Unlike some of the numeric methods of class * {@link java.lang.StrictMath StrictMath}, all implementations of the equivalent * functions of class {@code Math} are not defined to return the * bit-for-bit same results. This relaxation permits * better-performing implementations where strict reproducibility is * not required. * *
By default many of the {@code Math} methods simply call * the equivalent method in {@code StrictMath} for their * implementation. Code generators are encouraged to use * platform-specific native libraries or microprocessor instructions, * where available, to provide higher-performance implementations of * {@code Math} methods. Such higher-performance * implementations still must conform to the specification for * {@code Math}. * *
The quality of implementation specifications concern two * properties, accuracy of the returned result and monotonicity of the * method. Accuracy of the floating-point {@code Math} methods is * measured in terms of ulps, units in the last place. For a * given floating-point format, an {@linkplain #ulp(double) ulp} of a * specific real number value is the distance between the two * floating-point values bracketing that numerical value. When * discussing the accuracy of a method as a whole rather than at a * specific argument, the number of ulps cited is for the worst-case * error at any argument. If a method always has an error less than * 0.5 ulps, the method always returns the floating-point number * nearest the exact result; such a method is correctly * rounded. A correctly rounded method is generally the best a * floating-point approximation can be; however, it is impractical for * many floating-point methods to be correctly rounded. Instead, for * the {@code Math} class, a larger error bound of 1 or 2 ulps is * allowed for certain methods. Informally, with a 1 ulp error bound, * when the exact result is a representable number, the exact result * should be returned as the computed result; otherwise, either of the * two floating-point values which bracket the exact result may be * returned. For exact results large in magnitude, one of the * endpoints of the bracket may be infinite. Besides accuracy at * individual arguments, maintaining proper relations between the * method at different arguments is also important. Therefore, most * methods with more than 0.5 ulp errors are required to be * semi-monotonic: whenever the mathematical function is * non-decreasing, so is the floating-point approximation, likewise, * whenever the mathematical function is non-increasing, so is the * floating-point approximation. Not all approximations that have 1 * ulp accuracy will automatically meet the monotonicity requirements. * *
* The platform uses signed two's complement integer arithmetic with * int and long primitive types. The developer should choose * the primitive type to ensure that arithmetic operations consistently * produce correct results, which in some cases means the operations * will not overflow the range of values of the computation. * The best practice is to choose the primitive type and algorithm to avoid * overflow. In cases where the size is {@code int} or {@code long} and * overflow errors need to be detected, the methods whose names end with * {@code Exact} throw an {@code ArithmeticException} when the results overflow. * *
The computed result must be within 1 ulp of the exact result. * Results must be semi-monotonic. * * @param a an angle, in radians. * @return the sine of the argument. */ // BEGIN Android-changed: Reimplement in native /* @IntrinsicCandidate public static double sin(double a) { return StrictMath.sin(a); // default impl. delegates to StrictMath } */ // END Android-changed: Reimplement in native @CriticalNative public static native double sin(double a); /** * Returns the trigonometric cosine of an angle. Special cases: *
The computed result must be within 1 ulp of the exact result. * Results must be semi-monotonic. * * @param a an angle, in radians. * @return the cosine of the argument. */ // BEGIN Android-changed: Reimplement in native /* @IntrinsicCandidate public static double cos(double a) { return StrictMath.cos(a); // default impl. delegates to StrictMath } */ // END Android-changed: Reimplement in native @CriticalNative public static native double cos(double a); /** * Returns the trigonometric tangent of an angle. Special cases: *
The computed result must be within 1 ulp of the exact result. * Results must be semi-monotonic. * * @param a an angle, in radians. * @return the tangent of the argument. */ // BEGIN Android-changed: Reimplement in native /* @IntrinsicCandidate public static double tan(double a) { return StrictMath.tan(a); // default impl. delegates to StrictMath } */ // END Android-changed: Reimplement in native @CriticalNative public static native double tan(double a); /** * Returns the arc sine of a value; the returned angle is in the * range -pi/2 through pi/2. Special cases: *
The computed result must be within 1 ulp of the exact result. * Results must be semi-monotonic. * * @param a the value whose arc sine is to be returned. * @return the arc sine of the argument. */ // BEGIN Android-changed: Reimplement in native /* public static double asin(double a) { return StrictMath.asin(a); // default impl. delegates to StrictMath } */ // END Android-changed: Reimplement in native @CriticalNative public static native double asin(double a); /** * Returns the arc cosine of a value; the returned angle is in the * range 0.0 through pi. Special case: *
The computed result must be within 1 ulp of the exact result. * Results must be semi-monotonic. * * @param a the value whose arc cosine is to be returned. * @return the arc cosine of the argument. */ // BEGIN Android-changed: Reimplement in native /* public static double acos(double a) { return StrictMath.acos(a); // default impl. delegates to StrictMath } */ // END Android-changed: Reimplement in native @CriticalNative public static native double acos(double a); /** * Returns the arc tangent of a value; the returned angle is in the * range -pi/2 through pi/2. Special cases: *
The computed result must be within 1 ulp of the exact result. * Results must be semi-monotonic. * * @param a the value whose arc tangent is to be returned. * @return the arc tangent of the argument. */ // BEGIN Android-changed: Reimplement in native /* public static double atan(double a) { return StrictMath.atan(a); // default impl. delegates to StrictMath } */ // END Android-changed: Reimplement in native @CriticalNative public static native double atan(double a); /** * Converts an angle measured in degrees to an approximately * equivalent angle measured in radians. The conversion from * degrees to radians is generally inexact. * * @param angdeg an angle, in degrees * @return the measurement of the angle {@code angdeg} * in radians. * @since 1.2 */ public static double toRadians(double angdeg) { return angdeg * DEGREES_TO_RADIANS; } /** * Converts an angle measured in radians to an approximately * equivalent angle measured in degrees. The conversion from * radians to degrees is generally inexact; users should * not expect {@code cos(toRadians(90.0))} to exactly * equal {@code 0.0}. * * @param angrad an angle, in radians * @return the measurement of the angle {@code angrad} * in degrees. * @since 1.2 */ public static double toDegrees(double angrad) { return angrad * RADIANS_TO_DEGREES; } /** * Returns Euler's number e raised to the power of a * {@code double} value. Special cases: *
The computed result must be within 1 ulp of the exact result. * Results must be semi-monotonic. * * @param a the exponent to raise e to. * @return the value e{@code a}, * where e is the base of the natural logarithms. */ // BEGIN Android-changed: Reimplement in native /* @IntrinsicCandidate public static double exp(double a) { return StrictMath.exp(a); // default impl. delegates to StrictMath } */ // END Android-changed: Reimplement in native @CriticalNative public static native double exp(double a); /** * Returns the natural logarithm (base e) of a {@code double} * value. Special cases: *
The computed result must be within 1 ulp of the exact result. * Results must be semi-monotonic. * * @param a a value * @return the value ln {@code a}, the natural logarithm of * {@code a}. */ // BEGIN Android-changed: Reimplement in native /* @IntrinsicCandidate public static double log(double a) { return StrictMath.log(a); // default impl. delegates to StrictMath } */ // END Android-changed: Reimplement in native @CriticalNative public static native double log(double a); /** * Returns the base 10 logarithm of a {@code double} value. * Special cases: * *
The computed result must be within 1 ulp of the exact result. * Results must be semi-monotonic. * * @param a a value * @return the base 10 logarithm of {@code a}. * @since 1.5 */ // BEGIN Android-changed: Reimplement in native /* @IntrinsicCandidate public static double log10(double a) { return StrictMath.log10(a); // default impl. delegates to StrictMath } */ // END Android-changed: Reimplement in native @CriticalNative public static native double log10(double a); /** * Returns the correctly rounded positive square root of a * {@code double} value. * Special cases: *
The computed result must be within 1 ulp of the exact result.
