public class BigDecimal extends Number implements Comparable<BigDecimal>
BigDecimal consists of an arbitrary precision integer
unscaled value and a 32-bit integer scale. If zero
or positive, the scale is the number of digits to the right of the
decimal point. If negative, the unscaled value of the number is
multiplied by ten to the power of the negation of the scale. The
value of the number represented by the BigDecimal is
therefore (unscaledValue × 10-scale).
The BigDecimal class provides operations for
arithmetic, scale manipulation, rounding, comparison, hashing, and
format conversion. The toString() method provides a
canonical representation of a BigDecimal.
The BigDecimal class gives its user complete control
over rounding behavior. If no rounding mode is specified and the
exact result cannot be represented, an exception is thrown;
otherwise, calculations can be carried out to a chosen precision
and rounding mode by supplying an appropriate MathContext
object to the operation. In either case, eight rounding
modes are provided for the control of rounding. Using the
integer fields in this class (such as ROUND_HALF_UP) to
represent rounding mode is largely obsolete; the enumeration values
of the RoundingMode enum, (such as RoundingMode.HALF_UP) should be used instead.
When a MathContext object is supplied with a precision
setting of 0 (for example, MathContext.UNLIMITED),
arithmetic operations are exact, as are the arithmetic methods
which take no MathContext object. (This is the only
behavior that was supported in releases prior to 5.) As a
corollary of computing the exact result, the rounding mode setting
of a MathContext object with a precision setting of 0 is
not used and thus irrelevant. In the case of divide, the exact
quotient could have an infinitely long decimal expansion; for
example, 1 divided by 3. If the quotient has a nonterminating
decimal expansion and the operation is specified to return an exact
result, an ArithmeticException is thrown. Otherwise, the
exact result of the division is returned, as done for other
operations.
When the precision setting is not 0, the rules of
BigDecimal arithmetic are broadly compatible with selected
modes of operation of the arithmetic defined in ANSI X3.274-1996
and ANSI X3.274-1996/AM 1-2000 (section 7.4). Unlike those
standards, BigDecimal includes many rounding modes, which
were mandatory for division in BigDecimal releases prior
to 5. Any conflicts between these ANSI standards and the
BigDecimal specification are resolved in favor of
BigDecimal.
Since the same numerical value can have different representations (with different scales), the rules of arithmetic and rounding must specify both the numerical result and the scale used in the result's representation.
In general the rounding modes and precision setting determine
how operations return results with a limited number of digits when
the exact result has more digits (perhaps infinitely many in the
case of division) than the number of digits returned.
First, the
total number of digits to return is specified by the
MathContext's precision setting; this determines
the result's precision. The digit count starts from the
leftmost nonzero digit of the exact result. The rounding mode
determines how any discarded trailing digits affect the returned
result.
For all arithmetic operators , the operation is carried out as though an exact intermediate result were first calculated and then rounded to the number of digits specified by the precision setting (if necessary), using the selected rounding mode. If the exact result is not returned, some digit positions of the exact result are discarded. When rounding increases the magnitude of the returned result, it is possible for a new digit position to be created by a carry propagating to a leading "9" digit. For example, rounding the value 999.9 to three digits rounding up would be numerically equal to one thousand, represented as 100×101. In such cases, the new "1" is the leading digit position of the returned result.
Besides a logical exact result, each arithmetic operation has a preferred scale for representing a result. The preferred scale for each operation is listed in the table below.
| Operation | Preferred Scale of Result |
|---|---|
| Add | max(addend.scale(), augend.scale()) |
| Subtract | max(minuend.scale(), subtrahend.scale()) |
| Multiply | multiplier.scale() + multiplicand.scale() |
| Divide | dividend.scale() - divisor.scale() |
1/32 is 0.03125.
Before rounding, the scale of the logical exact intermediate
result is the preferred scale for that operation. If the exact
numerical result cannot be represented in precision
digits, rounding selects the set of digits to return and the scale
of the result is reduced from the scale of the intermediate result
to the least scale which can represent the precision
digits actually returned. If the exact result can be represented
with at most precision digits, the representation
of the result with the scale closest to the preferred scale is
returned. In particular, an exactly representable quotient may be
represented in fewer than precision digits by removing
trailing zeros and decreasing the scale. For example, rounding to
three digits using the floor
rounding mode,
19/100 = 0.19 // integer=19, scale=2
but
21/110 = 0.190 // integer=190, scale=3
Note that for add, subtract, and multiply, the reduction in scale will equal the number of digit positions of the exact result which are discarded. If the rounding causes a carry propagation to create a new high-order digit position, an additional digit of the result is discarded than when no new digit position is created.
Other methods may have slightly different rounding semantics.
For example, the result of the pow method using the
specified algorithm can
occasionally differ from the rounded mathematical result by more
than one unit in the last place, one ulp.
Two types of operations are provided for manipulating the scale
of a BigDecimal: scaling/rounding operations and decimal
point motion operations. Scaling/rounding operations (setScale and round) return a
BigDecimal whose value is approximately (or exactly) equal
to that of the operand, but whose scale or precision is the
specified value; that is, they increase or decrease the precision
of the stored number with minimal effect on its value. Decimal
point motion operations (movePointLeft and
movePointRight) return a
BigDecimal created from the operand by moving the decimal
point a specified distance in the specified direction.
For the sake of brevity and clarity, pseudo-code is used
throughout the descriptions of BigDecimal methods. The
pseudo-code expression (i + j) is shorthand for "a
BigDecimal whose value is that of the BigDecimal
i added to that of the BigDecimal
j." The pseudo-code expression (i == j) is
shorthand for "true if and only if the
BigDecimal i represents the same value as the
BigDecimal j." Other pseudo-code expressions
are interpreted similarly. Square brackets are used to represent
the particular BigInteger and scale pair defining a
BigDecimal value; for example [19, 2] is the
BigDecimal numerically equal to 0.19 having a scale of 2.
Note: care should be exercised if BigDecimal objects
are used as keys in a SortedMap or
elements in a SortedSet since
BigDecimal's natural ordering is inconsistent
with equals. See Comparable, SortedMap or SortedSet for more
information.
All methods and constructors for this class throw
NullPointerException when passed a null object
reference for any input parameter.
BigInteger,
MathContext,
RoundingMode,
SortedMap,
SortedSet,
Serialized Form| Modifier and Type | Field and Description |
|---|---|
static BigDecimal |
ONE
The value 1, with a scale of 0.
|
static int |
ROUND_CEILING
Rounding mode to round towards positive infinity.
|
static int |
ROUND_DOWN
Rounding mode to round towards zero.
|
static int |
ROUND_FLOOR
Rounding mode to round towards negative infinity.
|
static int |
ROUND_HALF_DOWN
Rounding mode to round towards "nearest neighbor"
unless both neighbors are equidistant, in which case round
down.
|
static int |
ROUND_HALF_EVEN
Rounding mode to round towards the "nearest neighbor"
unless both neighbors are equidistant, in which case, round
towards the even neighbor.
|
static int |
ROUND_HALF_UP
Rounding mode to round towards "nearest neighbor"
unless both neighbors are equidistant, in which case round up.
|
static int |
ROUND_UNNECESSARY
Rounding mode to assert that the requested operation has an exact
result, hence no rounding is necessary.
|
static int |
ROUND_UP
Rounding mode to round away from zero.
