Cleanup examples and doc links
Close example code fences and normalize containing head line in touched files.
Remove stale reference to `slice_assume_init` (commit 8c6ebf27
), fix long dead internal links in deprecation notices.
This commit is contained in:
parent
213a9fbd21
commit
ba7efb52b0
@ -125,7 +125,6 @@ impl Parse for Matrix {
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/// (`;`) designates that a new row begins.
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///
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/// # Examples
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///
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/// ```
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/// use nalgebra::matrix;
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///
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@ -170,6 +169,7 @@ pub fn matrix(stream: TokenStream) -> TokenStream {
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/// `SMatrix`, it produces instances of `DMatrix`. At the moment it is not usable
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/// in `const fn` contexts.
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///
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/// # Example
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/// ```
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/// use nalgebra::dmatrix;
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///
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@ -243,8 +243,7 @@ impl Parse for Vector {
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/// `vector!` is intended to be the most readable and performant way of constructing small,
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/// fixed-size vectors, and it is usable in `const fn` contexts.
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///
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/// ## Examples
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///
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/// # Example
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/// ```
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/// use nalgebra::vector;
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///
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@ -271,6 +270,7 @@ pub fn vector(stream: TokenStream) -> TokenStream {
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/// `SVector`, it produces instances of `DVector`. At the moment it is not usable
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/// in `const fn` contexts.
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///
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/// # Example
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/// ```
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/// use nalgebra::dvector;
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///
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@ -301,8 +301,7 @@ pub fn dvector(stream: TokenStream) -> TokenStream {
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/// `point!` is intended to be the most readable and performant way of constructing small,
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/// points, and it is usable in `const fn` contexts.
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///
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/// ## Examples
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///
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/// # Example
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/// ```
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/// use nalgebra::point;
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///
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@ -175,8 +175,7 @@ where
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/// Note that this is **not** the matrix multiplication as in, e.g., numpy. For matrix
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/// multiplication, use one of: `.gemm`, `.mul_to`, `.mul`, the `*` operator.
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///
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/// # Examples:
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///
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/// # Example
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/// ```
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/// # use nalgebra::{Vector3, Matrix2x3};
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/// let vec1 = Vector3::new(1.0, 2.0, 3.0);
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@ -207,8 +206,7 @@ where
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/// Note that this is **not** the matrix multiplication as in, e.g., numpy. For matrix
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/// multiplication, use one of: `.gemm`, `.mul_to`, `.mul`, the `*` operator.
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///
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/// # Examples:
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///
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/// # Example
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/// ```
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/// # use nalgebra::{Vector2, Complex};
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/// let vec1 = Vector2::new(Complex::new(1.0, 2.0), Complex::new(3.0, 4.0));
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@ -232,8 +230,7 @@ where
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/// The dot product between the transpose of `self` and `rhs`.
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///
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/// # Examples:
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///
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/// # Example
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/// ```
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/// # use nalgebra::{Vector3, RowVector3, Matrix2x3, Matrix3x2};
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/// let vec1 = Vector3::new(1.0, 2.0, 3.0);
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@ -285,8 +282,7 @@ where
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///
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/// If `b` is zero, `self` is never read from.
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///
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/// # Examples:
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///
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/// # Example
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/// ```
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/// # use nalgebra::Vector3;
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/// let mut vec1 = Vector3::new(1.0, 2.0, 3.0);
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@ -308,8 +304,7 @@ where
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///
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/// If `b` is zero, `self` is never read from.
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///
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/// # Examples:
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///
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/// # Example
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/// ```
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/// # use nalgebra::Vector3;
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/// let mut vec1 = Vector3::new(1.0, 2.0, 3.0);
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@ -333,8 +328,7 @@ where
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///
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/// If `beta` is zero, `self` is never read.
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///
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/// # Examples:
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///
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/// # Example
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/// ```
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/// # use nalgebra::{Matrix2, Vector2};
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/// let mut vec1 = Vector2::new(1.0, 2.0);
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@ -425,8 +419,7 @@ where
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/// If `beta` is zero, `self` is never read. If `self` is read, only its lower-triangular part
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/// (including the diagonal) is actually read.