*
* @param a a value.
* @return the cube root of {@code a}.
* @since 1.5
*/
// BEGIN Android-changed: Reimplement in native
/*
public static double cbrt(double a) {
return StrictMath.cbrt(a);
}
*/
// END Android-changed: Reimplement in native
@CriticalNative
public static native double cbrt(double a);
/**
* Computes the remainder operation on two arguments as prescribed
* by the IEEE 754 standard.
* The remainder value is mathematically equal to
* f1 - f2 × n,
* where n is the mathematical integer closest to the exact
* mathematical value of the quotient {@code f1/f2}, and if two
* mathematical integers are equally close to {@code f1/f2},
* then n is the integer that is even. If the remainder is
* zero, its sign is the same as the sign of the first argument.
* Special cases:
*
The computed result must be within 2 ulps of the exact result. * Results must be semi-monotonic. * * @apiNote * For y with a positive sign and finite nonzero * x, the exact mathematical value of {@code atan2} is * equal to: *
(In the foregoing descriptions, a floating-point value is * considered to be an integer if and only if it is finite and a * fixed point of the method {@link #ceil ceil} or, * equivalently, a fixed point of the method {@link #floor * floor}. A value is a fixed point of a one-argument * method if and only if the result of applying the method to the * value is equal to the value.) * *
The computed result must be within 1 ulp of the exact result. * Results must be semi-monotonic. * * @apiNote * The special cases definitions of this method differ from the * special case definitions of the IEEE 754 recommended {@code * pow} operation for ±{@code 1.0} raised to an infinite * power. This method treats such cases as indeterminate and * specifies a NaN is returned. The IEEE 754 specification treats * the infinite power as a large integer (large-magnitude * floating-point numbers are numerically integers, specifically * even integers) and therefore specifies {@code 1.0} be returned. * * @param a the base. * @param b the exponent. * @return the value {@code a}{@code b}. */ // BEGIN Android-changed: Reimplement in native /* @IntrinsicCandidate public static double pow(double a, double b) { return StrictMath.pow(a, b); // default impl. delegates to StrictMath } */ // END Android-changed: Reimplement in native @CriticalNative public static native double pow(double a, double b); /** * Returns the closest {@code int} to the argument, with ties * rounding to positive infinity. * *
* Special cases: *
Special cases: *
When this method is first called, it creates a single new * pseudorandom-number generator, exactly as if by the expression * *
{@code new java.util.Random()}* * This new pseudorandom-number generator is used thereafter for * all calls to this method and is used nowhere else. * *
This method is properly synchronized to allow correct use by * more than one thread. However, if many threads need to generate * pseudorandom numbers at a great rate, it may reduce contention * for each thread to have its own pseudorandom-number generator. * * @apiNote * As the largest {@code double} value less than {@code 1.0} * is {@code Math.nextDown(1.0)}, a value {@code x} in the closed range * {@code [x1,x2]} where {@code x1<=x2} may be defined by the statements * *
{@code
* double f = Math.random()/Math.nextDown(1.0);
* double x = x1*(1.0 - f) + x2*f;
* }* If {@code y} is zero, an {@code ArithmeticException} is thrown * (JLS {@jls 15.17.2}). *
* The built-in remainder operator "{@code %}" is a suitable counterpart * both for this method and for the built-in division operator "{@code /}". * * @param x the dividend * @param y the divisor * @return the quotient {@code x / y} * @throws ArithmeticException if {@code y} is zero or the quotient * overflows an int * @jls 15.17.2 Division Operator / * @since 18 */ public static int divideExact(int x, int y) { int q = x / y; if ((x & y & q) >= 0) { return q; } throw new ArithmeticException("integer overflow"); } /** * Returns the quotient of the arguments, throwing an exception if the * result overflows a {@code long}. Such overflow occurs in this method if * {@code x} is {@link Long#MIN_VALUE} and {@code y} is {@code -1}. * In contrast, if {@code Long.MIN_VALUE / -1} were evaluated directly, * the result would be {@code Long.MIN_VALUE} and no exception would be * thrown. *
* If {@code y} is zero, an {@code ArithmeticException} is thrown * (JLS {@jls 15.17.2}). *
* The built-in remainder operator "{@code %}" is a suitable counterpart * both for this method and for the built-in division operator "{@code /}". * * @param x the dividend * @param y the divisor * @return the quotient {@code x / y} * @throws ArithmeticException if {@code y} is zero or the quotient * overflows a long * @jls 15.17.2 Division Operator / * @since 18 */ public static long divideExact(long x, long y) { long q = x / y; if ((x & y & q) >= 0) { return q; } throw new ArithmeticException("long overflow"); } /** * Returns the largest (closest to positive infinity) * {@code int} value that is less than or equal to the algebraic quotient. * This method is identical to {@link #floorDiv(int,int)} except that it * throws an {@code ArithmeticException} when the dividend is * {@linkplain Integer#MIN_VALUE Integer.MIN_VALUE} and the divisor is * {@code -1} instead of ignoring the integer overflow and returning * {@code Integer.MIN_VALUE}. *
* The floor modulus method {@link #floorMod(int,int)} is a suitable * counterpart both for this method and for the {@link #floorDiv(int,int)} * method. *
* For examples, see {@link #floorDiv(int, int)}. * * @param x the dividend * @param y the divisor * @return the largest (closest to positive infinity) * {@code int} value that is less than or equal to the algebraic quotient. * @throws ArithmeticException if the divisor {@code y} is zero, or the * dividend {@code x} is {@code Integer.MIN_VALUE} and the divisor {@code y} * is {@code -1}. * @see #floorDiv(int, int) * @since 18 */ public static int floorDivExact(int x, int y) { final int q = x / y; if ((x & y & q) >= 0) { // if the signs are different and modulo not zero, round down if ((x ^ y) < 0 && (q * y != x)) { return q - 1; } return q; } throw new ArithmeticException("integer overflow"); } /** * Returns the largest (closest to positive infinity) * {@code long} value that is less than or equal to the algebraic quotient. * This method is identical to {@link #floorDiv(long,long)} except that it * throws an {@code ArithmeticException} when the dividend is * {@linkplain Long#MIN_VALUE Long.MIN_VALUE} and the divisor is * {@code -1} instead of ignoring the integer overflow and returning * {@code Long.MIN_VALUE}. *