|
static BigDecimal |
TEN
The value 10, with a scale of 0.
|
static BigDecimal |
ZERO
The value 0, with a scale of 0.
|
| Constructor and Description |
|---|
BigDecimal(BigInteger val)
Translates a
BigInteger into a BigDecimal. |
BigDecimal(BigInteger unscaledVal,
int scale)
Translates a
BigInteger unscaled value and an
int scale into a BigDecimal. |
BigDecimal(BigInteger unscaledVal,
int scale,
MathContext mc)
Translates a
BigInteger unscaled value and an
int scale into a BigDecimal, with rounding
according to the context settings. |
BigDecimal(BigInteger val,
MathContext mc)
Translates a
BigInteger into a BigDecimal
rounding according to the context settings. |
BigDecimal(char[] in)
Translates a character array representation of a
BigDecimal into a BigDecimal, accepting the
same sequence of characters as the BigDecimal(String)
constructor. |
BigDecimal(char[] in,
int offset,
int len)
Translates a character array representation of a
BigDecimal into a BigDecimal, accepting the
same sequence of characters as the BigDecimal(String)
constructor, while allowing a sub-array to be specified. |
BigDecimal(char[] in,
int offset,
int len,
MathContext mc)
Translates a character array representation of a
BigDecimal into a BigDecimal, accepting the
same sequence of characters as the BigDecimal(String)
constructor, while allowing a sub-array to be specified and
with rounding according to the context settings. |
BigDecimal(char[] in,
MathContext mc)
Translates a character array representation of a
BigDecimal into a BigDecimal, accepting the
same sequence of characters as the BigDecimal(String)
constructor and with rounding according to the context
settings. |
BigDecimal(double val)
Translates a
double into a BigDecimal which
is the exact decimal representation of the double's
binary floating-point value. |
BigDecimal(double val,
MathContext mc)
Translates a
double into a BigDecimal, with
rounding according to the context settings. |
BigDecimal(int val)
Translates an
int into a BigDecimal. |
BigDecimal(int val,
MathContext mc)
Translates an
int into a BigDecimal, with
rounding according to the context settings. |
BigDecimal(long val)
Translates a
long into a BigDecimal. |
BigDecimal(long val,
MathContext mc)
Translates a
long into a BigDecimal, with
rounding according to the context settings. |
BigDecimal(String val)
Translates the string representation of a
BigDecimal
into a BigDecimal. |
BigDecimal(String val,
MathContext mc)
Translates the string representation of a
BigDecimal
into a BigDecimal, accepting the same strings as the
BigDecimal(String) constructor, with rounding
according to the context settings. |
| Modifier and Type | Method and Description |
|---|---|
BigDecimal |
abs()
Returns a
BigDecimal whose value is the absolute value
of this BigDecimal, and whose scale is
this.scale(). |
BigDecimal |
abs(MathContext mc)
Returns a
BigDecimal whose value is the absolute value
of this BigDecimal, with rounding according to the
context settings. |
BigDecimal |
add(BigDecimal augend)
Returns a
BigDecimal whose value is (this +
augend), and whose scale is max(this.scale(),
augend.scale()). |
BigDecimal |
add(BigDecimal augend,
MathContext mc)
Returns a
BigDecimal whose value is (this + augend),
with rounding according to the context settings. |
byte |
byteValueExact()
Converts this
BigDecimal to a byte, checking
for lost information. |
int |
compareTo(BigDecimal val)
Compares this
BigDecimal with the specified
BigDecimal. |
BigDecimal |
divide(BigDecimal divisor)
Returns a
BigDecimal whose value is (this /
divisor), and whose preferred scale is (this.scale() -
divisor.scale()); if the exact quotient cannot be
represented (because it has a non-terminating decimal
expansion) an ArithmeticException is thrown. |
BigDecimal |
divide(BigDecimal divisor,
int roundingMode)
Returns a
BigDecimal whose value is (this /
divisor), and whose scale is this.scale(). |
BigDecimal |
divide(BigDecimal divisor,
int scale,
int roundingMode)
Returns a
BigDecimal whose value is (this /
divisor), and whose scale is as specified. |
BigDecimal |
divide(BigDecimal divisor,
int scale,
RoundingMode roundingMode)
Returns a
BigDecimal whose value is (this /
divisor), and whose scale is as specified. |
BigDecimal |
divide(BigDecimal divisor,
MathContext mc)
Returns a
BigDecimal whose value is (this /
divisor), with rounding according to the context settings. |
BigDecimal |
divide(BigDecimal divisor,
RoundingMode roundingMode)
Returns a
BigDecimal whose value is (this /
divisor), and whose scale is this.scale(). |
BigDecimal[] |
divideAndRemainder(BigDecimal divisor)
Returns a two-element
BigDecimal array containing the
result of divideToIntegralValue followed by the result of
remainder on the two operands. |
BigDecimal[] |
divideAndRemainder(BigDecimal divisor,
MathContext mc)
Returns a two-element
BigDecimal array containing the
result of divideToIntegralValue followed by the result of
remainder on the two operands calculated with rounding
according to the context settings. |
BigDecimal |
divideToIntegralValue(BigDecimal divisor)
Returns a
BigDecimal whose value is the integer part
of the quotient (this / divisor) rounded down. |
BigDecimal |
divideToIntegralValue(BigDecimal divisor,
MathContext mc)
Returns a
BigDecimal whose value is the integer part
of (this / divisor). |
double |
doubleValue()
Converts this
BigDecimal to a double. |
boolean |
equals(Object x)
Compares this
BigDecimal with the specified
Object for equality. |
float |
floatValue()
Converts this
BigDecimal to a float. |
int |
hashCode()
Returns the hash code for this
BigDecimal. |
int |
intValue()
Converts this
BigDecimal to an int. |
int |
intValueExact()
Converts this
BigDecimal to an int, checking
for lost information. |
long |
longValue()
Converts this
BigDecimal to a long. |
long |
longValueExact()
Converts this
BigDecimal to a long, checking
for lost information. |
BigDecimal |
max(BigDecimal val)
Returns the maximum of this
BigDecimal and val. |
BigDecimal |
min(BigDecimal val)
Returns the minimum of this
BigDecimal and
val. |
BigDecimal |
movePointLeft(int n)
Returns a
BigDecimal which is equivalent to this one
with the decimal point moved n places to the left. |
BigDecimal |
movePointRight(int n)
Returns a
BigDecimal which is equivalent to this one
with the decimal point moved n places to the right. |
BigDecimal |
multiply(BigDecimal multiplicand)
Returns a
BigDecimal whose value is (this ×
multiplicand), and whose scale is (this.scale() +
multiplicand.scale()). |
BigDecimal |
multiply(BigDecimal multiplicand,
MathContext mc)
Returns a
BigDecimal whose value is (this ×
multiplicand), with rounding according to the context settings. |
BigDecimal |
negate()
Returns a
BigDecimal whose value is (-this),
and whose scale is this.scale(). |
BigDecimal |
negate(MathContext mc)
Returns a
BigDecimal whose value is (-this),
with rounding according to the context settings. |
BigDecimal |
plus()
Returns a
BigDecimal whose value is (+this), and whose
scale is this.scale(). |
BigDecimal |
plus(MathContext mc)
Returns a
BigDecimal whose value is (+this),
with rounding according to the context settings. |
BigDecimal |
pow(int n)
Returns a
BigDecimal whose value is
(thisn), The power is computed exactly, to
unlimited precision. |
BigDecimal |
pow(int n,
MathContext mc)
Returns a
BigDecimal whose value is
(thisn). |
int |
precision()
Returns the precision of this
BigDecimal. |
BigDecimal |
remainder(BigDecimal divisor)
