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I want to use the solution of Maximization, defined as a function, in another function. Here's an example:

f1[y_] := x /. Last[Maximize[{Sin[x y], Abs[x] <= y}, x]]  (* or any other function *)

This definition is fine, for example if I give f1[4], I get answer -((3 \[Pi])/8).

The problem is that when I want to use it in another function I get error. For example:

FindRoot[f1[y] == Pi/4, {y, 1}]

Gives me the following error:

ReplaceAll::reps: {x} is neither a list of replacement rules nor a valid dispatch table, and so cannot be used for replacing. >>

FindRoot::nlnum: The function value {-0.785398+(x/.x)} is not a list of numbers with dimensions {1} at {y} = {1.}. >>

I've been struggling with this for several days now! Any comment, idea, help, ... is deeply appreciated! Thank you very much!

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math.stackexchange.com might provide more help. –  MECU Mar 1 '13 at 3:35
    
@MECU I think you mean Mathematica. Most of us have migrated over there. –  rcollyer Mar 2 '13 at 4:06

1 Answer 1

up vote 3 down vote accepted

When y is not a number, your Maximize cannot be resolved, in which case the Last element of it is x, which is why you get that odd error message. You can resolve this by clearing the bad definition of f1 and making a new one that ensures only numeric arguments are evaluated:

ClearAll[f1]
f1[y_?NumericQ] := x /. Last[Maximize[{Sin[x y], Abs[x] <= y}, x]]

FindRoot[f1[y] == \[Pi]/4, {y, 1}]
(* {y -> 0.785398} *)
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Thanks sooooooo much!!! It works! –  user2122036 Mar 1 '13 at 3:57

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