* The floor modulus method {@link #floorMod(long,long)} is a suitable * counterpart both for this method and for the {@link #floorDiv(long,long)} * method. *
* For examples, see {@link #floorDiv(int, int)}. * * @param x the dividend * @param y the divisor * @return the largest (closest to positive infinity) * {@code long} value that is less than or equal to the algebraic quotient. * @throws ArithmeticException if the divisor {@code y} is zero, or the * dividend {@code x} is {@code Long.MIN_VALUE} and the divisor {@code y} * is {@code -1}. * @see #floorDiv(long,long) * @since 18 */ public static long floorDivExact(long x, long y) { final long q = x / y; if ((x & y & q) >= 0) { // if the signs are different and modulo not zero, round down if ((x ^ y) < 0 && (q * y != x)) { return q - 1; } return q; } throw new ArithmeticException("long overflow"); } /** * Returns the smallest (closest to negative infinity) * {@code int} value that is greater than or equal to the algebraic quotient. * This method is identical to {@link #ceilDiv(int,int)} except that it * throws an {@code ArithmeticException} when the dividend is * {@linkplain Integer#MIN_VALUE Integer.MIN_VALUE} and the divisor is * {@code -1} instead of ignoring the integer overflow and returning * {@code Integer.MIN_VALUE}. *
* The ceil modulus method {@link #ceilMod(int,int)} is a suitable * counterpart both for this method and for the {@link #ceilDiv(int,int)} * method. *
* For examples, see {@link #ceilDiv(int, int)}. * * @param x the dividend * @param y the divisor * @return the smallest (closest to negative infinity) * {@code int} value that is greater than or equal to the algebraic quotient. * @throws ArithmeticException if the divisor {@code y} is zero, or the * dividend {@code x} is {@code Integer.MIN_VALUE} and the divisor {@code y} * is {@code -1}. * @see #ceilDiv(int, int) * @since 18 */ public static int ceilDivExact(int x, int y) { final int q = x / y; if ((x & y & q) >= 0) { // if the signs are the same and modulo not zero, round up if ((x ^ y) >= 0 && (q * y != x)) { return q + 1; } return q; } throw new ArithmeticException("integer overflow"); } /** * Returns the smallest (closest to negative infinity) * {@code long} value that is greater than or equal to the algebraic quotient. * This method is identical to {@link #ceilDiv(long,long)} except that it * throws an {@code ArithmeticException} when the dividend is * {@linkplain Long#MIN_VALUE Long.MIN_VALUE} and the divisor is * {@code -1} instead of ignoring the integer overflow and returning * {@code Long.MIN_VALUE}. *
* The ceil modulus method {@link #ceilMod(long,long)} is a suitable * counterpart both for this method and for the {@link #ceilDiv(long,long)} * method. *
* For examples, see {@link #ceilDiv(int, int)}. * * @param x the dividend * @param y the divisor * @return the smallest (closest to negative infinity) * {@code long} value that is greater than or equal to the algebraic quotient. * @throws ArithmeticException if the divisor {@code y} is zero, or the * dividend {@code x} is {@code Long.MIN_VALUE} and the divisor {@code y} * is {@code -1}. * @see #ceilDiv(long,long) * @since 18 */ public static long ceilDivExact(long x, long y) { final long q = x / y; if ((x & y & q) >= 0) { // if the signs are the same and modulo not zero, round up if ((x ^ y) >= 0 && (q * y != x)) { return q + 1; } return q; } throw new ArithmeticException("long overflow"); } /** * Returns the argument incremented by one, throwing an exception if the * result overflows an {@code int}. * The overflow only occurs for {@linkplain Integer#MAX_VALUE the maximum value}. * * @param a the value to increment * @return the result * @throws ArithmeticException if the result overflows an int * @since 1.8 */ @IntrinsicCandidate public static int incrementExact(int a) { if (a == Integer.MAX_VALUE) { throw new ArithmeticException("integer overflow"); } return a + 1; } /** * Returns the argument incremented by one, throwing an exception if the * result overflows a {@code long}. * The overflow only occurs for {@linkplain Long#MAX_VALUE the maximum value}. * * @param a the value to increment * @return the result * @throws ArithmeticException if the result overflows a long * @since 1.8 */ @IntrinsicCandidate public static long incrementExact(long a) { if (a == Long.MAX_VALUE) { throw new ArithmeticException("long overflow"); } return a + 1L; } /** * Returns the argument decremented by one, throwing an exception if the * result overflows an {@code int}. * The overflow only occurs for {@linkplain Integer#MIN_VALUE the minimum value}. * * @param a the value to decrement * @return the result * @throws ArithmeticException if the result overflows an int * @since 1.8 */ @IntrinsicCandidate public static int decrementExact(int a) { if (a == Integer.MIN_VALUE) { throw new ArithmeticException("integer overflow"); } return a - 1; } /** * Returns the argument decremented by one, throwing an exception if the * result overflows a {@code long}. * The overflow only occurs for {@linkplain Long#MIN_VALUE the minimum value}. * * @param a the value to decrement * @return the result * @throws ArithmeticException if the result overflows a long * @since 1.8 */ @IntrinsicCandidate public static long decrementExact(long a) { if (a == Long.MIN_VALUE) { throw new ArithmeticException("long overflow"); } return a - 1L; } /** * Returns the negation of the argument, throwing an exception if the * result overflows an {@code int}. * The overflow only occurs for {@linkplain Integer#MIN_VALUE the minimum value}. * * @param a the value to negate * @return the result * @throws ArithmeticException if the result overflows an int * @since 1.8 */ @IntrinsicCandidate public static int negateExact(int a) { if (a == Integer.MIN_VALUE) { throw new ArithmeticException("integer