Returns a
BigDecimal whose value is (this % divisor). |
BigDecimal |
remainder(BigDecimal divisor,
MathContext mc)
Returns a
BigDecimal whose value is (this %
divisor), with rounding according to the context settings. |
BigDecimal |
round(MathContext mc)
Returns a
BigDecimal rounded according to the
MathContext settings. |
int |
scale()
Returns the scale of this
BigDecimal. |
BigDecimal |
scaleByPowerOfTen(int n)
Returns a BigDecimal whose numerical value is equal to
(
this * 10n). |
BigDecimal |
setScale(int newScale)
Returns a
BigDecimal whose scale is the specified
value, and whose value is numerically equal to this
BigDecimal's. |
BigDecimal |
setScale(int newScale,
int roundingMode)
Returns a
BigDecimal whose scale is the specified
value, and whose unscaled value is determined by multiplying or
dividing this BigDecimal's unscaled value by the
appropriate power of ten to maintain its overall value. |
BigDecimal |
setScale(int newScale,
RoundingMode roundingMode)
Returns a
BigDecimal whose scale is the specified
value, and whose unscaled value is determined by multiplying or
dividing this BigDecimal's unscaled value by the
appropriate power of ten to maintain its overall value. |
short |
shortValueExact()
Converts this
BigDecimal to a short, checking
for lost information. |
int |
signum()
Returns the signum function of this
BigDecimal. |
BigDecimal |
stripTrailingZeros()
Returns a
BigDecimal which is numerically equal to
this one but with any trailing zeros removed from the
representation. |
BigDecimal |
subtract(BigDecimal subtrahend)
Returns a
BigDecimal whose value is (this -
subtrahend), and whose scale is max(this.scale(),
subtrahend.scale()). |
BigDecimal |
subtract(BigDecimal subtrahend,
MathContext mc)
Returns a
BigDecimal whose value is (this - subtrahend),
with rounding according to the context settings. |
BigInteger |
toBigInteger()
Converts this
BigDecimal to a BigInteger. |
BigInteger |
toBigIntegerExact()
Converts this
BigDecimal to a BigInteger,
checking for lost information. |
String |
toEngineeringString()
Returns a string representation of this
BigDecimal,
using engineering notation if an exponent is needed. |
String |
toPlainString()
Returns a string representation of this
BigDecimal
without an exponent field. |
String |
toString()
Returns the string representation of this
BigDecimal,
using scientific notation if an exponent is needed. |
BigDecimal |
ulp()
Returns the size of an ulp, a unit in the last place, of this
BigDecimal. |
BigInteger |
unscaledValue()
Returns a
BigInteger whose value is the unscaled
value of this BigDecimal. |
static BigDecimal |
valueOf(double val)
Translates a
double into a BigDecimal, using
the double's canonical string representation provided
by the Double.toString(double) method. |
static BigDecimal |
valueOf(long val)
Translates a
long value into a BigDecimal
with a scale of zero. |
static BigDecimal |
valueOf(long unscaledVal,
int scale)
Translates a
long unscaled value and an
int scale into a BigDecimal. |
byteValue, shortValuepublic static final BigDecimal ZERO
public static final BigDecimal ONE
public static final BigDecimal TEN
public static final int ROUND_UP
public static final int ROUND_DOWN
public static final int ROUND_CEILING
BigDecimal is positive, behaves as for
ROUND_UP; if negative, behaves as for
ROUND_DOWN. Note that this rounding mode never
decreases the calculated value.public static final int ROUND_FLOOR
BigDecimal is positive, behave as for
ROUND_DOWN; if negative, behave as for
ROUND_UP. Note that this rounding mode never
increases the calculated value.public static final int ROUND_HALF_UP
ROUND_UP if the discarded fraction is
≥ 0.5; otherwise, behaves as for ROUND_DOWN. Note
that this is the rounding mode that most of us were taught in
grade school.public static final int ROUND_HALF_DOWN
ROUND_UP if the discarded
fraction is > 0.5; otherwise, behaves as for
ROUND_DOWN.public static final int ROUND_HALF_EVEN
ROUND_HALF_UP if the digit to the left of the
discarded fraction is odd; behaves as for
ROUND_HALF_DOWN if it's even. Note that this is the
rounding mode that minimizes cumulative error when applied
repeatedly over a sequence of calculations.public static final int ROUND_UNNECESSARY
ArithmeticException is thrown.public BigDecimal(char[] in,
int offset,
int len)
BigDecimal into a BigDecimal, accepting the
same sequence of characters as the BigDecimal(String)
constructor, while allowing a sub-array to be specified.
Note that if the sequence of characters is already available
within a character array, using this constructor is faster than
converting the char array to string and using the
BigDecimal(String) constructor .
in - char array that is the source of characters.offset - first character in the array to inspect.len - number of characters to consider.NumberFormatException - if in is not a valid
representation of a BigDecimal or the defined subarray
is not wholly within in.public BigDecimal(char[] in,
int offset,
int len,
MathContext mc)
BigDecimal into a BigDecimal, accepting the
same sequence of characters as the BigDecimal(String)
constructor, while allowing a sub-array to be specified and
with rounding according to the context settings.
Note that if the sequence of characters is already available
within a character array, using this constructor is faster than
converting the char array to string and using the
BigDecimal(String) constructor .
in - char array that is the source of characters.offset - first character in the array to inspect.len - number of characters to consider..mc - the context to use.ArithmeticException - if the result is inexact but the
rounding mode is UNNECESSARY.NumberFormatException - if in is not a valid
representation of a BigDecimal or the defined subarray
is not wholly within in.public BigDecimal(char[] in)
BigDecimal into a BigDecimal, accepting the
same sequence of characters as the BigDecimal(String)
constructor.
Note that if the sequence of characters is already available
as a character array, using this constructor is faster than
converting the char array to string and using the
BigDecimal(String) constructor .
in - char array that is the source of characters.NumberFormatException - if in is not a valid
representation of a BigDecimal.public BigDecimal(char[] in,
MathContext mc)
BigDecimal into a BigDecimal, accepting the
same sequence of characters as the BigDecimal(String)
constructor and with rounding according to the context
settings.
Note that if the sequence of characters is already available
as a character array, using this constructor is faster than
converting the char array to string and using the
BigDecimal(String) constructor .
in - char array that is the source of characters.mc - the context to use.ArithmeticException - if the result is inexact but the
rounding mode is UNNECESSARY.NumberFormatException - if in is not a valid
representation of a BigDecimal.public BigDecimal(String val)
BigDecimal
into a BigDecimal. The string representation consists
of an optional sign, '+' ( '\u002B') or
'-' ('\u002D'), followed by a sequence of
zero or more decimal digits ("the integer"), optionally
followed by a fraction, optionally followed by an exponent.
The fraction consists of a decimal point followed by zero or more decimal digits. The string must contain at least one digit in either the integer or the fraction. The number formed by the sign, the integer and the fraction is referred to as the significand.
