[−][src]Trait ndarray_linalg::types::Scalar
Associated Types
type Real: Scalar + Float + NumOps<Self::Real, Self::Real>
type Complex: Scalar + NumOps<Self::Real, Self::Complex> + NumOps<Self::Complex, Self::Complex>
Required methods
fn real<T>(re: T) -> Self::Real where
T: ToPrimitive,
T: ToPrimitive,
Create a new real number
fn complex<T>(re: T, im: T) -> Self::Complex where
T: ToPrimitive,
T: ToPrimitive,
Create a new complex number
fn from_real(re: Self::Real) -> Self
fn add_real(self, re: Self::Real) -> Self
fn sub_real(self, re: Self::Real) -> Self
fn mul_real(self, re: Self::Real) -> Self
fn div_real(self, re: Self::Real) -> Self
fn add_complex(self, im: Self::Complex) -> Self::Complex
fn sub_complex(self, im: Self::Complex) -> Self::Complex
fn mul_complex(self, im: Self::Complex) -> Self::Complex
fn div_complex(self, im: Self::Complex) -> Self::Complex
fn pow(&self, n: Self) -> Self
fn powi(&self, n: i32) -> Self
fn powf(&self, n: Self::Real) -> Self
fn powc(&self, n: Self::Complex) -> Self::Complex
fn re(&self) -> Self::Real
Real part
fn im(&self) -> Self::Real
Imaginary part
fn as_c(&self) -> Self::Complex
As a complex number
fn conj(&self) -> Self
Complex conjugate
fn abs(&self) -> Self::Real
Absolute value
fn square(&self) -> Self::Real
Sqaure of absolute value
fn sqrt(&self) -> Self
fn exp(&self) -> Self
fn ln(&self) -> Self
fn sin(&self) -> Self
fn cos(&self) -> Self
fn tan(&self) -> Self
fn asin(&self) -> Self
fn acos(&self) -> Self
fn atan(&self) -> Self
fn sinh(&self) -> Self
fn cosh(&self) -> Self
fn tanh(&self) -> Self
fn asinh(&self) -> Self
fn acosh(&self) -> Self
fn atanh(&self) -> Self
fn rand(rng: &mut impl Rng) -> Self
Implementations on Foreign Types
impl Scalar for f64
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type Real = f64
type Complex = Complex<f64>
fn re(&self) -> <f64 as Scalar>::Real
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fn im(&self) -> <f64 as Scalar>::Real
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fn from_real(re: <f64 as Scalar>::Real) -> f64
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fn pow(&self, n: f64) -> f64
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fn powi(&self, n: i32) -> f64
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fn powf(&self, n: <f64 as Scalar>::Real) -> f64
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fn powc(&self, n: <f64 as Scalar>::Complex) -> <f64 as Scalar>::Complex
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fn real<T>(re: T) -> <f64 as Scalar>::Real where
T: ToPrimitive,
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T: ToPrimitive,
fn complex<T>(re: T, im: T) -> <f64 as Scalar>::Complex where
T: ToPrimitive,
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T: ToPrimitive,
fn as_c(&self) -> <f64 as Scalar>::Complex
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fn conj(&self) -> f64
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fn square(&self) -> <f64 as Scalar>::Real
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fn rand(rng: &mut impl Rng) -> f64
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fn add_real(self, re: <f64 as Scalar>::Real) -> f64
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fn sub_real(self, re: <f64 as Scalar>::Real) -> f64
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fn mul_real(self, re: <f64 as Scalar>::Real) -> f64
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fn div_real(self, re: <f64 as Scalar>::Real) -> f64
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fn add_complex(self, im: <f64 as Scalar>::Complex) -> <f64 as Scalar>::Complex
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fn sub_complex(self, im: <f64 as Scalar>::Complex) -> <f64 as Scalar>::Complex
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fn mul_complex(self, im: <f64 as Scalar>::Complex) -> <f64 as Scalar>::Complex
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fn div_complex(self, im: <f64 as Scalar>::Complex) -> <f64 as Scalar>::Complex
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fn sqrt(&self) -> f64
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fn abs(&self) -> f64
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fn exp(&self) -> f64
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fn ln(&self) -> f64
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fn sin(&self) -> f64
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fn cos(&self) -> f64
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fn tan(&self) -> f64
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fn sinh(&self) -> f64
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fn cosh(&self) -> f64
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fn tanh(&self) -> f64
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fn asin(&self) -> f64
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fn acos(&self) -> f64
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fn atan(&self) -> f64
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fn asinh(&self) -> f64
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fn acosh(&self) -> f64
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fn atanh(&self) -> f64
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impl Scalar for f32
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type Real = f32
type Complex = Complex<f32>
fn re(&self) -> <f32 as Scalar>::Real
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fn im(&self) -> <f32 as Scalar>::Real
