sympy.line.equation()

Same value and type, but what's the difference?"

How can I fix it?

What is the difference between z1 and z2?

``````from sympy import *
var('x y z1 z2')
z1=8*x+6*y+48
print("#z1",z1,type(z1))

z2=Line(Point(-6,0),Point(0,-8)).equation()
print("#z2",z2,type(z2))

if type(z1)==type(z2):
print("#","type==")
else:
print("#","type<>")
if z1==z2:
print("#","==")
else:
print("#","<>")
# type==
# <>
``````

I try add .expand().simplify() 30 mins ago

``````from sympy import *
var('x y')
print("#z1#",solve(8*x+6*y+ 48                                                 ,y))
print("#   ",      Line(Point(-6,0),Point(0,-8)).equation().expand().simplify()   )
print("#z2#",solve(Line(Point(-6,0),Point(0,-8)).equation().expand().simplify(),y))
#z1# [-4*x/3 - 8]
#    8*x + 6*y + 48
#z2# []
``````

Thank you.

``````from sympy import *
var('x y')
print("#z1#",solve(8*x+6*y+ 48                                           ,y))
print("#   ",                  Line(Point(-6,0),Point(0,-8)).equation()     )
print("#z2#",solve(sympify(str(Line(Point(-6,0),Point(0,-8)).equation())),y))
#z1# [-4*x/3 - 8]
#    8*x + 6*y + 48
#z2# [-4*x/3 - 8]
``````

The equality operator (==) in SymPy tests whether expressions have identical form, not whether they are mathematically equivalent.

If you want to determine the mathematical equivalence of nontrivial expressions, you should apply a more advanced simplification routine to both sides of the equation. In the case of polynomials, expressions can be rewritten in a canonical form by expanding them fully. This is done using the .expand() method in SymPy - in your case:

``````print(bool(z1.expand()==z2.expand()))
``````

or

``````print((z1-z2).expand())
``````

In first case True will be resulted for equivalent expressions. In second case you will get 0 (zero) if expressions are equivalent. But you will have False and 8x - 8x - 6y + 6y instead.

If you try simplify(), which attempt more advanced transformations, you will get the same result:

``````print(simplify(z1-z2))
``````

That means that your expressions has same type and 'value', but not mathematically equivalent. See detail here.

• The equations are in identical form but they are using symbols with different assumptions, in this case. Commented Jul 16, 2022 at 12:11

When you don't tell `equation` what symbols to use, it creates its own symbols `x` and `y` with assumptions appropriate for a line (i.e. real). When you create a symbol with `var` the symbols are created with only commutative assumptions. Symbols that have different assumptions do not compare equal.

``````>>> from sympy import Line, oo
>>> Line((0,0),slope=oo).equation()
x
>>> _._assumptions
{'real': True, 'commutative': True, 'infinite': False, 'extended_real': True,
'hermitian': True, 'complex': True, 'imaginary': False, 'finite': True}
>>> var('x')
x
>>> _._assumptions
{'commutative': True, 'zero': None}
>>> Line((0,0),slope=oo).equation(x)  # supply value of x to use
x
>>> _ == x
True
>>> Line((0,0),slope=oo).equation() == x  # no default given
False
``````

So...if you want to compare expression built by Line and yourself, use the same symbols (i.e. provide the defaults to `Line.equation`. Otherwise the hidden assumptions will cause issues.

``````>>> from sympy.abc import y
>>> Line(Point(-6,0),Point(0,-8)).equation(x,y)
8*x + 6*y + 48
>>> _==8*x + 6*y + 48
True
``````