The exponent consists of the character 'e'
('\u0065') or 'E' ('\u0045')
followed by one or more decimal digits. The value of the
exponent must lie between -Integer.MAX_VALUE (Integer.MIN_VALUE+1) and Integer.MAX_VALUE, inclusive.
More formally, the strings this constructor accepts are described by the following grammar:
- BigDecimalString:
- Signopt Significand Exponentopt
- Sign:
+-- Significand:
- IntegerPart
.FractionPartopt.FractionPart- IntegerPart
- IntegerPart:
- Digits
- FractionPart:
- Digits
- Exponent:
- ExponentIndicator SignedInteger
- ExponentIndicator:
eE- SignedInteger:
- Signopt Digits
- Digits:
- Digit
- Digits Digit
- Digit:
- any character for which
Character.isDigit(char)returnstrue, including 0, 1, 2 ...
The scale of the returned BigDecimal will be the
number of digits in the fraction, or zero if the string
contains no decimal point, subject to adjustment for any
exponent; if the string contains an exponent, the exponent is
subtracted from the scale. The value of the resulting scale
must lie between Integer.MIN_VALUE and
Integer.MAX_VALUE, inclusive.
The character-to-digit mapping is provided by Character.digit(char, int) set to convert to radix 10. The
String may not contain any extraneous characters (whitespace,
for example).
Examples:
The value of the returned BigDecimal is equal to
significand × 10 exponent.
For each string on the left, the resulting representation
[BigInteger, scale] is shown on the right.
"0" [0,0] "0.00" [0,2] "123" [123,0] "-123" [-123,0] "1.23E3" [123,-1] "1.23E+3" [123,-1] "12.3E+7" [123,-6] "12.0" [120,1] "12.3" [123,1] "0.00123" [123,5] "-1.23E-12" [-123,14] "1234.5E-4" [12345,5] "0E+7" [0,-7] "-0" [0,0]
Note: For values other than float and
double NaN and ±Infinity, this constructor is
compatible with the values returned by Float.toString(float)
and Double.toString(double). This is generally the preferred
way to convert a float or double into a
BigDecimal, as it doesn't suffer from the unpredictability of
the BigDecimal(double) constructor.
val - String representation of BigDecimal.NumberFormatException - if val is not a valid
representation of a BigDecimal.public BigDecimal(String val, MathContext mc)
BigDecimal
into a BigDecimal, accepting the same strings as the
BigDecimal(String) constructor, with rounding
according to the context settings.val - string representation of a BigDecimal.mc - the context to use.ArithmeticException - if the result is inexact but the
rounding mode is UNNECESSARY.NumberFormatException - if val is not a valid
representation of a BigDecimal.public BigDecimal(double val)
double into a BigDecimal which
is the exact decimal representation of the double's
binary floating-point value. The scale of the returned
BigDecimal is the smallest value such that
(10scale × val) is an integer.
Notes:
new BigDecimal(0.1) in
Java creates a BigDecimal which is exactly equal to
0.1 (an unscaled value of 1, with a scale of 1), but it is
actually equal to
0.1000000000000000055511151231257827021181583404541015625.
This is because 0.1 cannot be represented exactly as a
double (or, for that matter, as a binary fraction of
any finite length). Thus, the value that is being passed
in to the constructor is not exactly equal to 0.1,
appearances notwithstanding.
String constructor, on the other hand, is
perfectly predictable: writing new BigDecimal("0.1")
creates a BigDecimal which is exactly equal to
0.1, as one would expect. Therefore, it is generally
recommended that the String constructor be used in preference to this one.
double must be used as a source for a
BigDecimal, note that this constructor provides an
exact conversion; it does not give the same result as
converting the double to a String using the
Double.toString(double) method and then using the
BigDecimal(String) constructor. To get that result,
use the static valueOf(double) method.
val - double value to be converted to
BigDecimal.NumberFormatException - if val is infinite or NaN.public BigDecimal(double val,
MathContext mc)
double into a BigDecimal, with
rounding according to the context settings. The scale of the
BigDecimal is the smallest value such that
(10scale × val) is an integer.
The results of this constructor can be somewhat unpredictable
and its use is generally not recommended; see the notes under
the BigDecimal(double) constructor.
val - double value to be converted to
BigDecimal.mc - the context to use.ArithmeticException - if the result is inexact but the
RoundingMode is UNNECESSARY.NumberFormatException - if val is infinite or NaN.public BigDecimal(BigInteger val)
BigInteger into a BigDecimal.
The scale of the BigDecimal is zero.val - BigInteger value to be converted to
BigDecimal.public BigDecimal(BigInteger val, MathContext mc)
BigInteger into a BigDecimal
rounding according to the context settings. The scale of the
BigDecimal is zero.val - BigInteger value to be converted to
BigDecimal.mc - the context to use.ArithmeticException - if the result is inexact but the
rounding mode is UNNECESSARY.public BigDecimal(BigInteger unscaledVal, int scale)
BigInteger unscaled value and an
int scale into a BigDecimal. The value of
the BigDecimal is
(unscaledVal × 10-scale).unscaledVal - unscaled value of the BigDecimal.scale - scale of the BigDecimal.public BigDecimal(BigInteger unscaledVal, int scale, MathContext mc)
BigInteger unscaled value and an
int scale into a BigDecimal, with rounding
according to the context settings. The value of the
BigDecimal is (unscaledVal ×
10-scale), rounded according to the
precision and rounding mode settings.unscaledVal - unscaled value of the BigDecimal.scale - scale of the BigDecimal.mc - the context to use.ArithmeticException - if the result is inexact but the
rounding mode is UNNECESSARY.public BigDecimal(int val)
int into a BigDecimal. The
scale of the BigDecimal is zero.val - int value to be converted to
BigDecimal.public BigDecimal(int val,
MathContext mc)
int into a BigDecimal, with
rounding according to the context settings. The scale of the
BigDecimal, before any rounding, is zero.val - int value to be converted to BigDecimal.mc - the context to use.ArithmeticException - if the result is inexact but the
rounding mode is UNNECESSARY.public BigDecimal(long val)
long into a BigDecimal. The
scale of the BigDecimal is zero.val - long value to be converted to BigDecimal.public BigDecimal(long val,
MathContext mc)
long into a BigDecimal, with
rounding according to the context settings. The scale of the
BigDecimal, before any rounding, is zero.val - long value to be converted to BigDecimal.mc - the context to use.ArithmeticException - if the result is inexact but the
rounding mode is UNNECESSARY.public static BigDecimal valueOf(long unscaledVal, int scale)
long unscaled value and an
int scale into a BigDecimal. This
"static factory method" is provided in preference to
a (long, int) constructor because it
allows for reuse of frequently used BigDecimal values..unscaledVal - unscaled value of the BigDecimal.scale - scale of the BigDecimal.BigDecimal whose value is
(unscaledVal × 10-scale).public static BigDecimal valueOf(long val)
long value into a BigDecimal
with a scale of zero. This "static factory method"
is provided in preference to a (long) constructor
because it allows for reuse of frequently used
BigDecimal values.val - value of the BigDecimal.BigDecimal whose value is val.public static BigDecimal valueOf(double val)
double into a BigDecimal, using
the double's canonical string representation provided
by the Double.toString(double) method.
