ComplexIsNumeric

Value Members

1. final def !=(arg0: Any): Boolean

   

   Definition Classes

   AnyRef → Any

2. final def ##(): Int

   

   Definition Classes

   AnyRef → Any

3. final def ==(arg0: Any): Boolean

   

   Definition Classes

   AnyRef → Any

4. def abs(a: Complex[A]): Complex[A]

   

   An idempotent function that ensures an object has a non-negative sign.

   An idempotent function that ensures an object has a non-negative sign.

   Definition Classes

   ComplexIsSigned → Signed

5. def acos(a: Complex[A]): Complex[A]

   

   Definition Classes

   ComplexIsTrig → Trig

6. def additive: AbGroup[Complex[A]]

   

   Definition Classes

   AdditiveAbGroup → AdditiveCMonoid → AdditiveCSemigroup → AdditiveGroup → AdditiveMonoid → AdditiveSemigroup

7. implicit val algebra: Fractional[A]

   

   Definition Classes

   ComplexIsNumeric → ComplexIsSigned → ConvertableToComplex → ConvertableFromComplex → ComplexIsNRoot → ComplexIsTrig → ComplexIsField → ComplexIsRing

8. final def asInstanceOf[T0]: T0

   

   Definition Classes

   Any

9. def asin(a: Complex[A]): Complex[A]

   

   Definition Classes

   ComplexIsTrig → Trig

10. def atan(a: Complex[A]): Complex[A]

    

    Definition Classes

    ComplexIsTrig → Trig

11. def atan2(y: Complex[A], x: Complex[A]): Complex[A]

    

    Definition Classes

    ComplexIsTrig → Trig

12. def ceil(a: Complex[A]): Complex[A]

    

    Definition Classes

    ComplexIsNumeric → IsReal

13. def clone(): AnyRef

    

    Attributes

    protected[java.lang]

    Definition Classes

    AnyRef

    Annotations

    @throws( ... )

14. def compare(x: Complex[A], y: Complex[A]): Int

    

    Definition Classes

    ComplexIsNumeric → Order

15. def cos(a: Complex[A]): Complex[A]

    

    Definition Classes

    ComplexIsTrig → Trig

16. def cosh(x: Complex[A]): Complex[A]

    

    Definition Classes

    ComplexIsTrig → Trig

17. def div(a: Complex[A], b: Complex[A]): Complex[A]

    

    Definition Classes

    ComplexIsField → MultiplicativeGroup

18. def e: Complex[A]

    

    Definition Classes

    ComplexIsTrig → Trig

19. final def eq(arg0: AnyRef): Boolean

    

    Definition Classes

    AnyRef

20. def equals(arg0: Any): Boolean

    

    Definition Classes

    AnyRef → Any

21. def eqv(x: Complex[A], y: Complex[A]): Boolean

    

    Returns true if x and y are equivalent, false otherwise.

    Returns true if x and y are equivalent, false otherwise.

    Definition Classes

    ComplexIsNumeric → Order → PartialOrder → ComplexEq → Eq

22. final def euclid(a: Complex[A], b: Complex[A])(implicit eq: Eq[Complex[A]]): Complex[A]

    

    Attributes

    protected[this]

    Definition Classes

    EuclideanRing

    Annotations

    @tailrec()

23. def exp(a: Complex[A]): Complex[A]

    

    Definition Classes

    ComplexIsTrig → Trig

24. def expm1(a: Complex[A]): Complex[A]

    

    Definition Classes

    ComplexIsTrig → Trig

25. def finalize(): Unit

    

    Attributes

    protected[java.lang]

    Definition Classes

    AnyRef

    Annotations

    @throws( classOf[java.lang.Throwable] )

26. def floor(a: Complex[A]): Complex[A]

    

    Definition Classes

    ComplexIsNumeric → IsReal

27. def fpow(a: Complex[A], b: Complex[A]): Complex[A]

    

    Definition Classes

    ComplexIsNRoot → NRoot

28. def fromAlgebraic(a: Algebraic): Complex[A]

    

    Definition Classes

    ConvertableToComplex → ConvertableTo

29. def fromBigDecimal(a: BigDecimal): Complex[A]

    

    Definition Classes

    ConvertableToComplex → ConvertableTo

30. def fromBigInt(a: BigInt): Complex[A]

    

    Definition Classes

    ConvertableToComplex → ConvertableTo

31. def fromByte(a: Byte): Complex[A]

    

    Definition Classes

    ConvertableToComplex → ConvertableTo

32. def fromDouble(n: Double): Complex[A]

    

    This is implemented in terms of basic Field ops.

