spire.math

ComplexIsNumeric

Related Doc: package math

class ComplexIsNumeric[A] extends ComplexEq[A] with ComplexIsField[A] with Numeric[Complex[A]] with ComplexIsTrig[A] with ComplexIsNRoot[A] with ConvertableFromComplex[A] with ConvertableToComplex[A] with Order[Complex[A]] with ComplexIsSigned[A] with Serializable

Annotations
@SerialVersionUID()
Linear Supertypes
ComplexIsSigned[A], ConvertableToComplex[A], ConvertableFromComplex[A], ComplexIsNRoot[A], ComplexIsTrig[A], Trig[Complex[A]], Numeric[Complex[A]], IsReal[Complex[A]], Signed[Complex[A]], Order[Complex[A]], PartialOrder[Complex[A]], ConvertableTo[Complex[A]], ConvertableFrom[Complex[A]], NRoot[Complex[A]], ComplexIsField[A], Field[Complex[A]], MultiplicativeAbGroup[Complex[A]], MultiplicativeGroup[Complex[A]], EuclideanRing[Complex[A]], CRing[Complex[A]], MultiplicativeCMonoid[Complex[A]], MultiplicativeCSemigroup[Complex[A]], ComplexIsRing[A], Ring[Complex[A]], Rng[Complex[A]], AdditiveAbGroup[Complex[A]], AdditiveCMonoid[Complex[A]], AdditiveCSemigroup[Complex[A]], AdditiveGroup[Complex[A]], Rig[Complex[A]], MultiplicativeMonoid[Complex[A]], Semiring[Complex[A]], MultiplicativeSemigroup[Complex[A]], AdditiveMonoid[Complex[A]], AdditiveSemigroup[Complex[A]], ComplexEq[A], Serializable, Serializable, Eq[Complex[A]], AnyRef, Any
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Inherited
  1. ComplexIsNumeric
  2. ComplexIsSigned
  3. ConvertableToComplex
  4. ConvertableFromComplex
  5. ComplexIsNRoot
  6. ComplexIsTrig
  7. Trig
  8. Numeric
  9. IsReal
  10. Signed
  11. Order
  12. PartialOrder
  13. ConvertableTo
  14. ConvertableFrom
  15. NRoot
  16. ComplexIsField
  17. Field
  18. MultiplicativeAbGroup
  19. MultiplicativeGroup
  20. EuclideanRing
  21. CRing
  22. MultiplicativeCMonoid
  23. MultiplicativeCSemigroup
  24. ComplexIsRing
  25. Ring
  26. Rng
  27. AdditiveAbGroup
  28. AdditiveCMonoid
  29. AdditiveCSemigroup
  30. AdditiveGroup
  31. Rig
  32. MultiplicativeMonoid
  33. Semiring
  34. MultiplicativeSemigroup
  35. AdditiveMonoid
  36. AdditiveSemigroup
  37. ComplexEq
  38. Serializable
  39. Serializable
  40. Eq
  41. AnyRef
  42. Any
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  1. Public
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Instance Constructors

  1. new ComplexIsNumeric()(implicit algebra: Fractional[A], trig: Trig[A], order: IsReal[A])

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
    AdditiveAbGroupAdditiveCMonoidAdditiveCSemigroupAdditiveGroupAdditiveMonoidAdditiveSemigroup

  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
    ComplexIsNumericIsReal

  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
    ComplexIsNumericOrder

  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
    ComplexIsNumericOrderPartialOrder → 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
    ComplexIsNumericIsReal

  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
    OrderPartialOrder

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

    Definition Classes
    OrderPartialOrder

  44. def hashCode(): Int

    Definition Classes
    AnyRef → Any

  45. final def isInstanceOf[T0]: Boolean

    Definition Classes
    Any

  46. def isOne(a: Complex[A])(implicit ev: Eq[Complex[A]]): Boolean

    Definition Classes
    MultiplicativeMonoid

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

    Definition Classes
    Signed

  48. def isSignNonNegative(a: Complex[A]): Boolean

    Definition Classes
    Signed

  49. def isSignNonPositive(a: Complex[A]): Boolean

    Definition Classes
    Signed

  50. def isSignNonZero(a: Complex[A]): Boolean

    Definition Classes
    Signed

  51. def isSignPositive(a: Complex[A]): Boolean

    Definition Classes
    Signed

  52. def isSignZero(a: Complex[A]): Boolean

    Definition Classes
    Signed

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

    Definition Classes
    ComplexIsNumericIsReal

  54. def isZero(a: Complex[A])(implicit ev: Eq[Complex[A]]): Boolean

    Tests if a is zero.