Note: This is generally the preferred way to convert
a double (or float) into a
BigDecimal, as the value returned is equal to that
resulting from constructing a BigDecimal from the
result of using Double.toString(double).
val - double to convert to a BigDecimal.BigDecimal whose value is equal to or approximately
equal to the value of val.NumberFormatException - if val is infinite or NaN.public BigDecimal add(BigDecimal augend)
BigDecimal whose value is (this +
augend), and whose scale is max(this.scale(),
augend.scale()).augend - value to be added to this BigDecimal.this + augendpublic BigDecimal add(BigDecimal augend, MathContext mc)
BigDecimal whose value is (this + augend),
with rounding according to the context settings.
If either number is zero and the precision setting is nonzero then
the other number, rounded if necessary, is used as the result.augend - value to be added to this BigDecimal.mc - the context to use.this + augend, rounded as necessary.ArithmeticException - if the result is inexact but the
rounding mode is UNNECESSARY.public BigDecimal subtract(BigDecimal subtrahend)
BigDecimal whose value is (this -
subtrahend), and whose scale is max(this.scale(),
subtrahend.scale()).subtrahend - value to be subtracted from this BigDecimal.this - subtrahendpublic BigDecimal subtract(BigDecimal subtrahend, MathContext mc)
BigDecimal whose value is (this - subtrahend),
with rounding according to the context settings.
If subtrahend is zero then this, rounded if necessary, is used as the
result. If this is zero then the result is subtrahend.negate(mc).subtrahend - value to be subtracted from this BigDecimal.mc - the context to use.this - subtrahend, rounded as necessary.ArithmeticException - if the result is inexact but the
rounding mode is UNNECESSARY.public BigDecimal multiply(BigDecimal multiplicand)
BigDecimal whose value is (this ×
multiplicand), and whose scale is (this.scale() +
multiplicand.scale()).multiplicand - value to be multiplied by this BigDecimal.this * multiplicandpublic BigDecimal multiply(BigDecimal multiplicand, MathContext mc)
BigDecimal whose value is (this ×
multiplicand), with rounding according to the context settings.multiplicand - value to be multiplied by this BigDecimal.mc - the context to use.this * multiplicand, rounded as necessary.ArithmeticException - if the result is inexact but the
rounding mode is UNNECESSARY.public BigDecimal divide(BigDecimal divisor, int scale, int roundingMode)
BigDecimal whose value is (this /
divisor), and whose scale is as specified. If rounding must
be performed to generate a result with the specified scale, the
specified rounding mode is applied.
The new divide(BigDecimal, int, RoundingMode) method
should be used in preference to this legacy method.
divisor - value by which this BigDecimal is to be divided.scale - scale of the BigDecimal quotient to be returned.roundingMode - rounding mode to apply.this / divisorArithmeticException - if divisor is zero,
roundingMode==ROUND_UNNECESSARY and
the specified scale is insufficient to represent the result
of the division exactly.IllegalArgumentException - if roundingMode does not
represent a valid rounding mode.ROUND_UP,
ROUND_DOWN,
ROUND_CEILING,
ROUND_FLOOR,
ROUND_HALF_UP,
ROUND_HALF_DOWN,
ROUND_HALF_EVEN,
ROUND_UNNECESSARYpublic BigDecimal divide(BigDecimal divisor, int scale, RoundingMode roundingMode)
BigDecimal whose value is (this /
divisor), and whose scale is as specified. If rounding must
be performed to generate a result with the specified scale, the
specified rounding mode is applied.divisor - value by which this BigDecimal is to be divided.scale - scale of the BigDecimal quotient to be returned.roundingMode - rounding mode to apply.this / divisorArithmeticException - if divisor is zero,
roundingMode==RoundingMode.UNNECESSARY and
the specified scale is insufficient to represent the result
of the division exactly.public BigDecimal divide(BigDecimal divisor, int roundingMode)
BigDecimal whose value is (this /
divisor), and whose scale is this.scale(). If
rounding must be performed to generate a result with the given
scale, the specified rounding mode is applied.
The new divide(BigDecimal, RoundingMode) method
should be used in preference to this legacy method.
divisor - value by which this BigDecimal is to be divided.roundingMode - rounding mode to apply.this / divisorArithmeticException - if divisor==0, or
roundingMode==ROUND_UNNECESSARY and
this.scale() is insufficient to represent the result
of the division exactly.IllegalArgumentException - if roundingMode does not
represent a valid rounding mode.ROUND_UP,
ROUND_DOWN,
ROUND_CEILING,
ROUND_FLOOR,
ROUND_HALF_UP,
ROUND_HALF_DOWN,
ROUND_HALF_EVEN,
ROUND_UNNECESSARYpublic BigDecimal divide(BigDecimal divisor, RoundingMode roundingMode)
BigDecimal whose value is (this /
divisor), and whose scale is this.scale(). If
rounding must be performed to generate a result with the given
scale, the specified rounding mode is applied.divisor - value by which this BigDecimal is to be divided.roundingMode - rounding mode to apply.this / divisorArithmeticException - if divisor==0, or
roundingMode==RoundingMode.UNNECESSARY and
this.scale() is insufficient to represent the result
of the division exactly.public BigDecimal divide(BigDecimal divisor)
BigDecimal whose value is (this /
divisor), and whose preferred scale is (this.scale() -
divisor.scale()); if the exact quotient cannot be
represented (because it has a non-terminating decimal
expansion) an ArithmeticException is thrown.divisor - value by which this BigDecimal is to be divided.this / divisorArithmeticException - if the exact quotient does not have a
terminating decimal expansionpublic BigDecimal divide(BigDecimal divisor, MathContext mc)
BigDecimal whose value is (this /
divisor), with rounding according to the context settings.divisor - value by which this BigDecimal is to be divided.mc - the context to use.this / divisor, rounded as necessary.ArithmeticException - if the result is inexact but the
rounding mode is UNNECESSARY or
mc.precision == 0 and the quotient has a
non-terminating decimal expansion.public BigDecimal divideToIntegralValue(BigDecimal divisor)
BigDecimal whose value is the integer part
of the quotient (this / divisor) rounded down. The
preferred scale of the result is (this.scale() -
divisor.scale()).divisor - value by which this BigDecimal is to be divided.this / divisor.ArithmeticException - if divisor==0public BigDecimal divideToIntegralValue(BigDecimal divisor, MathContext mc)
BigDecimal whose value is the integer part
of (this / divisor). Since the integer part of the
exact quotient does not depend on the rounding mode, the
rounding mode does not affect the values returned by this
method. The preferred scale of the result is
(this.scale() - divisor.scale()). An
ArithmeticException is thrown if the integer part of
the exact quotient needs more than mc.precision
digits.divisor - value by which this BigDecimal is to be divided.mc - the context to use.this / divisor.ArithmeticException - if divisor==0ArithmeticException - if mc.precision > 0 and the result
requires a precision of more than mc.precision digits.public BigDecimal remainder(BigDecimal divisor)
BigDecimal whose value is (this % divisor).
The remainder is given by
this.subtract(this.divideToIntegralValue(divisor).multiply(divisor)).
Note that this is not the modulo operation (the result can be
negative).
divisor - value by which this BigDecimal is to be divided.this % divisor.ArithmeticException - if divisor==0public BigDecimal remainder(BigDecimal divisor, MathContext mc)
BigDecimal whose value is (this %
divisor), with rounding according to the context settings.