overflow"); } return -a; } /** * Returns the negation of the argument, throwing an exception if the * result overflows a {@code long}. * The overflow only occurs for {@linkplain Long#MIN_VALUE the minimum value}. * * @param a the value to negate * @return the result * @throws ArithmeticException if the result overflows a long * @since 1.8 */ @IntrinsicCandidate public static long negateExact(long a) { if (a == Long.MIN_VALUE) { throw new ArithmeticException("long overflow"); } return -a; } /** * Returns the value of the {@code long} argument, * throwing an exception if the value overflows an {@code int}. * * @param value the long value * @return the argument as an int * @throws ArithmeticException if the {@code argument} overflows an int * @since 1.8 */ public static int toIntExact(long value) { if ((int)value != value) { throw new ArithmeticException("integer overflow"); } return (int)value; } /** * Returns the exact mathematical product of the arguments. * * @param x the first value * @param y the second value * @return the result * @since 9 */ public static long multiplyFull(int x, int y) { return (long)x * (long)y; } /** * Returns as a {@code long} the most significant 64 bits of the 128-bit * product of two 64-bit factors. * * @param x the first value * @param y the second value * @return the result * @see #unsignedMultiplyHigh * @since 9 */ @IntrinsicCandidate public static long multiplyHigh(long x, long y) { // Use technique from section 8-2 of Henry S. Warren, Jr., // Hacker's Delight (2nd ed.) (Addison Wesley, 2013), 173-174. long x1 = x >> 32; long x2 = x & 0xFFFFFFFFL; long y1 = y >> 32; long y2 = y & 0xFFFFFFFFL; long z2 = x2 * y2; long t = x1 * y2 + (z2 >>> 32); long z1 = t & 0xFFFFFFFFL; long z0 = t >> 32; z1 += x2 * y1; return x1 * y1 + z0 + (z1 >> 32); } /** * Returns as a {@code long} the most significant 64 bits of the unsigned * 128-bit product of two unsigned 64-bit factors. * * @param x the first value * @param y the second value * @return the result * @see #multiplyHigh * @since 18 */ @IntrinsicCandidate public static long unsignedMultiplyHigh(long x, long y) { // Compute via multiplyHigh() to leverage the intrinsic long result = Math.multiplyHigh(x, y); result += (y & (x >> 63)); // equivalent to `if (x < 0) result += y;` result += (x & (y >> 63)); // equivalent to `if (y < 0) result += x;` return result; } /** * Returns the largest (closest to positive infinity) * {@code int} value that is less than or equal to the algebraic quotient. * There is one special case: if the dividend is * {@linkplain Integer#MIN_VALUE Integer.MIN_VALUE} and the divisor is {@code -1}, * then integer overflow occurs and * the result is equal to {@code Integer.MIN_VALUE}. *
* Normal integer division operates under the round to zero rounding mode * (truncation). This operation instead acts under the round toward * negative infinity (floor) rounding mode. * The floor rounding mode gives different results from truncation * when the exact quotient is not an integer and is negative. *
* Normal integer division operates under the round to zero rounding mode * (truncation). This operation instead acts under the round toward * negative infinity (floor) rounding mode. * The floor rounding mode gives different results from truncation * when the exact result is not an integer and is negative. *
* For examples, see {@link #floorDiv(int, int)}. * * @param x the dividend * @param y the divisor * @return the largest (closest to positive infinity) * {@code long} value that is less than or equal to the algebraic quotient. * @throws ArithmeticException if the divisor {@code y} is zero * @see #floorMod(long, int) * @see #floor(double) * @since 9 */ public static long floorDiv(long x, int y) { return floorDiv(x, (long)y); } /** * Returns the largest (closest to positive infinity) * {@code long} value that is less than or equal to the algebraic quotient. * There is one special case: if the dividend is * {@linkplain Long#MIN_VALUE Long.MIN_VALUE} and the divisor is {@code -1}, * then integer overflow occurs and * the result is equal to {@code Long.MIN_VALUE}. *
* Normal integer division operates under the round to zero rounding mode * (truncation). This operation instead acts under the round toward * negative infinity (floor) rounding mode. * The floor rounding mode gives different results from truncation * when the exact result is not an integer and is negative. *
* For examples, see {@link #floorDiv(int, int)}. * * @param x the dividend * @param y the divisor * @return the largest (closest to positive infinity) * {@code long} value that is less than or equal to the algebraic quotient. * @throws ArithmeticException if the divisor {@code y} is zero * @see #floorMod(long, long) * @see #floor(double) * @since 1.8 */ public static long floorDiv(long x, long y) { final long q = x / y; // if the signs are different and modulo not zero, round down if ((x ^ y) < 0 && (q * y != x)) { return q - 1; } return q; } /** * Returns the floor modulus of the {@code int} arguments. *
* The floor modulus is {@code r = x - (floorDiv(x, y) * y)}, * has the same sign as the divisor {@code y} or is zero, and * is in the range of {@code -abs(y) < r < +abs(y)}. * *
* The relationship between {@code floorDiv} and {@code floorMod} is such that: *
* The difference in values between {@code floorMod} and the {@code %} operator * is due to the difference between {@code floorDiv} and the {@code /} * operator, as detailed in {@linkplain #floorDiv(int, int)}. *
* Examples: *
* The floor modulus is {@code r = x - (floorDiv(x, y) * y)}, * has the same sign as the divisor {@code y} or is zero, and * is in the range of {@code -abs(y) < r < +abs(y)}. * *
* The relationship between {@code floorDiv} and {@code floorMod} is such that: *
* For examples, see {@link #floorMod(int, int)}. * * @param x the dividend * @param y the divisor * @return the floor modulus {@code x - (floorDiv(x, y) * y)} * @throws ArithmeticException if the divisor {@code y} is zero * @see #floorDiv(long, int) * @since 9 */ public static int floorMod(long x, int y) { // Result cannot overflow the range of int. return (int)floorMod(x, (long)y); } /** * Returns the floor modulus of the {@code long} arguments. *