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///
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/// # Examples:
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///
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/// # Examples
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/// ```
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/// # use nalgebra::{Matrix2, Vector2};
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/// let mat = Matrix2::new(1.0, 2.0,
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@ -468,8 +461,7 @@ where
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/// If `beta` is zero, `self` is never read. If `self` is read, only its lower-triangular part
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/// (including the diagonal) is actually read.
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///
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/// # Examples:
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///
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/// # Examples
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/// ```
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/// # use nalgebra::{Matrix2, Vector2, Complex};
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/// let mat = Matrix2::new(Complex::new(1.0, 0.0), Complex::new(2.0, -0.1),
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@ -552,8 +544,7 @@ where
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///
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/// If `beta` is zero, `self` is never read.
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///
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/// # Examples:
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///
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/// # Example
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/// ```
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/// # use nalgebra::{Matrix2, Vector2};
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/// let mat = Matrix2::new(1.0, 3.0,
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@ -587,8 +578,7 @@ where
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/// For real matrices, this is the same as `.gemv_tr`.
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/// If `beta` is zero, `self` is never read.
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///
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/// # Examples:
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///
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/// # Example
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/// ```
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/// # use nalgebra::{Matrix2, Vector2, Complex};
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/// let mat = Matrix2::new(Complex::new(1.0, 2.0), Complex::new(3.0, 4.0),
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@ -656,8 +646,7 @@ where
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///
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/// If `beta` is zero, `self` is never read.
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///
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/// # Examples:
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///
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/// # Example
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/// ```
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/// # use nalgebra::{Matrix2x3, Vector2, Vector3};
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/// let mut mat = Matrix2x3::repeat(4.0);
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@ -688,8 +677,7 @@ where
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///
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/// If `beta` is zero, `self` is never read.
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///
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/// # Examples:
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///
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/// # Example
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/// ```
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/// # #[macro_use] extern crate approx;
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/// # use nalgebra::{Matrix2x3, Vector2, Vector3, Complex};
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@ -722,8 +710,7 @@ where
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///
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/// If `beta` is zero, `self` is never read.
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///
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/// # Examples:
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///
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/// # Example
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/// ```
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/// # #[macro_use] extern crate approx;
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/// # use nalgebra::{Matrix2x3, Matrix3x4, Matrix2x4};
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@ -763,8 +750,7 @@ where
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///
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/// If `beta` is zero, `self` is never read.
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///
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/// # Examples:
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///
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/// # Example
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/// ```
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/// # #[macro_use] extern crate approx;
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/// # use nalgebra::{Matrix3x2, Matrix3x4, Matrix2x4};
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@ -821,8 +807,7 @@ where
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///
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/// If `beta` is zero, `self` is never read.
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///
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/// # Examples:
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///
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/// # Example
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/// ```
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/// # #[macro_use] extern crate approx;
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/// # use nalgebra::{Matrix3x2, Matrix3x4, Matrix2x4, Complex};
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@ -921,8 +906,7 @@ where
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/// If `beta` is zero, `self` is never read. The result is symmetric. Only the lower-triangular
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/// (including the diagonal) part of `self` is read/written.
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///
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/// # Examples:
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///
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/// # Example
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/// ```
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/// # use nalgebra::{Matrix2, Vector2};
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/// let mut mat = Matrix2::identity();
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@ -934,6 +918,7 @@ where
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/// mat.ger_symm(10.0, &vec1, &vec2, 5.0);
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/// assert_eq!(mat.lower_triangle(), expected.lower_triangle());
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/// assert_eq!(mat.m12, 99999.99999); // This was untouched.
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/// ```
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#[inline]
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#[deprecated(note = "This is renamed `syger` to match the original BLAS terminology.")]
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pub fn ger_symm<D2: Dim, D3: Dim, SB, SC>(
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@ -958,8 +943,7 @@ where
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/// If `beta` is zero, `self` is never read. The result is symmetric. Only the lower-triangular
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/// (including the diagonal) part of `self` is read/written.