The MathContext settings affect the implicit divide
used to compute the remainder. The remainder computation
itself is by definition exact. Therefore, the remainder may
contain more than mc.getPrecision() digits.
The remainder is given by
this.subtract(this.divideToIntegralValue(divisor,
mc).multiply(divisor)). Note that this is not the modulo
operation (the result can be negative).
divisor - value by which this BigDecimal is to be divided.mc - the context to use.this % divisor, rounded as necessary.ArithmeticException - if divisor==0ArithmeticException - if the result is inexact but the
rounding mode is UNNECESSARY, or mc.precision
> 0 and the result of this.divideToIntgralValue(divisor) would
require a precision of more than mc.precision digits.divideToIntegralValue(java.math.BigDecimal, java.math.MathContext)public BigDecimal[] divideAndRemainder(BigDecimal divisor)
BigDecimal array containing the
result of divideToIntegralValue followed by the result of
remainder on the two operands.
Note that if both the integer quotient and remainder are
needed, this method is faster than using the
divideToIntegralValue and remainder methods
separately because the division need only be carried out once.
divisor - value by which this BigDecimal is to be divided,
and the remainder computed.BigDecimal array: the quotient
(the result of divideToIntegralValue) is the initial element
and the remainder is the final element.ArithmeticException - if divisor==0divideToIntegralValue(java.math.BigDecimal, java.math.MathContext),
remainder(java.math.BigDecimal, java.math.MathContext)public BigDecimal[] divideAndRemainder(BigDecimal divisor, MathContext mc)
BigDecimal array containing the
result of divideToIntegralValue followed by the result of
remainder on the two operands calculated with rounding
according to the context settings.
Note that if both the integer quotient and remainder are
needed, this method is faster than using the
divideToIntegralValue and remainder methods
separately because the division need only be carried out once.
divisor - value by which this BigDecimal is to be divided,
and the remainder computed.mc - the context to use.BigDecimal array: the quotient
(the result of divideToIntegralValue) is the
initial element and the remainder is the final element.ArithmeticException - if divisor==0ArithmeticException - if the result is inexact but the
rounding mode is UNNECESSARY, or mc.precision
> 0 and the result of this.divideToIntgralValue(divisor) would
require a precision of more than mc.precision digits.divideToIntegralValue(java.math.BigDecimal, java.math.MathContext),
remainder(java.math.BigDecimal, java.math.MathContext)public BigDecimal pow(int n)
BigDecimal whose value is
(thisn), The power is computed exactly, to
unlimited precision.
The parameter n must be in the range 0 through
999999999, inclusive. ZERO.pow(0) returns ONE.
Note that future releases may expand the allowable exponent
range of this method.
n - power to raise this BigDecimal to.ArithmeticException - if n is out of range.public BigDecimal pow(int n, MathContext mc)
BigDecimal whose value is
(thisn). The current implementation uses
the core algorithm defined in ANSI standard X3.274-1996 with
rounding according to the context settings. In general, the
returned numerical value is within two ulps of the exact
numerical value for the chosen precision. Note that future
releases may use a different algorithm with a decreased
allowable error bound and increased allowable exponent range.
The X3.274-1996 algorithm is:
ArithmeticException exception is thrown if
abs(n) > 999999999
mc.precision == 0 and n < 0
mc.precision > 0 and n has more than
mc.precision decimal digits
n is zero, ONE is returned even if
this is zero, otherwise
n is positive, the result is calculated via
the repeated squaring technique into a single accumulator.
The individual multiplications with the accumulator use the
same math context settings as in mc except for a
precision increased to mc.precision + elength + 1
where elength is the number of decimal digits in
n.
n is negative, the result is calculated as if
n were positive; this value is then divided into one
using the working precision specified above.
n - power to raise this BigDecimal to.mc - the context to use.ArithmeticException - if the result is inexact but the
rounding mode is UNNECESSARY, or n is out
of range.public BigDecimal abs()
BigDecimal whose value is the absolute value
of this BigDecimal, and whose scale is
this.scale().abs(this)public BigDecimal abs(MathContext mc)
BigDecimal whose value is the absolute value
of this BigDecimal, with rounding according to the
context settings.mc - the context to use.abs(this), rounded as necessary.ArithmeticException - if the result is inexact but the
rounding mode is UNNECESSARY.public BigDecimal negate()
BigDecimal whose value is (-this),
and whose scale is this.scale().-this.public BigDecimal negate(MathContext mc)
BigDecimal whose value is (-this),
with rounding according to the context settings.mc - the context to use.-this, rounded as necessary.ArithmeticException - if the result is inexact but the
rounding mode is UNNECESSARY.public BigDecimal plus()
BigDecimal whose value is (+this), and whose
scale is this.scale().
This method, which simply returns this BigDecimal
is included for symmetry with the unary minus method negate().
this.negate()public BigDecimal plus(MathContext mc)
BigDecimal whose value is (+this),
with rounding according to the context settings.
The effect of this method is identical to that of the round(MathContext) method.
mc - the context to use.this, rounded as necessary. A zero result will
have a scale of 0.ArithmeticException - if the result is inexact but the
rounding mode is UNNECESSARY.round(MathContext)public int signum()
BigDecimal.BigDecimal
is negative, zero, or positive.public int scale()
BigDecimal. If zero
or positive, the scale is the number of digits to the right of
the decimal point. If negative, the unscaled value of the
number is multiplied by ten to the power of the negation of the
scale. For example, a scale of -3 means the unscaled
value is multiplied by 1000.BigDecimal.public int precision()
BigDecimal. (The
precision is the number of digits in the unscaled value.)
The precision of a zero value is 1.
BigDecimal.public BigInteger unscaledValue()
BigInteger whose value is the unscaled
value of this BigDecimal. (Computes (this *
10this.scale()).)BigDecimal.public BigDecimal round(MathContext mc)
BigDecimal rounded according to the
MathContext settings. If the precision setting is 0 then
no rounding takes place.
The effect of this method is identical to that of the
plus(MathContext) method.
mc - the context to use.BigDecimal rounded according to the
MathContext settings.ArithmeticException - if the rounding mode is
UNNECESSARY and the
BigDecimal operation would require rounding.plus(MathContext)public BigDecimal setScale(int newScale, RoundingMode roundingMode)
BigDecimal whose scale is the specified
value, and whose unscaled value is determined by multiplying or
dividing this BigDecimal's unscaled value by the
appropriate power of ten to maintain its overall value. If the
scale is reduced by the operation, the unscaled value must be
divided (rather than multiplied), and the value may be changed;
in this case, the specified rounding mode is applied to the
division.
Note that since BigDecimal objects are immutable, calls of
this method do not result in the original object being
modified, contrary to the usual convention of having methods
named setX mutate field X.
Instead, setScale returns an object with the proper
scale; the returned object may or may not be newly allocated.
newScale - scale of the BigDecimal value to be returned.roundingMode - The rounding mode to apply.BigDecimal whose scale is the specified value,
and whose unscaled value is determined by multiplying or
dividing this BigDecimal's unscaled value by the
appropriate power of ten to maintain its overall value.ArithmeticException - if roundingMode==UNNECESSARY
and the specified scaling operation would require
rounding.RoundingModepublic BigDecimal setScale(int newScale, int roundingMode)
BigDecimal whose scale is the specified
value, and whose unscaled value is determined by multiplying or
dividing this BigDecimal's unscaled value by the
appropriate power of ten to maintain its overall value. If the
scale is reduced by the operation, the unscaled value must be
divided (rather than multiplied), and the value may be changed;
in this case, the specified rounding mode is applied to the
division.