* The floor modulus is {@code r = x - (floorDiv(x, y) * y)}, * has the same sign as the divisor {@code y} or is zero, and * is in the range of {@code -abs(y) < r < +abs(y)}. * *
* The relationship between {@code floorDiv} and {@code floorMod} is such that: *
* For examples, see {@link #floorMod(int, int)}. * * @param x the dividend * @param y the divisor * @return the floor modulus {@code x - (floorDiv(x, y) * y)} * @throws ArithmeticException if the divisor {@code y} is zero * @see #floorDiv(long, long) * @since 1.8 */ public static long floorMod(long x, long y) { final long r = x % y; // if the signs are different and modulo not zero, adjust result if ((x ^ y) < 0 && r != 0) { return r + y; } return r; } /** * Returns the smallest (closest to negative infinity) * {@code int} value that is greater than or equal to the algebraic quotient. * There is one special case: if the dividend is * {@linkplain Integer#MIN_VALUE Integer.MIN_VALUE} and the divisor is {@code -1}, * then integer overflow occurs and * the result is equal to {@code Integer.MIN_VALUE}. *
* Normal integer division operates under the round to zero rounding mode * (truncation). This operation instead acts under the round toward * positive infinity (ceiling) rounding mode. * The ceiling rounding mode gives different results from truncation * when the exact quotient is not an integer and is positive. *
* Normal integer division operates under the round to zero rounding mode * (truncation). This operation instead acts under the round toward * positive infinity (ceiling) rounding mode. * The ceiling rounding mode gives different results from truncation * when the exact result is not an integer and is positive. *
* For examples, see {@link #ceilDiv(int, int)}. * * @param x the dividend * @param y the divisor * @return the smallest (closest to negative infinity) * {@code long} value that is greater than or equal to the algebraic quotient. * @throws ArithmeticException if the divisor {@code y} is zero * @see #ceilMod(int, int) * @see #ceil(double) * @since 18 */ public static long ceilDiv(long x, int y) { return ceilDiv(x, (long)y); } /** * Returns the smallest (closest to negative infinity) * {@code long} value that is greater than or equal to the algebraic quotient. * There is one special case: if the dividend is * {@linkplain Long#MIN_VALUE Long.MIN_VALUE} and the divisor is {@code -1}, * then integer overflow occurs and * the result is equal to {@code Long.MIN_VALUE}. *
* Normal integer division operates under the round to zero rounding mode * (truncation). This operation instead acts under the round toward * positive infinity (ceiling) rounding mode. * The ceiling rounding mode gives different results from truncation * when the exact result is not an integer and is positive. *
* For examples, see {@link #ceilDiv(int, int)}. * * @param x the dividend * @param y the divisor * @return the smallest (closest to negative infinity) * {@code long} value that is greater than or equal to the algebraic quotient. * @throws ArithmeticException if the divisor {@code y} is zero * @see #ceilMod(int, int) * @see #ceil(double) * @since 18 */ public static long ceilDiv(long x, long y) { final long q = x / y; // if the signs are the same and modulo not zero, round up if ((x ^ y) >= 0 && (q * y != x)) { return q + 1; } return q; } /** * Returns the ceiling modulus of the {@code int} arguments. *
* The ceiling modulus is {@code r = x - (ceilDiv(x, y) * y)}, * has the opposite sign as the divisor {@code y} or is zero, and * is in the range of {@code -abs(y) < r < +abs(y)}. * *
* The relationship between {@code ceilDiv} and {@code ceilMod} is such that: *
* The difference in values between {@code ceilMod} and the {@code %} operator * is due to the difference between {@code ceilDiv} and the {@code /} * operator, as detailed in {@linkplain #ceilDiv(int, int)}. *
* Examples: *
* The ceiling modulus is {@code r = x - (ceilDiv(x, y) * y)}, * has the opposite sign as the divisor {@code y} or is zero, and * is in the range of {@code -abs(y) < r < +abs(y)}. * *
* The relationship between {@code ceilDiv} and {@code ceilMod} is such that: *
* For examples, see {@link #ceilMod(int, int)}. * * @param x the dividend * @param y the divisor * @return the ceiling modulus {@code x - (ceilDiv(x, y) * y)} * @throws ArithmeticException if the divisor {@code y} is zero * @see #ceilDiv(long, int) * @since 18 */ public static int ceilMod(long x, int y) { // Result cannot overflow the range of int. return (int)ceilMod(x, (long)y); } /** * Returns the ceiling modulus of the {@code long} arguments. *
* The ceiling modulus is {@code r = x - (ceilDiv(x, y) * y)}, * has the opposite sign as the divisor {@code y} or is zero, and * is in the range of {@code -abs(y) < r < +abs(y)}. * *
* The relationship between {@code ceilDiv} and {@code ceilMod} is such that: *
* For examples, see {@link #ceilMod(int, int)}. * * @param x the dividend * @param y the divisor * @return the ceiling modulus {@code x - (ceilDiv(x, y) * y)} * @throws ArithmeticException if the divisor {@code y} is zero * @see #ceilDiv(long, long) * @since 18 */ public static long ceilMod(long x, long y) { final long r = x % y; // if the signs are the same and modulo not zero, adjust result if ((x ^ y) >= 0 && r != 0) { return r - y; } return r; } /** * Returns the absolute value of an {@code int} value. * If the argument is not negative, the argument is returned. * If the argument is negative, the negation of the argument is returned. * *
Note that if the argument is equal to the value of {@link * Integer#MIN_VALUE}, the most negative representable {@code int} * value, the result is that same value, which is negative. In * contrast, the {@link Math#absExact(int)} method throws an * {@code ArithmeticException} for this value. * * @param a the argument whose absolute value is to be determined * @return the absolute value of the argument. * @see Math#absExact(int) */ @IntrinsicCandidate public static int abs(int a) { return (a < 0) ? -a : a; } /** * Returns the mathematical absolute value of an {@code int} value * if it is exactly representable as an {@code int}, throwing * {@code ArithmeticException} if the result overflows the * positive {@code int} range. * *