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fn from_real(re: <f32 as Scalar>::Real) -> f32
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fn pow(&self, n: f32) -> f32
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fn powi(&self, n: i32) -> f32
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fn powf(&self, n: <f32 as Scalar>::Real) -> f32
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fn powc(&self, n: <f32 as Scalar>::Complex) -> <f32 as Scalar>::Complex
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fn real<T>(re: T) -> <f32 as Scalar>::Real where
T: ToPrimitive,
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T: ToPrimitive,
fn complex<T>(re: T, im: T) -> <f32 as Scalar>::Complex where
T: ToPrimitive,
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T: ToPrimitive,
fn as_c(&self) -> <f32 as Scalar>::Complex
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fn conj(&self) -> f32
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fn square(&self) -> <f32 as Scalar>::Real
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fn rand(rng: &mut impl Rng) -> f32
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fn add_real(self, re: <f32 as Scalar>::Real) -> f32
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fn sub_real(self, re: <f32 as Scalar>::Real) -> f32
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fn mul_real(self, re: <f32 as Scalar>::Real) -> f32
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fn div_real(self, re: <f32 as Scalar>::Real) -> f32
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fn add_complex(self, im: <f32 as Scalar>::Complex) -> <f32 as Scalar>::Complex
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fn sub_complex(self, im: <f32 as Scalar>::Complex) -> <f32 as Scalar>::Complex
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fn mul_complex(self, im: <f32 as Scalar>::Complex) -> <f32 as Scalar>::Complex
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fn div_complex(self, im: <f32 as Scalar>::Complex) -> <f32 as Scalar>::Complex
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fn sqrt(&self) -> f32
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fn abs(&self) -> f32
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fn exp(&self) -> f32
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fn ln(&self) -> f32
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fn sin(&self) -> f32
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fn cos(&self) -> f32
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fn tan(&self) -> f32
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fn sinh(&self) -> f32
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fn cosh(&self) -> f32
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fn tanh(&self) -> f32
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fn asin(&self) -> f32
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fn acos(&self) -> f32
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fn atan(&self) -> f32
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fn asinh(&self) -> f32
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fn acosh(&self) -> f32
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fn atanh(&self) -> f32
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impl Scalar for Complex<f32>
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type Real = f32
type Complex = Complex<f32>
fn re(&self) -> <Complex<f32> as Scalar>::Real
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fn im(&self) -> <Complex<f32> as Scalar>::Real
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fn from_real(re: <Complex<f32> as Scalar>::Real) -> Complex<f32>
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fn pow(&self, n: Complex<f32>) -> Complex<f32>
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fn powi(&self, n: i32) -> Complex<f32>
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fn powf(&self, n: <Complex<f32> as Scalar>::Real) -> Complex<f32>
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fn powc(
&self,
n: <Complex<f32> as Scalar>::Complex
) -> <Complex<f32> as Scalar>::Complex
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&self,
n: <Complex<f32> as Scalar>::Complex
) -> <Complex<f32> as Scalar>::Complex
fn real<T>(re: T) -> <Complex<f32> as Scalar>::Real where
T: ToPrimitive,
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T: ToPrimitive,
fn complex<T>(re: T, im: T) -> <Complex<f32> as Scalar>::Complex where
T: ToPrimitive,
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T: ToPrimitive,
fn as_c(&self) -> <Complex<f32> as Scalar>::Complex
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fn conj(&self) -> Complex<f32>
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fn square(&self) -> <Complex<f32> as Scalar>::Real
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fn abs(&self) -> <Complex<f32> as Scalar>::Real
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fn rand(rng: &mut impl Rng) -> Complex<f32>
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fn add_real(self, re: <Complex<f32> as Scalar>::Real) -> Complex<f32>
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fn sub_real(self, re: <Complex<f32> as Scalar>::Real) -> Complex<f32>
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fn mul_real(self, re: <Complex<f32> as Scalar>::Real) -> Complex<f32>
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fn div_real(self, re: <Complex<f32> as Scalar>::Real) -> Complex<f32>