Note that since BigDecimal objects are immutable, calls of
this method do not result in the original object being
modified, contrary to the usual convention of having methods
named setX mutate field X.
Instead, setScale returns an object with the proper
scale; the returned object may or may not be newly allocated.
The new setScale(int, RoundingMode) method should
be used in preference to this legacy method.
newScale - scale of the BigDecimal value to be returned.roundingMode - The rounding mode to apply.BigDecimal whose scale is the specified value,
and whose unscaled value is determined by multiplying or
dividing this BigDecimal's unscaled value by the
appropriate power of ten to maintain its overall value.ArithmeticException - if roundingMode==ROUND_UNNECESSARY
and the specified scaling operation would require
rounding.IllegalArgumentException - if roundingMode does not
represent a valid rounding mode.ROUND_UP,
ROUND_DOWN,
ROUND_CEILING,
ROUND_FLOOR,
ROUND_HALF_UP,
ROUND_HALF_DOWN,
ROUND_HALF_EVEN,
ROUND_UNNECESSARYpublic BigDecimal setScale(int newScale)
BigDecimal whose scale is the specified
value, and whose value is numerically equal to this
BigDecimal's. Throws an ArithmeticException
if this is not possible.
This call is typically used to increase the scale, in which
case it is guaranteed that there exists a BigDecimal
of the specified scale and the correct value. The call can
also be used to reduce the scale if the caller knows that the
BigDecimal has sufficiently many zeros at the end of
its fractional part (i.e., factors of ten in its integer value)
to allow for the rescaling without changing its value.
This method returns the same result as the two-argument
versions of setScale, but saves the caller the trouble
of specifying a rounding mode in cases where it is irrelevant.
Note that since BigDecimal objects are immutable,
calls of this method do not result in the original
object being modified, contrary to the usual convention of
having methods named setX mutate field
X. Instead, setScale returns an
object with the proper scale; the returned object may or may
not be newly allocated.
newScale - scale of the BigDecimal value to be returned.BigDecimal whose scale is the specified value, and
whose unscaled value is determined by multiplying or dividing
this BigDecimal's unscaled value by the appropriate
power of ten to maintain its overall value.ArithmeticException - if the specified scaling operation would
require rounding.setScale(int, int),
setScale(int, RoundingMode)public BigDecimal movePointLeft(int n)
BigDecimal which is equivalent to this one
with the decimal point moved n places to the left. If
n is non-negative, the call merely adds n to
the scale. If n is negative, the call is equivalent
to movePointRight(-n). The BigDecimal
returned by this call has value (this ×
10-n) and scale max(this.scale()+n,
0).n - number of places to move the decimal point to the left.BigDecimal which is equivalent to this one with the
decimal point moved n places to the left.ArithmeticException - if scale overflows.public BigDecimal movePointRight(int n)
BigDecimal which is equivalent to this one
with the decimal point moved n places to the right.
If n is non-negative, the call merely subtracts
n from the scale. If n is negative, the call
is equivalent to movePointLeft(-n). The
BigDecimal returned by this call has value (this
× 10n) and scale max(this.scale()-n,
0).n - number of places to move the decimal point to the right.BigDecimal which is equivalent to this one
with the decimal point moved n places to the right.ArithmeticException - if scale overflows.public BigDecimal scaleByPowerOfTen(int n)
this * 10n). The scale of
the result is (this.scale() - n).n - the exponent power of ten to scale bythis * 10n)ArithmeticException - if the scale would be
outside the range of a 32-bit integer.public BigDecimal stripTrailingZeros()
BigDecimal which is numerically equal to
this one but with any trailing zeros removed from the
representation. For example, stripping the trailing zeros from
the BigDecimal value 600.0, which has
[BigInteger, scale] components equals to
[6000, 1], yields 6E2 with [BigInteger,
scale] components equals to [6, -2]. If
this BigDecimal is numerically equal to zero, then
BigDecimal.ZERO is returned.BigDecimal with any
trailing zeros removed.public int compareTo(BigDecimal val)
BigDecimal with the specified
BigDecimal. Two BigDecimal objects that are
equal in value but have a different scale (like 2.0 and 2.00)
are considered equal by this method. This method is provided
in preference to individual methods for each of the six boolean
comparison operators (<, ==,
>, >=, !=, <=). The
suggested idiom for performing these comparisons is:
(x.compareTo(y) <op> 0), where
<op> is one of the six comparison operators.compareTo in interface Comparable<BigDecimal>val - BigDecimal to which this BigDecimal is
to be compared.BigDecimal is numerically
less than, equal to, or greater than val.public boolean equals(Object x)
BigDecimal with the specified
Object for equality. Unlike compareTo, this method considers two
BigDecimal objects equal only if they are equal in
value and scale (thus 2.0 is not equal to 2.00 when compared by
this method).equals in class Objectx - Object to which this BigDecimal is
to be compared.true if and only if the specified Object is a
BigDecimal whose value and scale are equal to this
BigDecimal's.compareTo(java.math.BigDecimal),
hashCode()public BigDecimal min(BigDecimal val)
BigDecimal and
val.val - value with which the minimum is to be computed.BigDecimal whose value is the lesser of this
BigDecimal and val. If they are equal,
as defined by the compareTo
method, this is returned.compareTo(java.math.BigDecimal)public BigDecimal max(BigDecimal val)
BigDecimal and val.val - value with which the maximum is to be computed.BigDecimal whose value is the greater of this
BigDecimal and val. If they are equal,
as defined by the compareTo
method, this is returned.compareTo(java.math.BigDecimal)public int hashCode()
BigDecimal. Note that
two BigDecimal objects that are numerically equal but
differ in scale (like 2.0 and 2.00) will generally not
have the same hash code.hashCode in class ObjectBigDecimal.equals(Object)public String toString()
BigDecimal,
using scientific notation if an exponent is needed.
A standard canonical string form of the BigDecimal
is created as though by the following steps: first, the
absolute value of the unscaled value of the BigDecimal
is converted to a string in base ten using the characters
'0' through '9' with no leading zeros (except
if its value is zero, in which case a single '0'
character is used).
Next, an adjusted exponent is calculated; this is the
negated scale, plus the number of characters in the converted
unscaled value, less one. That is,
-scale+(ulength-1), where ulength is the
length of the absolute value of the unscaled value in decimal
digits (its precision).
If the scale is greater than or equal to zero and the
adjusted exponent is greater than or equal to -6, the
number will be converted to a character form without using
exponential notation. In this case, if the scale is zero then
no decimal point is added and if the scale is positive a
decimal point will be inserted with the scale specifying the
number of characters to the right of the decimal point.
'0' characters are added to the left of the converted
unscaled value as necessary. If no character precedes the
decimal point after this insertion then a conventional
'0' character is prefixed.
Otherwise (that is, if the scale is negative, or the
adjusted exponent is less than -6), the number will be
converted to a character form using exponential notation. In
this case, if the converted BigInteger has more than
one digit a decimal point is inserted after the first digit.