    This is implemented in terms of basic Field ops. However, this is probably significantly less efficient than can be done with a specific type. So, it is recommended that this method is overriden.

    This is possible because a Double is a rational number.

    Definition Classes

    ComplexIsNumeric → ConvertableToComplex → ConvertableTo → ComplexIsField → Field

33. def fromFloat(a: Float): Complex[A]

    

    Definition Classes

    ConvertableToComplex → ConvertableTo

34. def fromInt(n: Int): Complex[A]

    

    Defined to be equivalent to additive.sumn(one, n).

    Defined to be equivalent to additive.sumn(one, n). That is, n repeated summations of this ring's one, or -one if n is negative.

    Definition Classes

    ComplexIsNumeric → ConvertableToComplex → ConvertableTo → ComplexIsRing → Ring

35. def fromLong(a: Long): Complex[A]

    

    Definition Classes

    ConvertableToComplex → ConvertableTo

36. def fromRational(a: Rational): Complex[A]

    

    Definition Classes

    ConvertableToComplex → ConvertableTo

37. def fromReal(a: Real): Complex[A]

    

    Definition Classes

    ConvertableToComplex → ConvertableTo

38. def fromShort(a: Short): Complex[A]

    

    Definition Classes

    ConvertableToComplex → ConvertableTo

39. def fromType[B](b: B)(implicit arg0: ConvertableFrom[B]): Complex[A]

    

    Definition Classes

    ConvertableToComplex → ConvertableTo

40. def gcd(a: Complex[A], b: Complex[A]): Complex[A]

    

    Definition Classes

    ComplexIsField → EuclideanRing

41. final def getClass(): Class[_]

    

    Definition Classes

    AnyRef → Any

42. def gt(x: Complex[A], y: Complex[A]): Boolean

    

    Definition Classes

    Order → PartialOrder

43. def gteqv(x: Complex[A], y: Complex[A]): Boolean

    

    Definition Classes

    Order → PartialOrder

44. def hashCode(): Int

    

    Definition Classes

    AnyRef → Any

45. final def isInstanceOf[T0]: Boolean

    

    Definition Classes

    Any

46. def isWhole(a: Complex[A]): Boolean

    

    Definition Classes

    ComplexIsNumeric → IsReal

47. def isZero(a: Complex[A]): Boolean

    

    Definition Classes

    Signed

48. def lcm(a: Complex[A], b: Complex[A]): Complex[A]

    

    Definition Classes

    EuclideanRing

49. def log(a: Complex[A]): Complex[A]

    

    Definition Classes

    ComplexIsTrig → Trig

50. def log1p(a: Complex[A]): Complex[A]

    

    Definition Classes

    ComplexIsTrig → Trig

51. def lt(x: Complex[A], y: Complex[A]): Boolean

    

    Definition Classes

    Order → PartialOrder

52. def lteqv(x: Complex[A], y: Complex[A]): Boolean

    

    Definition Classes

    Order → PartialOrder

53. def max(x: Complex[A], y: Complex[A]): Complex[A]

    

    Definition Classes

    Order

54. def min(x: Complex[A], y: Complex[A]): Complex[A]

    

    Definition Classes

    Order

55. def minus(a: Complex[A], b: Complex[A]): Complex[A]

    

    Definition Classes

    ComplexIsRing → AdditiveGroup

56. def mod(a: Complex[A], b: Complex[A]): Complex[A]

    

    Definition Classes

    ComplexIsField → EuclideanRing

57. def multiplicative: AbGroup[Complex[A]]

    

    Definition Classes

    MultiplicativeAbGroup → MultiplicativeCMonoid → MultiplicativeCSemigroup → MultiplicativeGroup → MultiplicativeMonoid → MultiplicativeSemigroup

58. final def ne(arg0: AnyRef): Boolean

    

    Definition Classes

    AnyRef

59. def negate(a: Complex[A]): Complex[A]

    

    Definition Classes

    ComplexIsRing → AdditiveGroup

60. def neqv(x: Complex[A], y: Complex[A]): Boolean

    

    Returns false if x and y are equivalent, true otherwise.