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fn add_complex(
self,
im: <Complex<f32> as Scalar>::Complex
) -> <Complex<f32> as Scalar>::Complex
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self,
im: <Complex<f32> as Scalar>::Complex
) -> <Complex<f32> as Scalar>::Complex
fn sub_complex(
self,
im: <Complex<f32> as Scalar>::Complex
) -> <Complex<f32> as Scalar>::Complex
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self,
im: <Complex<f32> as Scalar>::Complex
) -> <Complex<f32> as Scalar>::Complex
fn mul_complex(
self,
im: <Complex<f32> as Scalar>::Complex
) -> <Complex<f32> as Scalar>::Complex
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self,
im: <Complex<f32> as Scalar>::Complex
) -> <Complex<f32> as Scalar>::Complex
fn div_complex(
self,
im: <Complex<f32> as Scalar>::Complex
) -> <Complex<f32> as Scalar>::Complex
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self,
im: <Complex<f32> as Scalar>::Complex
) -> <Complex<f32> as Scalar>::Complex
fn sqrt(&self) -> Complex<f32>
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fn exp(&self) -> Complex<f32>
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fn ln(&self) -> Complex<f32>
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fn sin(&self) -> Complex<f32>
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fn cos(&self) -> Complex<f32>
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fn tan(&self) -> Complex<f32>
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fn sinh(&self) -> Complex<f32>
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fn cosh(&self) -> Complex<f32>
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fn tanh(&self) -> Complex<f32>
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fn asin(&self) -> Complex<f32>
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fn acos(&self) -> Complex<f32>
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fn atan(&self) -> Complex<f32>
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fn asinh(&self) -> Complex<f32>
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fn acosh(&self) -> Complex<f32>
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fn atanh(&self) -> Complex<f32>
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impl Scalar for Complex<f64>
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type Real = f64
type Complex = Complex<f64>
fn re(&self) -> <Complex<f64> as Scalar>::Real
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fn im(&self) -> <Complex<f64> as Scalar>::Real
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fn from_real(re: <Complex<f64> as Scalar>::Real) -> Complex<f64>
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fn pow(&self, n: Complex<f64>) -> Complex<f64>
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fn powi(&self, n: i32) -> Complex<f64>
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fn powf(&self, n: <Complex<f64> as Scalar>::Real) -> Complex<f64>
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fn powc(
&self,
n: <Complex<f64> as Scalar>::Complex
) -> <Complex<f64> as Scalar>::Complex
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&self,
n: <Complex<f64> as Scalar>::Complex
) -> <Complex<f64> as Scalar>::Complex
fn real<T>(re: T) -> <Complex<f64> as Scalar>::Real where
T: ToPrimitive,
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T: ToPrimitive,
fn complex<T>(re: T, im: T) -> <Complex<f64> as Scalar>::Complex where
T: ToPrimitive,
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T: ToPrimitive,
fn as_c(&self) -> <Complex<f64> as Scalar>::Complex
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fn conj(&self) -> Complex<f64>
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fn square(&self) -> <Complex<f64> as Scalar>::Real
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fn abs(&self) -> <Complex<f64> as Scalar>::Real
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fn rand(rng: &mut impl Rng) -> Complex<f64>
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fn add_real(self, re: <Complex<f64> as Scalar>::Real) -> Complex<f64>
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fn sub_real(self, re: <Complex<f64> as Scalar>::Real) -> Complex<f64>
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fn mul_real(self, re: <Complex<f64> as Scalar>::Real) -> Complex<f64>
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fn div_real(self, re: <Complex<f64> as Scalar>::Real) -> Complex<f64>
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fn add_complex(
self,
im: <Complex<f64> as Scalar>::Complex
) -> <Complex<f64> as Scalar>::Complex
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self,
im: <Complex<f64> as Scalar>::Complex
) -> <Complex<f64> as Scalar>::Complex
fn sub_complex(
self,
im: <Complex<f64> as Scalar>::Complex
) -> <Complex<f64> as Scalar>::Complex
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self,
im: <Complex<f64> as Scalar>::Complex
) -> <Complex<f64> as Scalar>::Complex
fn mul_complex(
self,
im: <Complex<f64> as Scalar>::Complex
) -> <Complex<f64> as Scalar>::Complex
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self,
im: <Complex<f64> as Scalar>::Complex
) -> <Complex<f64> as Scalar>::Complex
fn div_complex(
self,
im: <Complex<f64> as Scalar>::Complex
) -> <Complex<f64> as Scalar>::Complex
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self,
im: <Complex<f64> as Scalar>::Complex
) -> <Complex<f64> as Scalar>::Complex