Since the range of two's complement integers is asymmetric * with one additional negative value (JLS {@jls 4.2.1}), the * mathematical absolute value of {@link Integer#MIN_VALUE} * overflows the positive {@code int} range, so an exception is * thrown for that argument. * * @param a the argument whose absolute value is to be determined * @return the absolute value of the argument, unless overflow occurs * @throws ArithmeticException if the argument is {@link Integer#MIN_VALUE} * @see Math#abs(int) * @since 15 */ public static int absExact(int a) { if (a == Integer.MIN_VALUE) throw new ArithmeticException( "Overflow to represent absolute value of Integer.MIN_VALUE"); else return abs(a); } /** * Returns the absolute value of a {@code long} value. * If the argument is not negative, the argument is returned. * If the argument is negative, the negation of the argument is returned. * *
Note that if the argument is equal to the value of {@link * Long#MIN_VALUE}, the most negative representable {@code long} * value, the result is that same value, which is negative. In * contrast, the {@link Math#absExact(long)} method throws an * {@code ArithmeticException} for this value. * * @param a the argument whose absolute value is to be determined * @return the absolute value of the argument. * @see Math#absExact(long) */ @IntrinsicCandidate public static long abs(long a) { return (a < 0) ? -a : a; } /** * Returns the mathematical absolute value of an {@code long} value * if it is exactly representable as an {@code long}, throwing * {@code ArithmeticException} if the result overflows the * positive {@code long} range. * *
Since the range of two's complement integers is asymmetric * with one additional negative value (JLS {@jls 4.2.1}), the * mathematical absolute value of {@link Long#MIN_VALUE} overflows * the positive {@code long} range, so an exception is thrown for * that argument. * * @param a the argument whose absolute value is to be determined * @return the absolute value of the argument, unless overflow occurs * @throws ArithmeticException if the argument is {@link Long#MIN_VALUE} * @see Math#abs(long) * @since 15 */ public static long absExact(long a) { if (a == Long.MIN_VALUE) throw new ArithmeticException( "Overflow to represent absolute value of Long.MIN_VALUE"); else return abs(a); } /** * Returns the absolute value of a {@code float} value. * If the argument is not negative, the argument is returned. * If the argument is negative, the negation of the argument is returned. * Special cases: *
* While the original value of type long may not fit into the int type, * the bounds have the int type, so the result always fits the int type. * This allows to use method to safely cast long value to int with * saturation. * * @param value value to clamp * @param min minimal allowed value * @param max maximal allowed value * @return a clamped value that fits into {@code min..max} interval * @throws IllegalArgumentException if {@code min > max} * * @since 21 */ public static int clamp(long value, int min, int max) { if (min > max) { throw new IllegalArgumentException(min + " > " + max); } return (int) Math.min(max, Math.max(value, min)); } /** * Clamps the value to fit between min and max. If the value is less * than {@code min}, then {@code min} is returned. If the value is greater * than {@code max}, then {@code max} is returned. Otherwise, the original * value is returned. * * @param value value to clamp * @param min minimal allowed value * @param max maximal allowed value * @return a clamped value that fits into {@code min..max} interval * @throws IllegalArgumentException if {@code min > max} * * @since 21 */ public static long clamp(long value, long min, long max) { if (min > max) { throw new IllegalArgumentException(min + " > " + max); } return Math.min(max, Math.max(value, min)); } /** * Clamps the value to fit between min and max. If the value is less * than {@code min}, then {@code min} is returned. If the value is greater * than {@code max}, then {@code max} is returned. Otherwise, the original * value is returned. If value is NaN, the result is also NaN. *
* Unlike the numerical comparison operators, this method considers * negative zero to be strictly smaller than positive zero. * E.g., {@code clamp(-0.0, 0.0, 1.0)} returns 0.0. * * @param value value to clamp * @param min minimal allowed value * @param max maximal allowed value * @return a clamped value that fits into {@code min..max} interval * @throws IllegalArgumentException if either of {@code min} and {@code max} * arguments is NaN, or {@code min > max}, or {@code min} is +0.0, and * {@code max} is -0.0. * * @since 21 */ public static double clamp(double value, double min, double max) { // This unusual condition allows keeping only one branch // on common path when min < max and neither of them is NaN. // If min == max, we should additionally check for +0.0/-0.0 case, // so we're still visiting the if statement. if (!(min < max)) { // min greater than, equal to, or unordered with respect to max; NaN values are unordered if (Double.isNaN(min)) { throw new IllegalArgumentException("min is NaN"); } if (Double.isNaN(max)) { throw new IllegalArgumentException("max is NaN"); } if (Double.compare(min, max) > 0) { throw new IllegalArgumentException(min + " > " + max); } // Fall-through if min and max are exactly equal (or min = -0.0 and max = +0.0) // and none of them is NaN } return Math.min(max, Math.max(value, min)); } /** * Clamps the value to fit between min and max. If the value is less * than {@code min}, then {@code min} is returned. If the value is greater * than {@code max}, then {@code max} is returned. Otherwise, the original * value is returned. If value is NaN, the result is also NaN. *