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///
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/// # Examples:
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///
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/// # Example
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/// ```
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/// # use nalgebra::{Matrix2, Vector2};
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/// let mut mat = Matrix2::identity();
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@ -971,6 +955,7 @@ where
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/// mat.syger(10.0, &vec1, &vec2, 5.0);
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/// assert_eq!(mat.lower_triangle(), expected.lower_triangle());
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/// assert_eq!(mat.m12, 99999.99999); // This was untouched.
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/// ```
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#[inline]
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pub fn syger<D2: Dim, D3: Dim, SB, SC>(
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&mut self,
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@ -993,8 +978,7 @@ where
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/// If `beta` is zero, `self` is never read. The result is symmetric. Only the lower-triangular
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/// (including the diagonal) part of `self` is read/written.
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///
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/// # Examples:
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///
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/// # Example
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/// ```
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/// # use nalgebra::{Matrix2, Vector2, Complex};
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/// let mut mat = Matrix2::identity();
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@ -1006,6 +990,7 @@ where
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/// mat.hegerc(Complex::new(10.0, 20.0), &vec1, &vec2, Complex::new(5.0, 15.0));
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/// assert_eq!(mat.lower_triangle(), expected.lower_triangle());
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/// assert_eq!(mat.m12, Complex::new(99999.99999, 88888.88888)); // This was untouched.
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/// ```
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#[inline]
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pub fn hegerc<D2: Dim, D3: Dim, SB, SC>(
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&mut self,
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@ -1031,8 +1016,7 @@ where
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///
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/// This uses the provided workspace `work` to avoid allocations for intermediate results.
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///
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/// # Examples:
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///
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/// # Example
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/// ```
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/// # #[macro_use] extern crate approx;
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/// # use nalgebra::{DMatrix, DVector};
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@ -1053,6 +1037,7 @@ where
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///
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/// mat.quadform_tr_with_workspace(&mut workspace, 10.0, &lhs, &mid, 5.0);
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/// assert_relative_eq!(mat, expected);
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/// ```
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pub fn quadform_tr_with_workspace<D2, S2, R3, C3, S3, D4, S4>(
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&mut self,
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work: &mut Vector<T, D2, S2>,
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@ -1085,8 +1070,7 @@ where
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/// If `D1` is a type-level integer, then the allocation is performed on the stack.
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/// Use `.quadform_tr_with_workspace(...)` instead to avoid allocations.
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///
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/// # Examples:
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///
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/// # Example
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/// ```
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/// # #[macro_use] extern crate approx;
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/// # use nalgebra::{Matrix2, Matrix3, Matrix2x3, Vector2};
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@ -1100,6 +1084,7 @@ where
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///
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/// mat.quadform_tr(10.0, &lhs, &mid, 5.0);
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/// assert_relative_eq!(mat, expected);
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/// ```
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pub fn quadform_tr<R3, C3, S3, D4, S4>(
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&mut self,
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alpha: T,
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@ -1124,6 +1109,7 @@ where
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///
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/// This uses the provided workspace `work` to avoid allocations for intermediate results.
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///
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/// # Example
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/// ```
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/// # #[macro_use] extern crate approx;
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/// # use nalgebra::{DMatrix, DVector};
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@ -1145,6 +1131,7 @@ where
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///
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/// mat.quadform_with_workspace(&mut workspace, 10.0, &mid, &rhs, 5.0);
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/// assert_relative_eq!(mat, expected);
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/// ```
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pub fn quadform_with_workspace<D2, S2, D3, S3, R4, C4, S4>(
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&mut self,
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work: &mut Vector<T, D2, S2>,
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@ -1180,6 +1167,7 @@ where
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/// If `D2` is a type-level integer, then the allocation is performed on the stack.
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/// Use `.quadform_with_workspace(...)` instead to avoid allocations.
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///
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/// # Example
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/// ```
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/// # #[macro_use] extern crate approx;
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/// # use nalgebra::{Matrix2, Matrix3x2, Matrix3};
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@ -1194,6 +1182,7 @@ where
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///
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/// mat.quadform(10.0, &mid, &rhs, 5.0);
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/// assert_relative_eq!(mat, expected);
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/// ```
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pub fn quadform<D2, S2, R3, C3, S3>(
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&mut self,
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alpha: T,
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@ -411,8 +411,6 @@ where
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{
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/// Assumes a matrix's entries to be initialized. This operation should be near zero-cost.
