using hasSymType(expression, 'constants') returns true when no constants

29 Sep 2023
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When trying to find if my expression has constants, hasSymType() always returns true. For example
syms s;
hasSymType(s*2,'constant')
returns true.
children() seems to separate out the terms into it's components as well. I would expect the following code to return [s*2] but it returns [s 2].
syms s;
children(s*2)
What am I missing?

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Paul
Paul le 29 Sep 2023
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Ran in:
Hi Andrew,
Both of those examples seem to be in accordance with doc hasSymType and children, except that children returns a cell array, not an array of sym.
syms s
hasSymType(s*2,'constant')
ans = logical
1
syms s
children(s*2)
ans = 1×2 cell array
{[s]} {[2]}
What is the reason expect different results?

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Andrew
Andrew le 29 Sep 2023
Modifié(e) : Andrew le 29 Sep 2023
Well clearly I misinterpreted the docs. My next question would be how might I figure out if there is a constant term in my expression?
For example, I have the polynomial expression f(s)=as^n+bs^(n-1)...cs+d (where n is the order of the polynomial, and a,b,c,d are constants) How would I find out if d is zero or not. Or in other words how would I find out if there is a non-zero s^0 term?
Paul
Paul le 29 Sep 2023
Modifié(e) : Paul le 29 Sep 2023
Ran in:
Ran in:
For polynomials we can use coeffs
syms a b c d s
f(s) = a*s^3 + b*s^2 + c*s + d
f(s) = 
[cfs,term] = coeffs(f(s),s,'all') % make sure to use 'all'
cfs = 
term = 
cfs(end)
ans = 
d
f(s) = a*s^3 + b*s^2 + c*s
f(s) = 
[cfs,terms] = coeffs(f(s),s,'all') % make sure to use 'all'
cfs = 
terms = 
cfs(end)
ans = 
0

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Walter Roberson
Walter Roberson le 29 Sep 2023

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Internally, inside the symbolic engine, s*2 is coded as a data structure
_mult(DOM_IDENT('s'), DOM_INT(2))
and taking children() of that strips off the
_mult
layer, resulting in the multiple outputs DOM_IDENT('s') and DOM_INT(2) . The interface layer knows to wrap the multiple outputs into a cell array. So the output is {s sym(2)}
2*s is not an atomic entity: it is an expression that can be decomposed into its parts. One of those parts is a constant, which is why hasType() succeeds.

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Andrew
Andrew le 29 Sep 2023
Well clearly I misinterpreted the docs. My next question would be how might I figure out if there is a constant term in my expression?
For example, I have the polynomial expression f(s)=as^n+bs^(n-1)...cs+d (where n is the order of the polynomial, and a,b,c,d are constants) How would I find out if d is zero or not. Or in other words how would I find out if there is a non-zero s^0 term?
Walter Roberson
Walter Roberson le 29 Sep 2023
Déplacé(e) : Walter Roberson le 29 Sep 2023
Ran in:
Ran in:
syms a b c d s
f(s) = a*s^6 + b*s^4 + c*s + d
f(s) = 
g(s) = a*s^6 + b*s^4 + c*s + 0
g(s) = 
[val1, powers1] = coeffs(f(s),s)
val1 = 
powers1 = 
constant_term1 = val1(powers1 == 1)
constant_term1 = 
d
[val2, powers2] = coeffs(g(s),s)
val2 = 
powers2 = 
constant_term2 = val2(powers2 == 1)
constant_term2 = Empty sym: 1-by-0
%alternative
val3 = coeffs(f(s), s, 'all')
val3 = 
val3(end)
ans = 
d
val4 = coeffs(g(s), s, 'all')
val4 = 
val4(end)
ans = 
0
Walter Roberson
Walter Roberson le 29 Sep 2023
Déplacé(e) : Walter Roberson le 29 Sep 2023
In the case where all of the coefficients are numeric (or convertable to double) you can use sym2poly and then look at the last entry.
Andrew
Andrew le 29 Sep 2023
Thanks! Very helpful

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