* Unlike the numerical comparison operators, this method considers * negative zero to be strictly smaller than positive zero. * E.g., {@code clamp(-0.0f, 0.0f, 1.0f)} returns 0.0f. * * @param value value to clamp * @param min minimal allowed value * @param max maximal allowed value * @return a clamped value that fits into {@code min..max} interval * @throws IllegalArgumentException if either of {@code min} and {@code max} * arguments is NaN, or {@code min > max}, or {@code min} is +0.0f, and * {@code max} is -0.0f. * * @since 21 */ public static float clamp(float value, float min, float max) { // This unusual condition allows keeping only one branch // on common path when min < max and neither of them is NaN. // If min == max, we should additionally check for +0.0/-0.0 case, // so we're still visiting the if statement. if (!(min < max)) { // min greater than, equal to, or unordered with respect to max; NaN values are unordered if (Float.isNaN(min)) { throw new IllegalArgumentException("min is NaN"); } if (Float.isNaN(max)) { throw new IllegalArgumentException("max is NaN"); } if (Float.compare(min, max) > 0) { throw new IllegalArgumentException(min + " > " + max); } // Fall-through if min and max are exactly equal (or min = -0.0 and max = +0.0) // and none of them is NaN } return Math.min(max, Math.max(value, min)); } /** * Returns the fused multiply add of the three arguments; that is, * returns the exact product of the first two arguments summed * with the third argument and then rounded once to the nearest * {@code double}. * * The rounding is done using the {@linkplain * java.math.RoundingMode#HALF_EVEN round to nearest even * rounding mode}. * * In contrast, if {@code a * b + c} is evaluated as a regular * floating-point expression, two rounding errors are involved, * the first for the multiply operation, the second for the * addition operation. * *
Special cases: *
Note that {@code fma(a, 1.0, c)} returns the same * result as ({@code a + c}). However, * {@code fma(a, b, +0.0)} does not always return the * same result as ({@code a * b}) since * {@code fma(-0.0, +0.0, +0.0)} is {@code +0.0} while * ({@code -0.0 * +0.0}) is {@code -0.0}; {@code fma(a, b, -0.0)} is * equivalent to ({@code a * b}) however. * * @apiNote This method corresponds to the fusedMultiplyAdd * operation defined in IEEE 754. * * @param a a value * @param b a value * @param c a value * * @return (a × b + c) * computed, as if with unlimited range and precision, and rounded * once to the nearest {@code double} value * * @since 9 */ @IntrinsicCandidate public static double fma(double a, double b, double c) { /* * Infinity and NaN arithmetic is not quite the same with two * roundings as opposed to just one so the simple expression * "a * b + c" cannot always be used to compute the correct * result. With two roundings, the product can overflow and * if the addend is infinite, a spurious NaN can be produced * if the infinity from the overflow and the infinite addend * have opposite signs. */ // First, screen for and handle non-finite input values whose // arithmetic is not supported by BigDecimal. if (Double.isNaN(a) || Double.isNaN(b) || Double.isNaN(c)) { return Double.NaN; } else { // All inputs non-NaN boolean infiniteA = Double.isInfinite(a); boolean infiniteB = Double.isInfinite(b); boolean infiniteC = Double.isInfinite(c); double result; if (infiniteA || infiniteB || infiniteC) { if (infiniteA && b == 0.0 || infiniteB && a == 0.0 ) { return Double.NaN; } // Store product in a double field to cause an // overflow even if non-strictfp evaluation is being // used. double product = a * b; if (Double.isInfinite(product) && !infiniteA && !infiniteB) { // Intermediate overflow; might cause a // spurious NaN if added to infinite c. assert Double.isInfinite(c); return c; } else { result = product + c; assert !Double.isFinite(result); return result; } } else { // All inputs finite BigDecimal product = (new BigDecimal(a)).multiply(new BigDecimal(b)); if (c == 0.0) { // Positive or negative zero // If the product is an exact zero, use a // floating-point expression to compute the sign // of the zero final result. The product is an // exact zero if and only if at least one of a and // b is zero. if (a == 0.0 || b == 0.0) { return a * b + c; } else { // The sign of a zero addend doesn't matter if // the product is nonzero. The sign of a zero // addend is not factored in the result if the // exact product is nonzero but underflows to // zero; see IEEE-754 2008 section 6.3 "The // sign bit". return product.doubleValue(); } } else { return product.add(new BigDecimal(c)).doubleValue(); } } } } /** * Returns the fused multiply add of the three arguments; that is, * returns the exact product of the first two arguments summed * with the third argument and then rounded once to the nearest * {@code float}. * * The rounding is done using the {@linkplain * java.math.RoundingMode#HALF_EVEN round to nearest even * rounding mode}. * * In contrast, if {@code a * b + c} is evaluated as a regular * floating-point expression, two rounding errors are involved, * the first for the multiply operation, the second for the * addition operation. * *
Special cases: *
Note that {@code fma(a, 1.0f, c)} returns the same
* result as ({@code a + c}). However,
* {@code fma(a, b, +0.0f)} does not always return the
* same result as ({@code a * b}) since
* {@code fma(-0.0f, +0.0f, +0.0f)} is {@code +0.0f} while
* ({@code -0.0f * +0.0f}) is {@code -0.0f}; {@code fma(a, b, -0.0f)} is
* equivalent to ({@code a * b}) however.
*
* @apiNote This method corresponds to the fusedMultiplyAdd
* operation defined in IEEE 754.
*
* @param a a value
* @param b a value
* @param c a value
*
* @return (a × b + c)
* computed, as if with unlimited range and precision, and rounded
* once to the nearest {@code float} value
*
* @since 9
*/
@IntrinsicCandidate
public static float fma(float a, float b, float c) {
if (Float.isFinite(a) && Float.isFinite(b) && Float.isFinite(c)) {
if (a == 0.0 || b == 0.0) {
return a * b + c; // Handled signed zero cases
} else {
return (new BigDecimal((double)a * (double)b) // Exact multiply
.add(new BigDecimal((double)c))) // Exact sum
.floatValue(); // One rounding
// to a float value
}
} else {
// At least one of a,b, and c is non-finite. The result
// will be non-finite as well and will be the same
// non-finite value under double as float arithmetic.
return (float)fma((double)a, (double)b, (double)c);
}
}
/**
* Returns the size of an ulp of the argument. An ulp, unit in
* the last place, of a {@code double} value is the positive
* distance between this floating-point value and the {@code
* double} value next larger in magnitude. Note that for non-NaN
* x, ulp(-x) == ulp(x).
*
*
Special Cases: *
ulp(-x) == ulp(x).