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///
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/// For the similar method that operates on matrix slices, see [`slice_assume_init`].
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///
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/// # Safety
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/// The user must make sure that every single entry of the buffer has been initialized,
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/// or Undefined Behavior will immediately occur.
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@ -433,12 +431,12 @@ impl<T, R: Dim, C: Dim, S: RawStorage<T, R, C>> Matrix<T, R, C, S> {
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/// The shape of this matrix returned as the tuple (number of rows, number of columns).
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///
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/// # Examples:
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///
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/// # Example
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/// ```
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/// # use nalgebra::Matrix3x4;
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/// let mat = Matrix3x4::<f32>::zeros();
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/// assert_eq!(mat.shape(), (3, 4));
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/// ```
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#[inline]
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#[must_use]
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pub fn shape(&self) -> (usize, usize) {
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@ -455,12 +453,12 @@ impl<T, R: Dim, C: Dim, S: RawStorage<T, R, C>> Matrix<T, R, C, S> {
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/// The number of rows of this matrix.
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///
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/// # Examples:
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///
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/// # Example
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/// ```
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/// # use nalgebra::Matrix3x4;
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/// let mat = Matrix3x4::<f32>::zeros();
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/// assert_eq!(mat.nrows(), 3);
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/// ```
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#[inline]
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#[must_use]
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pub fn nrows(&self) -> usize {
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@ -469,12 +467,12 @@ impl<T, R: Dim, C: Dim, S: RawStorage<T, R, C>> Matrix<T, R, C, S> {
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/// The number of columns of this matrix.
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///
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/// # Examples:
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///
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/// # Example
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/// ```
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/// # use nalgebra::Matrix3x4;
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/// let mat = Matrix3x4::<f32>::zeros();
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/// assert_eq!(mat.ncols(), 4);
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/// ```
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#[inline]
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#[must_use]
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pub fn ncols(&self) -> usize {
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@ -483,14 +481,14 @@ impl<T, R: Dim, C: Dim, S: RawStorage<T, R, C>> Matrix<T, R, C, S> {
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/// The strides (row stride, column stride) of this matrix.
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///
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/// # Examples:
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///
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/// # Example
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/// ```
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/// # use nalgebra::DMatrix;
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/// let mat = DMatrix::<f32>::zeros(10, 10);
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/// let slice = mat.slice_with_steps((0, 0), (5, 3), (1, 2));
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/// // The column strides is the number of steps (here 2) multiplied by the corresponding dimension.
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/// assert_eq!(mat.strides(), (1, 10));
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/// ```
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#[inline]
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#[must_use]
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pub fn strides(&self) -> (usize, usize) {
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@ -1085,8 +1083,7 @@ impl<T, R: Dim, C: Dim, S: RawStorage<T, R, C>> Matrix<T, R, C, S> {
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impl<T, R: Dim, C: Dim, S: RawStorage<T, R, C>> Matrix<T, R, C, S> {
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/// Iterates through this matrix coordinates in column-major order.
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///
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/// # Examples:
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///
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/// # Example
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/// ```
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/// # use nalgebra::Matrix2x3;
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/// let mat = Matrix2x3::new(11, 12, 13,
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@ -1099,6 +1096,7 @@ impl<T, R: Dim, C: Dim, S: RawStorage<T, R, C>> Matrix<T, R, C, S> {
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/// assert_eq!(*it.next().unwrap(), 13);
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/// assert_eq!(*it.next().unwrap(), 23);
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/// assert!(it.next().is_none());
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/// ```
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#[inline]
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pub fn iter(&self) -> MatrixIter<'_, T, R, C, S> {
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MatrixIter::new(&self.data)
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@ -1121,6 +1119,7 @@ impl<T, R: Dim, C: Dim, S: RawStorage<T, R, C>> Matrix<T, R, C, S> {
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}
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/// Iterate through the columns of this matrix.
