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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?

[edit]

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?

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1 Answer 1

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

digits(3)
p=vpa(12345/67890,3)
ans1 = x^p

ans1 =
       x^0.182
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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. –  natan 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. –  natan 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

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