An exponent in character form is then suffixed to the converted
unscaled value (perhaps with inserted decimal point); this
comprises the letter 'E' followed immediately by the
adjusted exponent converted to a character form. The latter is
in base ten, using the characters '0' through
'9' with no leading zeros, and is always prefixed by a
sign character '-' ('\u002D') if the
adjusted exponent is negative, '+'
('\u002B') otherwise).
Finally, the entire string is prefixed by a minus sign
character '-' ('\u002D') if the unscaled
value is less than zero. No sign character is prefixed if the
unscaled value is zero or positive.
Examples:
For each representation [unscaled value, scale] on the left, the resulting string is shown on the right.
[123,0] "123" [-123,0] "-123" [123,-1] "1.23E+3" [123,-3] "1.23E+5" [123,1] "12.3" [123,5] "0.00123" [123,10] "1.23E-8" [-123,12] "-1.23E-10"Notes:
BigDecimal values and the result of this conversion.
That is, every distinguishable BigDecimal value
(unscaled value and scale) has a unique string representation
as a result of using toString. If that string
representation is converted back to a BigDecimal using
the BigDecimal(String) constructor, then the original
value will be recovered.
NumberFormat class and its subclasses.
toEngineeringString() method may be used for
presenting numbers with exponents in engineering notation, and the
setScale method may be used for
rounding a BigDecimal so it has a known number of digits after
the decimal point.
Character.forDigit is used.
toString in class ObjectBigDecimal.Character.forDigit(int, int),
BigDecimal(java.lang.String)public String toEngineeringString()
BigDecimal,
using engineering notation if an exponent is needed.
Returns a string that represents the BigDecimal as
described in the toString() method, except that if
exponential notation is used, the power of ten is adjusted to
be a multiple of three (engineering notation) such that the
integer part of nonzero values will be in the range 1 through
999. If exponential notation is used for zero values, a
decimal point and one or two fractional zero digits are used so
that the scale of the zero value is preserved. Note that
unlike the output of toString(), the output of this
method is not guaranteed to recover the same [integer,
scale] pair of this BigDecimal if the output string is
converting back to a BigDecimal using the string constructor. The result of this method meets
the weaker constraint of always producing a numerically equal
result from applying the string constructor to the method's output.
BigDecimal, using
engineering notation if an exponent is needed.public String toPlainString()
BigDecimal
without an exponent field. For values with a positive scale,
the number of digits to the right of the decimal point is used
to indicate scale. For values with a zero or negative scale,
the resulting string is generated as if the value were
converted to a numerically equal value with zero scale and as
if all the trailing zeros of the zero scale value were present
in the result.
The entire string is prefixed by a minus sign character '-'
('\u002D') if the unscaled value is less than
zero. No sign character is prefixed if the unscaled value is
zero or positive.
Note that if the result of this method is passed to the
string constructor, only the
numerical value of this BigDecimal will necessarily be
recovered; the representation of the new BigDecimal
may have a different scale. In particular, if this
BigDecimal has a negative scale, the string resulting
from this method will have a scale of zero when processed by
the string constructor.
(This method behaves analogously to the toString
method in 1.4 and earlier releases.)BigDecimal
without an exponent field.toString(),
toEngineeringString()public BigInteger toBigInteger()
BigDecimal to a BigInteger.
This conversion is analogous to the
narrowing primitive conversion from double to
long as defined in section 5.1.3 of
The Java™ Language Specification:
any fractional part of this
BigDecimal will be discarded. Note that this
conversion can lose information about the precision of the
BigDecimal value.
To have an exception thrown if the conversion is inexact (in
other words if a nonzero fractional part is discarded), use the
toBigIntegerExact() method.
BigDecimal converted to a BigInteger.public BigInteger toBigIntegerExact()
BigDecimal to a BigInteger,
checking for lost information. An exception is thrown if this
BigDecimal has a nonzero fractional part.BigDecimal converted to a BigInteger.ArithmeticException - if this has a nonzero
fractional part.public long longValue()
BigDecimal to a long.
This conversion is analogous to the
narrowing primitive conversion from double to
short as defined in section 5.1.3 of
The Java™ Language Specification:
any fractional part of this
BigDecimal will be discarded, and if the resulting
"BigInteger" is too big to fit in a
long, only the low-order 64 bits are returned.
Note that this conversion can lose information about the
overall magnitude and precision of this BigDecimal value as well
as return a result with the opposite sign.public long longValueExact()
BigDecimal to a long, checking
for lost information. If this BigDecimal has a
nonzero fractional part or is out of the possible range for a
long result then an ArithmeticException is
thrown.BigDecimal converted to a long.ArithmeticException - if this has a nonzero
fractional part, or will not fit in a long.public int intValue()
BigDecimal to an int.
This conversion is analogous to the
narrowing primitive conversion from double to
short as defined in section 5.1.3 of
The Java™ Language Specification:
any fractional part of this
BigDecimal will be discarded, and if the resulting
"BigInteger" is too big to fit in an
int, only the low-order 32 bits are returned.
Note that this conversion can lose information about the
overall magnitude and precision of this BigDecimal
value as well as return a result with the opposite sign.public int intValueExact()
BigDecimal to an int, checking
for lost information. If this BigDecimal has a
nonzero fractional part or is out of the possible range for an
int result then an ArithmeticException is
thrown.BigDecimal converted to an int.ArithmeticException - if this has a nonzero
fractional part, or will not fit in an int.public short shortValueExact()
BigDecimal to a short, checking
for lost information. If this BigDecimal has a
nonzero fractional part or is out of the possible range for a
short result then an ArithmeticException is
thrown.BigDecimal converted to a short.ArithmeticException - if this has a nonzero
fractional part, or will not fit in a short.public byte byteValueExact()
BigDecimal to a byte, checking
for lost information. If this BigDecimal has a
nonzero fractional part or is out of the possible range for a
byte result then an ArithmeticException is
thrown.BigDecimal converted to a byte.ArithmeticException - if this has a nonzero
fractional part, or will not fit in a byte.public float floatValue()
BigDecimal to a float.
This conversion is similar to the
narrowing primitive conversion from double to
float as defined in section 5.1.3 of
The Java™ Language Specification:
if this BigDecimal has too great a
magnitude to represent as a float, it will be
converted to Float.NEGATIVE_INFINITY or Float.POSITIVE_INFINITY as appropriate. Note that even when
the return value is finite, this conversion can lose
information about the precision of the BigDecimal
value.floatValue in class NumberBigDecimal converted to a float.public double doubleValue()
BigDecimal to a double.
This conversion is similar to the
narrowing primitive conversion from double to
float as defined in section 5.1.3 of
The Java™ Language Specification:
if this BigDecimal has too great a
magnitude represent as a double, it will be
converted to Double.NEGATIVE_INFINITY or Double.POSITIVE_INFINITY as appropriate. Note that even when
the return value is finite, this conversion can lose
information about the precision of the BigDecimal
value.doubleValue in class NumberBigDecimal converted to a double.public BigDecimal ulp()
BigDecimal. An ulp of a nonzero BigDecimal
value is the positive distance between this value and the
BigDecimal value next larger in magnitude with the
same number of digits. An ulp of a zero value is numerically
equal to 1 with the scale of this. The result is
stored with the same scale as this so the result
for zero and nonzero values is equal to [1,
this.scale()].this Submit a bug or feature
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