1 files changed, 0 insertions, 48 deletions
diff --git a/pkgs/applications/science/math/sage/patches/maxima-5.41.0-doctests.patch b/pkgs/applications/science/math/sage/patches/maxima-5.41.0-doctests.patch
deleted file mode 100644
index fad434e52ad..00000000000
--- a/pkgs/applications/science/math/sage/patches/maxima-5.41.0-doctests.patch
+++ /dev/null
@@ -1,48 +0,0 @@
-diff --git a/src/sage/interfaces/maxima_abstract.py b/src/sage/interfaces/maxima_abstract.py
-index 961c20aaac..3d601d8939 100644
---- a/src/sage/interfaces/maxima_abstract.py
-+++ b/src/sage/interfaces/maxima_abstract.py
-@@ -1743,7 +1743,7 @@ class MaximaAbstractElement(ExtraTabCompletion, InterfaceElement):
-             sage: y,d = var('y,d')
-             sage: f = function('f')
-             sage: latex(maxima(derivative(f(x*y), x)))
--            \left(\left.{{{\it \partial}}\over{{\it \partial}\,  {\it t_0}}}\,f\left({\it t_0}\right)  \right|_{{\it t_0}={\it x}\,  {\it y}}\right)\,{\it y}
-+            \left(\left.{{{\it \partial}}\over{{\it \partial}\,  {\it t}_{0}}}\,f\left({\it t}_{0}\right)  \right|_{{\it t}_{0}={\it x}\,  {\it y}}\right)\,{\it y}
-             sage: latex(maxima(derivative(f(x,y,d), d,x,x,y)))
-             {{{\it \partial}^4}\over{{\it \partial}\,{\it d}\,  {\it \partial}\,{\it x}^2\,{\it \partial}\,  {\it y}}}\,f\left({\it x} ,  {\it y} , {\it d}\right)
-             sage: latex(maxima(d/(d-2)))
-diff --git a/src/sage/manifolds/differentiable/metric.py b/src/sage/manifolds/differentiable/metric.py
-index 3cd6ad3235..1e18af1a6b 100644
---- a/src/sage/manifolds/differentiable/metric.py
-+++ b/src/sage/manifolds/differentiable/metric.py
-@@ -993,7 +993,7 @@ class PseudoRiemannianMetric(TensorField):
-              2-dimensional differentiable manifold S^2
-             sage: g.riemann()[:]
-             [[[[0, 0], [0, 0]], [[0, sin(th)^2], [-sin(th)^2, 0]]],
--             [[[0, (cos(th)^2 - 1)/sin(th)^2], [1, 0]], [[0, 0], [0, 0]]]]
-+             [[[0, -1], [1, 0]], [[0, 0], [0, 0]]]]
- 
-         In dimension 2, the Riemann tensor can be expressed entirely in terms of
-         the Ricci scalar `r`:
-diff --git a/src/sage/symbolic/expression.pyx b/src/sage/symbolic/expression.pyx
-index dfb8751467..27402e54ab 100644
---- a/src/sage/symbolic/expression.pyx
-+++ b/src/sage/symbolic/expression.pyx
-@@ -7154,7 +7154,7 @@ cdef class Expression(CommutativeRingElement):
-             sage: ex = lcm(sin(x)^2 - 1, sin(x)^2 + sin(x)); ex
-             (sin(x)^2 + sin(x))*(sin(x)^2 - 1)/(sin(x) + 1)
-             sage: ex.simplify_full()
--            -cos(x)^2*sin(x)
-+            sin(x)^3 - sin(x)
- 
-         TESTS:
- 
-@@ -10004,7 +10004,7 @@ cdef class Expression(CommutativeRingElement):
- 
-             sage: f=tan(3*x)
-             sage: f.simplify_trig()
--            (4*cos(x)^2 - 1)*sin(x)/(4*cos(x)^3 - 3*cos(x))
-+            -(4*cos(x)^2 - 1)*sin(x)/(4*cos(x)*sin(x)^2 - cos(x))
-             sage: f.simplify_trig(False)
-             sin(3*x)/cos(3*x)
-