*
* Special Cases: *
Special Cases: *
Special Cases: *
Special cases: *
The computed result must be within 2.5 ulps of the exact result. * * @param x The number whose hyperbolic sine is to be returned. * @return The hyperbolic sine of {@code x}. * @since 1.5 */ // BEGIN Android-changed: Reimplement in native /* public static double sinh(double x) { return StrictMath.sinh(x); } */ // END Android-changed: Reimplement in native @CriticalNative public static native double sinh(double x); /** * Returns the hyperbolic cosine of a {@code double} value. * The hyperbolic cosine of x is defined to be * (ex + e-x)/2 * where e is {@linkplain Math#E Euler's number}. * *
Special cases: *
The computed result must be within 2.5 ulps of the exact result. * * @param x The number whose hyperbolic cosine is to be returned. * @return The hyperbolic cosine of {@code x}. * @since 1.5 */ // BEGIN Android-changed: Reimplement in native /* public static double cosh(double x) { return StrictMath.cosh(x); } */ // END Android-changed: Reimplement in native @CriticalNative public static native double cosh(double x); /** * Returns the hyperbolic tangent of a {@code double} value. * The hyperbolic tangent of x is defined to be * (ex - e-x)/(ex + e-x), * in other words, {@linkplain Math#sinh * sinh(x)}/{@linkplain Math#cosh cosh(x)}. Note * that the absolute value of the exact tanh is always less than * 1. * *
Special cases: *
The computed result must be within 2.5 ulps of the exact result. * The result of {@code tanh} for any finite input must have * an absolute value less than or equal to 1. Note that once the * exact result of tanh is within 1/2 of an ulp of the limit value * of ±1, correctly signed ±{@code 1.0} should * be returned. * * @param x The number whose hyperbolic tangent is to be returned. * @return The hyperbolic tangent of {@code x}. * @since 1.5 */ // BEGIN Android-changed: Reimplement in native /* public static double tanh(double x) { return StrictMath.tanh(x); } */ // END Android-changed: Reimplement in native @CriticalNative public static native double tanh(double x); /** * Returns sqrt(x2 +y2) * without intermediate overflow or underflow. * *
Special cases: *
The computed result must be within 1 ulp of the exact * result. If one parameter is held constant, the results must be * semi-monotonic in the other parameter. * * @param x a value * @param y a value * @return sqrt(x2 +y2) * without intermediate overflow or underflow * @since 1.5 */ // BEGIN Android-changed: Reimplement in native /* public static double hypot(double x, double y) { return StrictMath.hypot(x, y); } */ // END Android-changed: Reimplement in native @CriticalNative public static native double hypot(double x, double y); /** * Returns ex -1. Note that for values of * x near 0, the exact sum of * {@code expm1(x)} + 1 is much closer to the true * result of ex than {@code exp(x)}. * *
Special cases: *
The computed result must be within 1 ulp of the exact result. * Results must be semi-monotonic. The result of * {@code expm1} for any finite input must be greater than or * equal to {@code -1.0}. Note that once the exact result of * e{@code x} - 1 is within 1/2 * ulp of the limit value -1, {@code -1.0} should be * returned. * * @param x the exponent to raise e to in the computation of * e{@code x} -1. * @return the value e{@code x} - 1. * @since 1.5 */ // BEGIN Android-changed: Reimplement in native /* public static double expm1(double x) { return StrictMath.expm1(x); } */ // END Android-changed: Reimplement in native @CriticalNative public static native double expm1(double x); /** * Returns the natural logarithm of the sum of the argument and 1. * Note that for small values {@code x}, the result of * {@code log1p(x)} is much closer to the true result of ln(1 * + {@code x}) than the floating-point evaluation of * {@code log(1.0+x)}. * *
Special cases: * *
The computed result must be within 1 ulp of the exact result. * Results must be semi-monotonic. * * @param x a value * @return the value ln({@code x} + 1), the natural * log of {@code x} + 1 * @since 1.5 */ // BEGIN Android-changed: Reimplement in native /* public static double log1p(double x) { return StrictMath.log1p(x); } */ // END Android-changed: Reimplement in native @CriticalNative public static native double log1p(double x); /** * Returns the first floating-point argument with the sign of the * second floating-point argument. Note that unlike the {@link * StrictMath#copySign(double, double) StrictMath.copySign} * method, this method does not require NaN {@code sign} * arguments to be treated as positive values; implementations are * permitted to treat some NaN arguments as positive and other NaN * arguments as negative to allow greater performance. * * @apiNote * This method corresponds to the copySign operation defined in * IEEE 754. * * @param magnitude the parameter providing the magnitude of the result * @param sign the parameter providing the sign of the result * @return a value with the magnitude of {@code magnitude} * and the sign of {@code sign}. * @since 1.6 */ @IntrinsicCandidate public static double copySign(double magnitude, double sign) { return Double.longBitsToDouble((Double.doubleToRawLongBits(sign) & (DoubleConsts.SIGN_BIT_MASK)) | (Double.doubleToRawLongBits(magnitude) & (DoubleConsts.EXP_BIT_MASK | DoubleConsts.SIGNIF_BIT_MASK))); } /** * Returns the first floating-point argument with the sign of the * second floating-point argument. Note that unlike the {@link * StrictMath#copySign(float, float) StrictMath.copySign} * method, this method does not require NaN {@code sign} * arguments to be treated as positive values; implementations are * permitted to treat some NaN arguments as positive and other NaN * arguments as negative to allow greater performance. * * @apiNote * This method corresponds to the copySign operation defined in * IEEE 754. * * @param magnitude the parameter providing the magnitude of the result * @param sign the parameter providing the sign of the result * @return a value with the magnitude of {@code magnitude} * and the sign of {@code sign}. * @since 1.6 */ @IntrinsicCandidate public static float copySign(float magnitude, float sign) { return Float.intBitsToFloat((Float.floatToRawIntBits(sign) & (FloatConsts.SIGN_BIT_MASK)) | (Float.floatToRawIntBits(magnitude) & (FloatConsts.EXP_BIT_MASK | FloatConsts.SIGNIF_BIT_MASK))); } /** * Returns the unbiased exponent used in the representation of a * {@code float}. Special cases: * *
* Special cases: *
* Special cases: *
Special Cases: *
Special Cases: *
Special Cases: *
Special Cases: *
Special cases: *
Special cases: *