    Tests if a is zero.

    Definition Classes
    AdditiveMonoid

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

    Definition Classes
    EuclideanRing

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

    Definition Classes
    ComplexIsTrig → Trig

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

    Definition Classes
    ComplexIsTrig → Trig

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

    Definition Classes
    OrderPartialOrder

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

    Definition Classes
    OrderPartialOrder

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

    Definition Classes
    Order

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

    Definition Classes
    Order

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

    Definition Classes
    ComplexIsRing → AdditiveGroup

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

    Definition Classes
    ComplexIsField → EuclideanRing

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

    Definition Classes
    MultiplicativeAbGroupMultiplicativeCMonoidMultiplicativeCSemigroupMultiplicativeGroupMultiplicativeMonoidMultiplicativeSemigroup

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

    Definition Classes
    AnyRef

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

    Definition Classes
    ComplexIsRing → AdditiveGroup

  67. 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

  68. final def notify(): Unit

    Definition Classes
    AnyRef

  69. final def notifyAll(): Unit

    Definition Classes
    AnyRef

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

    Definition Classes
    ComplexIsNumeric → ComplexIsNRoot → NRoot

  71. def nroot: NRoot[A]

    Definition Classes
    ComplexIsNumeric → ComplexIsSigned → ComplexIsNRoot → ComplexIsTrig

  72. 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
    OrderPartialOrderEq

  73. def one: Complex[A]

    Definition Classes
    ComplexIsRing → MultiplicativeMonoid

  74. implicit val order: IsReal[A]

    Definition Classes
    ComplexIsNumeric → ComplexIsSigned → ComplexIsNRoot → ComplexIsTrig → ComplexIsRing

  75. 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
    OrderPartialOrder

  76. def pi: Complex[A]

    Definition Classes
    ComplexIsTrig → Trig

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

    Definition Classes
    ComplexIsRing → AdditiveSemigroup

  78. 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

  79. 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

  80. 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
    RigSemiring

  81. def prod(as: TraversableOnce[Complex[A]]): Complex[A]

    Given a sequence of as, sum them using the monoid and return the total.

    Given a sequence of as, sum them using the monoid and return the total.

    Definition Classes
    MultiplicativeMonoid

  82. def prodOption(as: TraversableOnce[Complex[A]]): Option[Complex[A]]

    Given a sequence of as, sum them using the semigroup and return the total.

    Given a sequence of as, sum them using the semigroup and return the total.

    If the sequence is empty, returns None. Otherwise, returns Some(total).

    Definition Classes
    MultiplicativeSemigroup

  83. def prodn(a: Complex[A], n: Int): Complex[A]

    Return a multiplicated with itself n times.

    Return a multiplicated with itself n times.

    Definition Classes
    MultiplicativeGroupMultiplicativeMonoidMultiplicativeSemigroup

  84. def prodnAboveOne(a: Complex[A], n: Int): Complex[A]

    Attributes
    protected
    Definition Classes
    MultiplicativeSemigroup

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

    Definition Classes
    ComplexIsField → EuclideanRing

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

    Definition Classes
    ComplexIsField → EuclideanRing

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

    Definition Classes
    MultiplicativeGroup

  88. 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
    OrderPartialOrder

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

    Definition Classes
    ComplexIsNumericIsReal

  90. 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

  91. 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

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

    Definition Classes
    ComplexIsTrig → Trig

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

    Definition Classes
    ComplexIsTrig → Trig

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

    Definition Classes
    ComplexIsNRoot → NRoot

  95. def sum(as: TraversableOnce[Complex[A]]): Complex[A]

    Given a sequence of as, sum them using the monoid and return the total.

    Given a sequence of as, sum them using the monoid and return the total.

    Definition Classes
    AdditiveMonoid

  96. def sumOption(as: TraversableOnce[Complex[A]]): Option[Complex[A]]

    Given a sequence of as, sum them using the semigroup and return the total.

    Given a sequence of as, sum them using the semigroup and return the total.

    If the sequence is empty, returns None. Otherwise, returns Some(total).

    Definition Classes
    AdditiveSemigroup

  97. def sumn(a: Complex[A], n: Int): Complex[A]

    Return a added with itself n times.

