Stack Overflow is a community of 4.7 million programmers, just like you, helping each other.

Join them; it only takes a minute:

Sign up
Join the Stack Overflow community to:
  1. Ask programming questions
  2. Answer and help your peers
  3. Get recognized for your expertise

Trying to use vpa() to compute a variable point number for a rational expression in an exponent:

syms x;
ans1 = x^(12345/67890)
ans2 = vpa(x^(12345/67890),3)
ans2_5 = vpa((12345/67890),3)
ans3 = vpa(x*(12345/67890),3)

The above shows the issue. ans1 shows the default output of the expression. ans2 shows that vpa() is not computing the variable point number for the expression. ans 2_5 shows what it should be computing to. The result I'm looking for is x^0.182.

ans3 just shows that vpa() produces the expected result when the function is multiplication--it's something in the exponent that's tripping it up.

How can I request that the exponent be evaluated by vpa?


Maybe I can make this more clear. All I really need is an accessor or index to the exponent of an exponential expression. So if my expression is y = x^a I need to be able to have some accessor on x that returns a.

Is this possible?

share|improve this question

+1 for spotting this interesting bug. This solved your problem for me:

ans1 = x^p

ans1 =
share|improve this answer
For the example as I presented it your solution works. However for the actual use-case, the whole exponential expression results from solving a system of equations, so I can't pick out just the exponent component to call it a variable (I don't think). Any tricky suggestions there? – Trevor Jan 16 '13 at 3:27
I'm afraid VPA is not the tool to use, as I understand now that there is no bug. vpa(A,d) computes each element of A to at least d decimal digits of accuracy, where d is the current setting of digits. But if A=x^d, there's no way to know about the first d digits of A hence the outcome. – bla Jan 16 '13 at 3:47
yet it works with the multiplication expression... – Trevor Jan 16 '13 at 18:03
Because multiplication (and addition) is separable and power operations are not. When multiplying x*d, you can separate the two components, unknown x and its scaling factor d which is known, hence when writing vpa(x*d), what actually happen is x*vpa(d). However, in the case of x^d, vpa cannot tell anything about the accuracy of x^d because the power operation is not separable, you cannot write it as c*X, and only if x will be some known number, say 3, then 3^d will be some known number that vpa could operate on. – bla Jan 16 '13 at 18:30
Sure, but it could still evaluate the exponent on its own, so that the result would be x^vpa(d). I don't want a single number, I want an expression in terms of x. It's doing the right thing now, it's just giving me a rational number where I want a decimal. – Trevor Jan 16 '13 at 20:34

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.