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fix: Some grammar and newlines
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450b00469c
commit
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2 changed files with 12 additions and 7 deletions
14
src/lib.rs
14
src/lib.rs
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@ -54,17 +54,17 @@ impl<T: Mul + Add + Sub> Matrix<T> {
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}
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}
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/// Return the height of a matrix.
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/// Returns the height of a matrix.
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pub fn height(&self) -> usize {
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self.entries.len()
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}
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/// Return the width of a matrix.
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/// Returns the width of a matrix.
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pub fn width(&self) -> usize {
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self.entries[0].len()
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}
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/// Return the transpose of a matrix.
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/// Returns the transpose of a matrix.
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pub fn transpose(&self) -> Self
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where
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T: Copy,
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@ -80,7 +80,7 @@ impl<T: Mul + Add + Sub> Matrix<T> {
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Matrix { entries: out }
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}
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/// Return a reference to the rows of a matrix as `&Vec<Vec<T>>`.
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/// Returns a reference to the rows of a matrix as `&Vec<Vec<T>>`.
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pub fn rows(&self) -> &Vec<Vec<T>> {
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&self.entries
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}
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@ -98,7 +98,7 @@ impl<T: Mul + Add + Sub> Matrix<T> {
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self.height() == self.width()
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}
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/// Return a matrix after removing the provided row and column from it.
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/// Returns a matrix after removing the provided row and column from it.
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/// Note: Row and column numbers are 0-indexed.
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/// # Example
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/// ```
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@ -127,7 +127,7 @@ impl<T: Mul + Add + Sub> Matrix<T> {
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Matrix { entries: out }
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}
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/// Return the determinant of a square matrix. This method additionally requires [`Zero`],
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/// Returns the determinant of a square matrix. This method additionally requires [`Zero`],
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/// [`One`] and [`Copy`] traits. Also, we need that the [`Mul`] and [`Add`] operations
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/// return the same type `T`. This uses basic recursive algorithm using cofactor-minor.
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/// See [`det_in_field`](Self::det_in_field()) for faster determinant calculation in fields.
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@ -169,7 +169,7 @@ impl<T: Mul + Add + Sub> Matrix<T> {
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}
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}
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/// Return the determinant of a square matrix over a field i.e. needs [`One`] and [`Div`] traits.
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/// Returns the determinant of a square matrix over a field i.e. needs [`One`] and [`Div`] traits.
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/// See [`det`](Self::det()) for determinants in rings.
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/// This method uses row reduction as is much faster.
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/// It'll throw an error if the provided matrix isn't square.
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@ -5,6 +5,7 @@ fn mul_test() {
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let a = Matrix::from(vec![vec![1, 2, 4], vec![3, 4, 9]]).unwrap();
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let b = Matrix::from(vec![vec![1, 2], vec![2, 3], vec![5, 1]]).unwrap();
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let c = Matrix::from(vec![vec![25, 12], vec![56, 27]]).unwrap();
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assert_eq!(a * b, c);
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}
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@ -15,6 +16,7 @@ fn add_sub_test() {
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let c = Matrix::from(vec![vec![1, 2, 4], vec![2, 2, 5]]).unwrap();
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let d = Matrix::from(vec![vec![1, 2, 2], vec![-2, 0, -1]]).unwrap();
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let e = Matrix::from(vec![vec![-1, -2, -4], vec![-2, -2, -5]]).unwrap();
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assert_eq!(a.clone() + b.clone(), c);
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assert_eq!(a - b, d);
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assert_eq!(-c, e);
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@ -30,6 +32,7 @@ fn det_test() {
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vec![1.0, 2.0, 0.0],
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])
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.unwrap();
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assert_eq!(a.det(), Ok(30));
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assert_eq!(c.det_in_field(), Ok(-30.0));
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assert!(b.det().is_err());
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@ -39,6 +42,7 @@ fn det_test() {
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fn zero_one_test() {
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let a = Matrix::from(vec![vec![0, 0, 0], vec![0, 0, 0]]).unwrap();
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let b = Matrix::from(vec![vec![1, 0], vec![0, 1]]).unwrap();
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assert_eq!(Matrix::<i32>::zero(2, 3), a);
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assert_eq!(Matrix::<i32>::identity(2), b);
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}
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@ -49,6 +53,7 @@ fn echelon_test() {
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let a = Matrix::from(vec![vec![1.0, 2.0, 3.0], vec![0.0, -2.0, -2.0]]).unwrap();
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let b = Matrix::from(vec![vec![1.0, 0.0, 0.0], vec![1.0, -2.0, 0.0]]).unwrap();
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let c = Matrix::from(vec![vec![1.0, 2.0, 3.0], vec![0.0, 1.0, 1.0]]).unwrap();
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assert_eq!(m.row_echelon(), a);
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assert_eq!(m.column_echelon(), b);
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assert_eq!(m.reduced_row_echelon(), c);
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