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///
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/// # Example
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/// ```
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/// # use nalgebra::Matrix2x3;
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|
@ -19,6 +19,7 @@ use simba::scalar::{ClosedNeg, RealField};
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/// `DualQuaternions` are stored as \[..real, ..dual\].
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/// Both of the quaternion components are laid out in `i, j, k, w` order.
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///
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/// # Example
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/// ```
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/// # use nalgebra::{DualQuaternion, Quaternion};
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///
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@ -620,6 +621,7 @@ where
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/// dq.rotation().euler_angles().0, std::f32::consts::FRAC_PI_2, epsilon = 1.0e-6
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/// );
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/// assert_relative_eq!(dq.translation().vector.y, 3.0, epsilon = 1.0e-6);
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/// ```
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#[inline]
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#[must_use]
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pub fn sclerp(&self, other: &Self, t: T) -> Self
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@ -710,6 +712,7 @@ where
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/// Return the rotation part of this unit dual quaternion.
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///
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/// # Example
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/// ```
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/// # #[macro_use] extern crate approx;
|
||||
/// # use nalgebra::{UnitDualQuaternion, UnitQuaternion, Vector3};
|
||||
@ -730,6 +733,7 @@ where
|
||||
|
||||
/// Return the translation part of this unit dual quaternion.
|
||||
///
|
||||
/// # Example
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use nalgebra::{UnitDualQuaternion, UnitQuaternion, Vector3};
|
||||
@ -755,6 +759,7 @@ where
|
||||
|
||||
/// Builds an isometry from this unit dual quaternion.
|
||||
///
|
||||
/// # Example
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use nalgebra::{UnitDualQuaternion, UnitQuaternion, Vector3};
|
||||
@ -780,6 +785,7 @@ where
|
||||
///
|
||||
/// This is the same as the multiplication `self * pt`.
|
||||
///
|
||||
/// # Example
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use nalgebra::{UnitDualQuaternion, UnitQuaternion, Vector3, Point3};
|
||||
@ -804,6 +810,7 @@ where
|
||||
///
|
||||
/// This is the same as the multiplication `self * v`.
|
||||
///
|
||||
/// # Example
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use nalgebra::{UnitDualQuaternion, UnitQuaternion, Vector3};
|
||||
@ -828,6 +835,7 @@ where
|
||||
/// This may be cheaper than inverting the unit dual quaternion and
|
||||
/// transforming the point.
|
||||
///
|
||||
/// # Example
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use nalgebra::{UnitDualQuaternion, UnitQuaternion, Vector3, Point3};
|
||||
@ -853,6 +861,7 @@ where
|
||||
/// This may be cheaper than inverting the unit dual quaternion and
|
||||
/// transforming the vector.
|
||||
///
|
||||
/// # Example
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use nalgebra::{UnitDualQuaternion, UnitQuaternion, Vector3};
|
||||
@ -877,6 +886,7 @@ where
|
||||
/// cheaper than inverting the unit dual quaternion and transforming the
|
||||
/// vector.
|
||||
///
|
||||
/// # Example
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use nalgebra::{UnitDualQuaternion, UnitQuaternion, Unit, Vector3};
|
||||
@ -906,6 +916,7 @@ where
|
||||
/// Converts this unit dual quaternion interpreted as an isometry
|
||||
/// into its equivalent homogeneous transformation matrix.
|
||||
///
|
||||
/// # Example
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use nalgebra::{Matrix4, UnitDualQuaternion, UnitQuaternion, Vector3};
|
||||
|
@ -27,7 +27,6 @@ impl<T: Scalar> DualQuaternion<T> {
|
||||
/// The dual quaternion multiplicative identity.
|
||||
///
|
||||
/// # Example
|
||||
///
|
||||
/// ```
|
||||
/// # use nalgebra::{DualQuaternion, Quaternion};
|
||||
///
|
||||
@ -134,6 +133,7 @@ impl<T: SimdRealField> UnitDualQuaternion<T> {
|
||||
/// The unit dual quaternion multiplicative identity, which also represents
|
||||
/// the identity transformation as an isometry.