    Return a added with itself n times.

    Definition Classes
    AdditiveGroupAdditiveMonoidAdditiveSemigroup

  98. def sumnAboveOne(a: Complex[A], n: Int): Complex[A]

    Attributes
    protected
    Definition Classes
    AdditiveSemigroup

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

    Definition Classes
    AnyRef

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

    Definition Classes
    ComplexIsTrig → Trig

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

    Definition Classes
    ComplexIsTrig → Trig

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

    Definition Classes
    ComplexIsRing → MultiplicativeSemigroup

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

    Definition Classes
    ConvertableFromComplex → ConvertableFrom

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

    Definition Classes
    ConvertableFromComplex → ConvertableFrom

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

    Definition Classes
    ConvertableFromComplex → ConvertableFrom

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

    Definition Classes
    ConvertableFromComplex → ConvertableFrom

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

    Definition Classes
    ComplexIsTrig → Trig

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

    Definition Classes
    ConvertableFromComplex → ConvertableFrom

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

    Definition Classes
    ConvertableFromComplex → ConvertableFrom

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

    Definition Classes
    ConvertableFromComplex → ConvertableFrom

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

    Definition Classes
    ConvertableFromComplex → ConvertableFrom

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

    Definition Classes
    ConvertableFromComplex → ConvertableFrom

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

    Definition Classes
    ComplexIsTrig → Trig

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

    Definition Classes
    ConvertableFromComplex → ConvertableFrom

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

    Definition Classes
    ConvertableFromComplex → ConvertableFrom

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

    Definition Classes
    ConvertableFromComplex → ConvertableFrom

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

    Definition Classes
    ConvertableFromComplex → ConvertableFrom

  118. def toString(): String

    Definition Classes
    AnyRef → Any

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

    Definition Classes
    ConvertableFromComplex → ConvertableFrom

  120. implicit val trig: Trig[A]

    Definition Classes
    ComplexIsNumeric → ComplexIsNRoot → ComplexIsTrig

  121. 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

  122. final def wait(): Unit

    Definition Classes
    AnyRef
    Annotations
    @throws( ... )

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

    Definition Classes
    AnyRef
    Annotations
    @throws( ... )

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

    Definition Classes
    AnyRef
    Annotations
    @throws( ... )

  125. def zero: Complex[A]

    Definition Classes
    ComplexIsRing → AdditiveMonoid

Inherited from ComplexIsSigned[A]

Inherited from ConvertableToComplex[A]

Inherited from ConvertableFromComplex[A]

Inherited from ComplexIsNRoot[A]

Inherited from ComplexIsTrig[A]

Inherited from Trig[Complex[A]]

Inherited from Numeric[Complex[A]]

Inherited from IsReal[Complex[A]]

Inherited from Signed[Complex[A]]

Inherited from Order[Complex[A]]

Inherited from PartialOrder[Complex[A]]

Inherited from ConvertableTo[Complex[A]]

Inherited from ConvertableFrom[Complex[A]]

Inherited from NRoot[Complex[A]]

Inherited from ComplexIsField[A]

Inherited from Field[Complex[A]]

Inherited from MultiplicativeAbGroup[Complex[A]]

Inherited from MultiplicativeGroup[Complex[A]]

Inherited from EuclideanRing[Complex[A]]

Inherited from CRing[Complex[A]]

Inherited from MultiplicativeCMonoid[Complex[A]]

Inherited from MultiplicativeCSemigroup[Complex[A]]

Inherited from ComplexIsRing[A]

Inherited from Ring[Complex[A]]

Inherited from Rng[Complex[A]]

Inherited from AdditiveAbGroup[Complex[A]]

Inherited from AdditiveCMonoid[Complex[A]]

Inherited from AdditiveCSemigroup[Complex[A]]

Inherited from AdditiveGroup[Complex[A]]

Inherited from Rig[Complex[A]]

Inherited from MultiplicativeMonoid[Complex[A]]

Inherited from Semiring[Complex[A]]

Inherited from MultiplicativeSemigroup[Complex[A]]

Inherited from AdditiveMonoid[Complex[A]]

Inherited from AdditiveSemigroup[Complex[A]]

Inherited from ComplexEq[A]

Inherited from Serializable

Inherited from Serializable

Inherited from Eq[Complex[A]]

Inherited from AnyRef

Inherited from Any

Ungrouped