SIZE = 10000; // total, in bits

	private final BigInteger mNum;
	private final BigInteger mDen;

	public BoundedRational(BigInteger n, BigInteger d) {
	mNum = n;
	mDen = d;
	}

	public BoundedRational(BigInteger n) {
	mNum = n;
	mDen = BigInteger.ONE;
	}

	public BoundedRational(long n, long d) {
	mNum = BigInteger.valueOf(n);
	mDen = BigInteger.valueOf(d);
	}

	public BoundedRational(long n) {
	mNum = BigInteger.valueOf(n);
	mDen = BigInteger.valueOf(1);
	}

	/**
	* Convert to String reflecting raw representation.
	* Debug or log messages only, not pretty.
	*/
	public String toString() {
	return mNum.toString() + "/" + mDen.toString();
	}

	/**
	* Convert to readable String.
	* Intended for output to user. More expensive, less useful for debugging than
	* toString(). Not internationalized.
	*/
	public String toNiceString() {
	final BoundedRational nicer = reduce().positiveDen();
	String result = nicer.mNum.toString();
	if (!nicer.mDen.equals(BigInteger.ONE)) {
	result += "/" + nicer.mDen;
	}
	return result;
	}

	public static String toString(BoundedRational r) {
	if (r == null) {
	return "not a small rational";
	}
	return r.toString();
	}

	/**
	* Returns a truncated (rounded towards 0) representation of the result.
	* Includes n digits to the right of the decimal point.
	* @param n result precision, >= 0
	*/
	public String toStringTruncated(int n) {
	String digits = mNum.abs().multiply(BigInteger.TEN.pow(n)).divide(mDen.abs()).toString();
	int len = digits.length();
	if (len < n + 1) {
	digits = StringUtils.repeat('0', n + 1 - len) + digits;
	len = n + 1;
	}
	return (signum() < 0 ? "-" : "") + digits.substring(0, len - n) + "."
	+ digits.substring(len - n);
	}

	/**
	* Return a double approximation.
	* The result is correctly rounded if numerator and denominator are
	* exactly representable as a double.
	* TODO: This should always be correctly rounded.
	*/
	public double doubleValue() {
	return mNum.doubleValue() / mDen.doubleValue();
	}

	public CR crValue() {
	return CR.valueOf(mNum).divide(CR.valueOf(mDen));
	}

	public int intValue() {
	BoundedRational reduced = reduce();
	if (!reduced.mDen.equals(BigInteger.ONE)) {
	throw new ArithmeticException("intValue of non-int");
	}
	return reduced.mNum.intValue();
	}

	// Approximate number of bits to left of binary point.
	// Negative indicates leading zeroes to the right of binary point.
	public int wholeNumberBits() {
	if (mNum.signum() == 0) {
	return Integer.MIN_VALUE;
	} else {
	return mNum.bitLength() - mDen.bitLength();
	}
	}

	private boolean tooBig() {
	if (mDen.equals(BigInteger.ONE)) {
	return false;
	}
	return (mNum.bitLength() + mDen.bitLength() > MAX_SIZE);
	}

	/**
	* Return an equivalent fraction with a positive denominator.
	*/
	private BoundedRational positiveDen() {
	if (mDen.signum() > 0) {
	return this;
	}
	return new BoundedRational(mNum.negate(), mDen.negate());
	}

	/**
	* Return an equivalent fraction in lowest terms.
	* Denominator sign may remain negative.
	*/
	private BoundedRational reduce() {
	if (mDen.equals(BigInteger.ONE)) {
	return this; // Optimization only
	}
	final BigInteger divisor = mNum.gcd(mDen);
	return new BoundedRational(mNum.divide(divisor), mDen.divide(divisor));
	}

	static Random sReduceRng = new Random();

	/**
	* Return a possibly reduced version of r that's not tooBig().
	* Return null if none exists.
	*/
	private static BoundedRational maybeReduce(BoundedRational r) {
	if (r == null) return null;
	// Reduce randomly, with 1/16 probability, or if the result is too big.
	if (!r.tooBig() && (sReduceRng.nextInt() & 0xf) != 0) {
	return r;
	}
	BoundedRational result = r.positiveDen();
	result = result.reduce();
	if (!result.tooBig()) {
	return result;
	}
	return null;
	}

	public int compareTo(BoundedRational r) {
	// Compare by multiplying both sides by denominators, invert result if denominator product
	// was negative.
	return mNum.multiply(r.mDen).compareTo(r.mNum.multiply(mDen)) * mDen.signum()
	* r.mDen.signum();
	}

	public int signum() {
	return mNum.signum() * mDen.signum();
	}

	public boolean equals(BoundedRational r) {
	return compareTo(r) == 0;
	}

	// We use static methods for arithmetic, so that we can easily handle the null case. We try
	// to catch domain errors whenever possible, sometimes even when one of the arguments is null,
	// but not relevant.