|
||||
///
|
||||
/// # Example
|
||||
/// ```
|
||||
/// # use nalgebra::{UnitDualQuaternion, UnitQuaternion, Vector3, Point3};
|
||||
/// let ident = UnitDualQuaternion::identity();
|
||||
@ -171,6 +171,7 @@ where
|
||||
/// Return a dual quaternion representing the translation and orientation
|
||||
/// given by the provided rotation quaternion and translation vector.
|
||||
///
|
||||
/// # Example
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use nalgebra::{UnitDualQuaternion, UnitQuaternion, Vector3, Point3};
|
||||
@ -196,6 +197,7 @@ where
|
||||
/// Return a unit dual quaternion representing the translation and orientation
|
||||
/// given by the provided isometry.
|
||||
///
|
||||
/// # Example
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use nalgebra::{Isometry3, UnitDualQuaternion, UnitQuaternion, Vector3, Point3};
|
||||
|
@ -316,6 +316,7 @@ impl<T: RealField> Orthographic3<T> {
|
||||
|
||||
/// The left offset of the view cuboid.
|
||||
///
|
||||
/// # Example
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use nalgebra::Orthographic3;
|
||||
@ -333,6 +334,7 @@ impl<T: RealField> Orthographic3<T> {
|
||||
|
||||
/// The right offset of the view cuboid.
|
||||
///
|
||||
/// # Example
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use nalgebra::Orthographic3;
|
||||
@ -350,6 +352,7 @@ impl<T: RealField> Orthographic3<T> {
|
||||
|
||||
/// The bottom offset of the view cuboid.
|
||||
///
|
||||
/// # Example
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use nalgebra::Orthographic3;
|
||||
@ -367,6 +370,7 @@ impl<T: RealField> Orthographic3<T> {
|
||||
|
||||
/// The top offset of the view cuboid.
|
||||
///
|
||||
/// # Example
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use nalgebra::Orthographic3;
|
||||
@ -384,6 +388,7 @@ impl<T: RealField> Orthographic3<T> {
|
||||
|
||||
/// The near plane offset of the view cuboid.
|
||||
///
|
||||
/// # Example
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use nalgebra::Orthographic3;
|
||||
@ -401,6 +406,7 @@ impl<T: RealField> Orthographic3<T> {
|
||||
|
||||
/// The far plane offset of the view cuboid.
|
||||
///
|
||||
/// # Example
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use nalgebra::Orthographic3;
|
||||
@ -523,6 +529,7 @@ impl<T: RealField> Orthographic3<T> {
|
||||
|
||||
/// Sets the left offset of the view cuboid.
|
||||
///
|
||||
/// # Example
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use nalgebra::Orthographic3;
|
||||
@ -542,6 +549,7 @@ impl<T: RealField> Orthographic3<T> {
|
||||
|
||||
/// Sets the right offset of the view cuboid.
|
||||
///
|
||||
/// # Example
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use nalgebra::Orthographic3;
|
||||
@ -561,6 +569,7 @@ impl<T: RealField> Orthographic3<T> {
|
||||
|
||||
/// Sets the bottom offset of the view cuboid.
|
||||
///
|
||||
/// # Example
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use nalgebra::Orthographic3;
|
||||
@ -580,6 +589,7 @@ impl<T: RealField> Orthographic3<T> {
|
||||
|
||||
/// Sets the top offset of the view cuboid.
|
||||
///
|
||||
/// # Example
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use nalgebra::Orthographic3;
|
||||
@ -599,6 +609,7 @@ impl<T: RealField> Orthographic3<T> {
|
||||
|
||||
/// Sets the near plane offset of the view cuboid.
|
||||
///
|
||||
/// # Example
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use nalgebra::Orthographic3;
|
||||
@ -618,6 +629,7 @@ impl<T: RealField> Orthographic3<T> {
|
||||
|
||||
/// Sets the far plane offset of the view cuboid.
|
||||
///
|
||||
/// # Example
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use nalgebra::Orthographic3;
|
||||
@ -637,6 +649,7 @@ impl<T: RealField> Orthographic3<T> {
|
||||
|
||||
/// Sets the view cuboid offsets along the `x` axis.