    Returns false if x and y are equivalent, true otherwise.

    Definition Classes

    ComplexEq → Eq

61. final def notify(): Unit

    

    Definition Classes

    AnyRef

62. final def notifyAll(): Unit

    

    Definition Classes

    AnyRef

63. def nroot(a: Complex[A], n: Int): Complex[A]

    

    Definition Classes

    ComplexIsNumeric → ComplexIsNRoot → NRoot

64. def nroot: NRoot[A]

    

    Definition Classes

    ComplexIsNumeric → ComplexIsSigned → ComplexIsNRoot → ComplexIsTrig

65. def on[B](f: (B) ⇒ Complex[A]): Order[B]

    

    Defines an order on B by mapping B to A using f and using As order to order B.

    Defines an order on B by mapping B to A using f and using As order to order B.

    Definition Classes

    Order → PartialOrder → Eq

66. def one: Complex[A]

    

    Definition Classes

    ComplexIsRing → MultiplicativeMonoid

67. implicit val order: IsReal[A]

    

    Definition Classes

    ComplexIsNumeric → ComplexIsSigned → ComplexIsNRoot → ComplexIsTrig → ComplexIsRing

68. def partialCompare(x: Complex[A], y: Complex[A]): Double

    

    Result of comparing x with y.

    Result of comparing x with y. Returns NaN if operands are not comparable. If operands are comparable, returns a Double whose sign is: - negative iff x < y - zero iff x === y - positive iff x > y

    Definition Classes

    Order → PartialOrder

69. def pi: Complex[A]

    

    Definition Classes

    ComplexIsTrig → Trig

70. def plus(a: Complex[A], b: Complex[A]): Complex[A]

    

    Definition Classes

    ComplexIsRing → AdditiveSemigroup

71. def pmax(x: Complex[A], y: Complex[A]): Option[Complex[A]]

    

    Returns Some(x) if x >= y, Some(y) if x < y, otherwise None.

    Returns Some(x) if x >= y, Some(y) if x < y, otherwise None.

    Definition Classes

    PartialOrder

72. def pmin(x: Complex[A], y: Complex[A]): Option[Complex[A]]

    

    Returns Some(x) if x <= y, Some(y) if x > y, otherwise None.

    Returns Some(x) if x <= y, Some(y) if x > y, otherwise None.

    Definition Classes

    PartialOrder

73. def pow(a: Complex[A], n: Int): Complex[A]

    

    This is similar to Semigroup#pow, except that a pow 0 is defined to be the multiplicative identity.

    This is similar to Semigroup#pow, except that a pow 0 is defined to be the multiplicative identity.

    Definition Classes

    Rig → Semiring

74. def quot(a: Complex[A], b: Complex[A]): Complex[A]

    

    Definition Classes

    ComplexIsField → EuclideanRing

75. def quotmod(a: Complex[A], b: Complex[A]): (Complex[A], Complex[A])

    

    Definition Classes

    ComplexIsField → EuclideanRing

76. def reciprocal(x: Complex[A]): Complex[A]

    

    Definition Classes

    MultiplicativeGroup

77. def reverse: Order[Complex[A]]

    

    Defines an ordering on A where all arrows switch direction.

    Defines an ordering on A where all arrows switch direction.

    Definition Classes

    Order → PartialOrder

78. def round(a: Complex[A]): Complex[A]

    

    Definition Classes

    ComplexIsNumeric → IsReal

79. def sign(a: Complex[A]): Sign

    

    Returns Zero if a is 0, Positive if a is positive, and Negative is a is negative.

    Returns Zero if a is 0, Positive if a is positive, and Negative is a is negative.

    Definition Classes

    Signed

80. def signum(a: Complex[A]): Int

    

    Returns 0 if a is 0, > 0 if a is positive, and < 0 is a is negative.

    Returns 0 if a is 0, > 0 if a is positive, and < 0 is a is negative.