	/**
	* Returns equivalent BigInteger result if it exists, null if not.
	*/
	public static BigInteger asBigInteger(BoundedRational r) {
	if (r == null) {
	return null;
	}
	final BigInteger[] quotAndRem = r.mNum.divideAndRemainder(r.mDen);
	if (quotAndRem[1].signum() == 0) {
	return quotAndRem[0];
	} else {
	return null;
	}
	}
	public static BoundedRational add(BoundedRational r1, BoundedRational r2) {
	if (r1 == null \|\| r2 == null) {
	return null;
	}
	final BigInteger den = r1.mDen.multiply(r2.mDen);
	final BigInteger num = r1.mNum.multiply(r2.mDen).add(r2.mNum.multiply(r1.mDen));
	return maybeReduce(new BoundedRational(num,den));
	}

	/**
	* Return the argument, but with the opposite sign.
	* Returns null only for a null argument.
	*/
	public static BoundedRational negate(BoundedRational r) {
	if (r == null) {
	return null;
	}
	return new BoundedRational(r.mNum.negate(), r.mDen);
	}

	public static BoundedRational subtract(BoundedRational r1, BoundedRational r2) {
	return add(r1, negate(r2));
	}

	/**
	* Return product of r1 and r2 without reducing the result.
	*/
	private static BoundedRational rawMultiply(BoundedRational r1, BoundedRational r2) {
	// It's tempting but marginally unsound to reduce 0 * null to 0. The null could represent
	// an infinite value, for which we failed to throw an exception because it was too big.
	if (r1 == null \|\| r2 == null) {
	return null;
	}
	// Optimize the case of our special ONE constant, since that's cheap and somewhat frequent.
	if (r1 == ONE) {
	return r2;
	}
	if (r2 == ONE) {
	return r1;
	}
	final BigInteger num = r1.mNum.multiply(r2.mNum);
	final BigInteger den = r1.mDen.multiply(r2.mDen);
	return new BoundedRational(num,den);
	}

	public static BoundedRational multiply(BoundedRational r1, BoundedRational r2) {
	return maybeReduce(rawMultiply(r1, r2));
	}

	public static class ZeroDivisionException extends ArithmeticException {
	public ZeroDivisionException() {
	super("Division by zero");
	}
	}

	/**
	* Return the reciprocal of r (or null if the argument was null).
	*/
	public static BoundedRational inverse(BoundedRational r) {
	if (r == null) {
	return null;
	}
	if (r.mNum.signum() == 0) {
	throw new ZeroDivisionException();
	}
	return new BoundedRational(r.mDen, r.mNum);
	}

	public static BoundedRational divide(BoundedRational r1, BoundedRational r2) {
	return multiply(r1, inverse(r2));
	}

	public static BoundedRational sqrt(BoundedRational r) {
	// Return non-null if numerator and denominator are small perfect squares.
	if (r == null) {
	return null;
	}
	r = r.positiveDen().reduce();
	if (r.mNum.signum() < 0) {
	throw new ArithmeticException("sqrt(negative)");
	}
	final BigInteger num_sqrt = BigInteger.valueOf(Math.round(Math.sqrt(r.mNum.doubleValue())));
	if (!num_sqrt.multiply(num_sqrt).equals(r.mNum)) {
	return null;
	}
	final BigInteger den_sqrt = BigInteger.valueOf(Math.round(Math.sqrt(r.mDen.doubleValue())));
	if (!den_sqrt.multiply(den_sqrt).equals(r.mDen)) {
	return null;
	}
	return new BoundedRational(num_sqrt, den_sqrt);
	}