|
||||
///
|
||||
/// # Example
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use nalgebra::Orthographic3;
|
||||
@ -662,6 +675,7 @@ impl<T: RealField> Orthographic3<T> {
|
||||
|
||||
/// Sets the view cuboid offsets along the `y` axis.
|
||||
///
|
||||
/// # Example
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use nalgebra::Orthographic3;
|
||||
@ -687,6 +701,7 @@ impl<T: RealField> Orthographic3<T> {
|
||||
|
||||
/// Sets the near and far plane offsets of the view cuboid.
|
||||
///
|
||||
/// # Example
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use nalgebra::Orthographic3;
|
||||
|
@ -266,6 +266,7 @@ where
|
||||
/// assert_eq!(it.next(), Some(2.0));
|
||||
/// assert_eq!(it.next(), Some(3.0));
|
||||
/// assert_eq!(it.next(), None);
|
||||
/// ```
|
||||
#[inline]
|
||||
pub fn iter(
|
||||
&self,
|
||||
@ -292,6 +293,7 @@ where
|
||||
/// }
|
||||
///
|
||||
/// assert_eq!(p, Point3::new(10.0, 20.0, 30.0));
|
||||
/// ```
|
||||
#[inline]
|
||||
pub fn iter_mut(
|
||||
&mut self,
|
||||
|
@ -402,6 +402,7 @@ where
|
||||
/// let expected = Quaternion::new(-20.0, 0.0, 0.0, 0.0);
|
||||
/// let result = a.inner(&b);
|
||||
/// assert_relative_eq!(expected, result, epsilon = 1.0e-5);
|
||||
/// ```
|
||||
#[inline]
|
||||
#[must_use]
|
||||
pub fn inner(&self, other: &Self) -> Self {
|
||||
@ -1227,8 +1228,7 @@ where
|
||||
/// Panics if the angle between both quaternion is 180 degrees (in which case the interpolation
|
||||
/// is not well-defined). Use `.try_slerp` instead to avoid the panic.
|
||||
///
|
||||
/// # Examples:
|
||||
///
|
||||
/// # Example
|
||||
/// ```
|
||||
/// # use nalgebra::geometry::UnitQuaternion;
|
||||
///
|
||||
@ -1450,7 +1450,6 @@ where
|
||||
/// Builds a rotation matrix from this unit quaternion.
|
||||
///
|
||||
/// # Example
|
||||
///
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use std::f32;
|
||||
@ -1533,7 +1532,6 @@ where
|
||||
/// Converts this unit quaternion into its equivalent homogeneous transformation matrix.
|
||||
///
|
||||
/// # Example
|
||||
///
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use std::f32;
|
||||
@ -1557,7 +1555,6 @@ where
|
||||
/// This is the same as the multiplication `self * pt`.
|
||||
///
|
||||
/// # Example
|
||||
///
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use std::f32;
|
||||
@ -1578,7 +1575,6 @@ where
|
||||
/// This is the same as the multiplication `self * v`.
|
||||
///
|
||||
/// # Example
|
||||
///
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use std::f32;
|
||||
@ -1599,7 +1595,6 @@ where
|
||||
/// point.
|
||||
///
|
||||
/// # Example
|
||||
///
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use std::f32;
|
||||
@ -1622,7 +1617,6 @@ where
|
||||
/// vector.
|
||||
///
|
||||
/// # Example
|
||||
///
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use std::f32;
|
||||
@ -1643,7 +1637,6 @@ where
|
||||
/// vector.
|
||||
///
|
||||
/// # Example
|
||||
///
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use std::f32;
|
||||
|
@ -38,7 +38,6 @@ where
|
||||
/// Creates a new identity similarity.
|
||||
///
|
||||
/// # Example
|
||||
///
|
||||
/// ```
|
||||
/// # use nalgebra::{Similarity2, Point2, Similarity3, Point3};
|
||||
///
|
||||
@ -95,7 +94,6 @@ where
|
||||
/// its axis passing through the point `p`.
|
||||
///
|
||||
/// # Example
|
||||
///
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use std::f32;
|
||||
@ -146,7 +144,6 @@ where
|
||||
/// Creates a new similarity from a translation, a rotation, and an uniform scaling factor.