    Definition Classes

    ComplexIsSigned → Signed

81. def sin(a: Complex[A]): Complex[A]

    

    Definition Classes

    ComplexIsTrig → Trig

82. def sinh(x: Complex[A]): Complex[A]

    

    Definition Classes

    ComplexIsTrig → Trig

83. def sqrt(a: Complex[A]): Complex[A]

    

    Definition Classes

    ComplexIsNRoot → NRoot

84. final def synchronized[T0](arg0: ⇒ T0): T0

    

    Definition Classes

    AnyRef

85. def tan(a: Complex[A]): Complex[A]

    

    Definition Classes

    ComplexIsTrig → Trig

86. def tanh(x: Complex[A]): Complex[A]

    

    Definition Classes

    ComplexIsTrig → Trig

87. def times(a: Complex[A], b: Complex[A]): Complex[A]

    

    Definition Classes

    ComplexIsRing → MultiplicativeSemigroup

88. def toAlgebraic(a: Complex[A]): Algebraic

    

    Definition Classes

    ConvertableFromComplex → ConvertableFrom

89. def toBigDecimal(a: Complex[A]): BigDecimal

    

    Definition Classes

    ConvertableFromComplex → ConvertableFrom

90. def toBigInt(a: Complex[A]): BigInt

    

    Definition Classes

    ConvertableFromComplex → ConvertableFrom

91. def toByte(a: Complex[A]): Byte

    

    Definition Classes

    ConvertableFromComplex → ConvertableFrom

92. def toDegrees(a: Complex[A]): Complex[A]

    

    Definition Classes

    ComplexIsTrig → Trig

93. def toDouble(a: Complex[A]): Double

    

    Definition Classes

    ConvertableFromComplex → ConvertableFrom

94. def toFloat(a: Complex[A]): Float

    

    Definition Classes

    ConvertableFromComplex → ConvertableFrom

95. def toInt(a: Complex[A]): Int

    

    Definition Classes

    ConvertableFromComplex → ConvertableFrom

96. def toLong(a: Complex[A]): Long

    

    Definition Classes

    ConvertableFromComplex → ConvertableFrom

97. def toNumber(a: Complex[A]): Number

    

    Definition Classes

    ConvertableFromComplex → ConvertableFrom

98. def toRadians(a: Complex[A]): Complex[A]

    

    Definition Classes

    ComplexIsTrig → Trig

99. def toRational(a: Complex[A]): Rational

    

    Definition Classes

    ConvertableFromComplex → ConvertableFrom

100. def toReal(a: Complex[A]): Real

     

     Definition Classes

     ConvertableFromComplex → ConvertableFrom

101. def toShort(a: Complex[A]): Short

     

     Definition Classes

     ConvertableFromComplex → ConvertableFrom

102. def toString(a: Complex[A]): String

     

     Definition Classes

     ConvertableFromComplex → ConvertableFrom

103. def toString(): String

     

     Definition Classes

     AnyRef → Any

104. def toType[B](a: Complex[A])(implicit arg0: ConvertableTo[B]): B

     

     Definition Classes

     ConvertableFromComplex → ConvertableFrom

105. implicit val trig: Trig[A]

     

     Definition Classes

     ComplexIsNumeric → ComplexIsNRoot → ComplexIsTrig

106. def tryCompare(x: Complex[A], y: Complex[A]): Option[Int]

     

     Result of comparing x with y.

     Result of comparing x with y. Returns None if operands are not comparable. If operands are comparable, returns Some[Int] where the Int sign is: - negative iff x < y - zero iff x == y - positive iff x > y

     Definition Classes

     PartialOrder

107. def tryGt(x: Complex[A], y: Complex[A]): Option[Boolean]

     

     Definition Classes

     PartialOrder

108. def tryGteqv(x: Complex[A], y: Complex[A]): Option[Boolean]

     

     Definition Classes

     PartialOrder

109. def tryLt(x: Complex[A], y: Complex[A]): Option[Boolean]

     

     Definition Classes

     PartialOrder

110. def tryLteqv(x: Complex[A], y: Complex[A]): Option[Boolean]

     

     Definition Classes

     PartialOrder

111. final def wait(): Unit

     

     Definition Classes

     AnyRef

     Annotations

     @throws( ... )

112. final def wait(arg0: Long, arg1: Int): Unit

     

     Definition Classes

     AnyRef

     Annotations

     @throws( ... )

113. final def wait(arg0: Long): Unit

     

     Definition Classes

     AnyRef

     Annotations

     @throws( ... )

114. def zero: Complex[A]

     

     Definition Classes

     ComplexIsRing → AdditiveMonoid