	public final static BoundedRational ZERO = new BoundedRational(0);
	public final static BoundedRational HALF = new BoundedRational(1,2);
	public final static BoundedRational MINUS_HALF = new BoundedRational(-1,2);
	public final static BoundedRational THIRD = new BoundedRational(1,3);
	public final static BoundedRational QUARTER = new BoundedRational(1,4);
	public final static BoundedRational SIXTH = new BoundedRational(1,6);
	public final static BoundedRational ONE = new BoundedRational(1);
	public final static BoundedRational MINUS_ONE = new BoundedRational(-1);
	public final static BoundedRational TWO = new BoundedRational(2);
	public final static BoundedRational MINUS_TWO = new BoundedRational(-2);
	public final static BoundedRational TEN = new BoundedRational(10);
	public final static BoundedRational TWELVE = new BoundedRational(12);
	public final static BoundedRational THIRTY = new BoundedRational(30);
	public final static BoundedRational MINUS_THIRTY = new BoundedRational(-30);
	public final static BoundedRational FORTY_FIVE = new BoundedRational(45);
	public final static BoundedRational MINUS_FORTY_FIVE = new BoundedRational(-45);
	public final static BoundedRational NINETY = new BoundedRational(90);
	public final static BoundedRational MINUS_NINETY = new BoundedRational(-90);

	private static final BigInteger BIG_TWO = BigInteger.valueOf(2);

	/**
	* Compute integral power of this, assuming this has been reduced and exp is >= 0.
	*/
	private BoundedRational rawPow(BigInteger exp) {
	if (exp.equals(BigInteger.ONE)) {
	return this;
	}
	if (exp.and(BigInteger.ONE).intValue() == 1) {
	return rawMultiply(rawPow(exp.subtract(BigInteger.ONE)), this);
	}
	if (exp.signum() == 0) {
	return ONE;
	}
	BoundedRational tmp = rawPow(exp.shiftRight(1));
	if (Thread.interrupted()) {
	throw new CR.AbortedException();
	}
	return rawMultiply(tmp, tmp);
	}

	/**
	* Compute an integral power of this.
	*/
	public BoundedRational pow(BigInteger exp) {
	if (exp.signum() < 0) {
	return inverse(pow(exp.negate()));
	}
	if (exp.equals(BigInteger.ONE)) {
	return this;
	}
	// Reducing once at the beginning means there's no point in reducing later.
	return reduce().rawPow(exp);
	}

	public static BoundedRational pow(BoundedRational base, BoundedRational exp) {
	if (exp == null) {
	return null;
	}
	if (exp.mNum.signum() == 0) {
	// Questionable if base has undefined value. Java.lang.Math.pow() returns 1 anyway,
	// so we do the same.
	return new BoundedRational(1);
	}
	if (base == null) {
	return null;
	}
	exp = exp.reduce().positiveDen();
	if (!exp.mDen.equals(BigInteger.ONE)) {
	return null;
	}
	return base.pow(exp.mNum);
	}


	private static final BigInteger BIG_FIVE = BigInteger.valueOf(5);
	private static final BigInteger BIG_MINUS_ONE = BigInteger.valueOf(-1);

	/**
	* Return the number of decimal digits to the right of the decimal point required to represent
	* the argument exactly.
	* Return Integer.MAX_VALUE if that's not possible. Never returns a value less than zero, even
	* if r is a power of ten.
	*/
	public static int digitsRequired(BoundedRational r) {
	if (r == null) {
	return Integer.MAX_VALUE;
	}
	int powersOfTwo = 0; // Max power of 2 that divides denominator
	int powersOfFive = 0; // Max power of 5 that divides denominator
	// Try the easy case first to speed things up.
	if (r.mDen.equals(BigInteger.ONE)) {
	return 0;
	}
	r = r.reduce();
	BigInteger den = r.mDen;
	if (den.bitLength() > MAX_SIZE) {
	return Integer.MAX_VALUE;
	}
	while (!den.testBit(0)) {
	++powersOfTwo;
	den = den.shiftRight(1);
	}
	while (den.mod(BIG_FIVE).signum() == 0) {
	++powersOfFive;
	den = den.divide(BIG_FIVE);
	}
	// If the denominator has a factor of other than 2 or 5 (the divisors of 10), the decimal
	// expansion does not terminate. Multiplying the fraction by any number of powers of 10
	// will not cancel the demoniator. (Recall the fraction was in lowest terms to start
	// with.) Otherwise the powers of 10 we need to cancel the denominator is the larger of
	// powersOfTwo and powersOfFive.
	if (!den.equals(BigInteger.ONE) && !den.equals(BIG_MINUS_ONE)) {
	return Integer.MAX_VALUE;
	}
	return Math.max(powersOfTwo, powersOfFive);
	}
	}