|
||||
///
|
||||
/// # Example
|
||||
///
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use std::f32;
|
||||
@ -188,7 +185,6 @@ where
|
||||
/// Creates a new similarity from a translation and a rotation angle.
|
||||
///
|
||||
/// # Example
|
||||
///
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use std::f32;
|
||||
@ -232,7 +228,6 @@ macro_rules! similarity_construction_impl(
|
||||
/// factor.
|
||||
///
|
||||
/// # Example
|
||||
///
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use std::f32;
|
||||
@ -288,7 +283,6 @@ macro_rules! similarity_construction_impl(
|
||||
/// to `eye - at`. Non-collinearity is not checked.
|
||||
///
|
||||
/// # Example
|
||||
///
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use std::f32;
|
||||
@ -316,7 +310,7 @@ macro_rules! similarity_construction_impl(
|
||||
Self::from_isometry(Isometry::<_, $Rot<T>, 3>::face_towards(eye, target, up), scaling)
|
||||
}
|
||||
|
||||
/// Deprecated: Use [`SimilarityMatrix3::face_towards`] instead.
|
||||
/// Deprecated: Use [`SimilarityMatrix3::face_towards`](Self::face_towards) instead.
|
||||
#[deprecated(note="renamed to `face_towards`")]
|
||||
pub fn new_observer_frames(eye: &Point3<T>,
|
||||
target: &Point3<T>,
|
||||
@ -338,7 +332,6 @@ macro_rules! similarity_construction_impl(
|
||||
/// requirement of this parameter is to not be collinear to `target - eye`.
|
||||
///
|
||||
/// # Example
|
||||
///
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use std::f32;
|
||||
@ -376,7 +369,6 @@ macro_rules! similarity_construction_impl(
|
||||
/// requirement of this parameter is to not be collinear to `target - eye`.
|
||||
///
|
||||
/// # Example
|
||||
///
|
||||
/// ```
|
||||
/// # #[macro_use] extern crate approx;
|
||||
/// # use std::f32;
|
||||
|
@ -228,6 +228,7 @@ impl<T: Scalar + ClosedAdd, const D: usize> Translation<T, D> {
|
||||
/// let t = Translation3::new(1.0, 2.0, 3.0);
|
||||
/// let transformed_point = t.transform_point(&Point3::new(4.0, 5.0, 6.0));
|
||||
/// assert_eq!(transformed_point, Point3::new(5.0, 7.0, 9.0));
|
||||
/// ```
|
||||
#[inline]
|
||||
#[must_use]
|
||||
pub fn transform_point(&self, pt: &Point<T, D>) -> Point<T, D> {
|
||||
@ -244,6 +245,7 @@ impl<T: Scalar + ClosedSub, const D: usize> Translation<T, D> {
|
||||
/// let t = Translation3::new(1.0, 2.0, 3.0);
|
||||
/// let transformed_point = t.inverse_transform_point(&Point3::new(4.0, 5.0, 6.0));
|
||||
/// assert_eq!(transformed_point, Point3::new(3.0, 3.0, 3.0));
|
||||
/// ```
|
||||
#[inline]
|
||||
#[must_use]
|
||||
pub fn inverse_transform_point(&self, pt: &Point<T, D>) -> Point<T, D> {
|
||||
|
@ -246,8 +246,8 @@ pub fn min<T: Ord>(a: T, b: T) -> T {
|
||||
|
||||
/// The absolute value of `a`.
|
||||
///
|
||||
/// Deprecated: Use [`Matrix::abs`] or [`RealField::abs`] instead.
|
||||
#[deprecated(note = "use the inherent method `Matrix::abs` or `RealField::abs` instead")]
|
||||
/// Deprecated: Use [`Matrix::abs`] or [`ComplexField::abs`] instead.
|
||||
#[deprecated(note = "use the inherent method `Matrix::abs` or `ComplexField::abs` instead")]
|
||||
#[inline]
|
||||
pub fn abs<T: Signed>(a: &T) -> T {
|
||||
a.abs()
|
||||
|
Loading…
Reference in New Issue
Block a user