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COMMENT REDUCE INTERACTIVE LESSON NUMBER 2 David R. Stoutemyer University of Hawaii COMMENT This is lesson 2 of 7 REDUCE lessons. Please refrain from using variables beginning with the letters F through H during the lesson. By now you have probably had the experience of generating an expression, and then having to repeat the calculation because you forgot to assign it to a variable or because you did not expect to want to use it later. REDUCE maintains a history of all inputs and computation during an interactive session. (Note, this is only for interactive sessions.) To use an input expression in a new computation, you can say INPUT(n) where n is the appropriate command number. The evaluated computations can be accessed through WS(n) or simply WS if you wish to refer to the last computation. WS stands for Work Space. As with all REDUCE expressions, these can also be used to create new expressions: (INPUT(n)/WS(n2))**2 Special characters can be used to make unique REDUCE variable names that reduce the chance of accidental interference with any other variables. In general, whenever you want to include an otherwise forbidden character such as * in a name, merely precede it by an exclamation point, which is called the escape character. However, pick a character other than "*", which is used for many internal REDUCE names. Otherwise, if most of us use "*" the purpose will be defeated; G+!%H; WS; PAUSE; COMMENT You can also name the expression in the workspace by using the command SAVEAS, for example:; SAVEAS GPLUSH; GPLUSH; PAUSE; COMMENT You may have noticed that REDUCE imposes its own order on the indeterminates and functional forms that appear in results, and that this ordering can strongly affect the intelligibility of the results. For example:; G1:= 2*H*G + E + F1 + F + F**2 + F2 + 5 + LOG(F1) + SIN(F1); COMMENT The ORDER declaration permits us to order indeterminates and functional forms as we choose. For example, to order F2 before F1, and to order F1 before all remaining variables:; ORDER F2, F1; G1; PAUSE; COMMENT Now suppose we partially change our mind and decide to order LOG(F1) ahead of F1; ORDER LOG(F1), F1; G1; COMMENT Note that any other indeterminates or functional forms under the influence of a previous ORDER declaration, such as F2, rank before those mentioned in the later declaration. Try to determine the default ordering algorithm used in your REDUCE implementation, and try to achieve some delicate rearrangements using the ORDER declaration.; PAUSE; COMMENT You may have also noticed that REDUCE factors out any number, indeterminate, functional form, or the largest integer power thereof which exactly divides every term of a result or every term of a parenthesized subexpression of a result. For example:; ON EXP, MCD; G1:= F**2*(G**2 + 2*G) + F*(G**2+H)/(2*F1); COMMENT This process usually leads to more compact expressions and reveals important structural information. However, the process can yield results which are difficult to interpret if the resulting parentheses are nested more than about two levels, and it is often desirable to see a fully expanded result to facilitate direct comparison of all terms. To suppress this monomial factoring, we can turn off an output control flag named ALLFAC; OFF ALLFAC; G1; PAUSE; COMMENT The ALLFAC monomial-factorization process is strongly dependent upon the ordering. We can achieve a more selective monomial factorization by using the FACTOR decalaration, which declares a variable to have FACTOR status. If any indeterminates or functional forms occurring in an expression are in FACTOR status when the expression is printed, terms having the same powers of the indeterminates or functional forms are collected together, and the power is factored out. Terms containing two or more indeterminates or functional forms under FACTOR status are not included in this monomial factorization process. For example:; OFF ALLFAC; FACTOR F; G1; FACTOR G; G1; PAUSE; COMMENT We can use the REMFAC command to remove items from factor status; REMFAC F; G1; COMMENT ALLFAC can still have an effect on the coefficients of the monomials that have been factored out under the influence of FACTOR:; ON ALLFAC; G1; PAUSE; COMMENT It is often desirable to distribute denominators over all factored subexpressions generated under the influence of a FACTOR declaration, such as when we wish to view a result as a polynomial or as a power series in the factored indeterminates or functional forms, with coefficients which are rational functions of any other indeterminates or functional forms. (A mnemonic aid is: think RAT for RATional-function coefficients.) For example:; ON RAT; G1; PAUSE; COMMENT RAT has no effect on expressions which have no indeterminates or functional forms under the influence of FACTOR. The related but different DIV flag permits us to distribute numerical and monomial factors of the denominator over every term of the numerator, expressing these distributed portions as rational-number coefficients and negative power factors respectively. (A mnemonic aid: DIV DIVides by monomials.) The overall effect can also depend strongly on whether the RAT flag is on or off. Series and polynomials are often most attractive with RAT and DIV both on; ON DIV, RAT; G1; OFF RAT; G1; PAUSE; REMFAC G; G1; PAUSE; COMMENT With a very complicated result, detailed study of the result is often facilitated by having each new term begin on a new line, which can be accomplished using the LIST flag:; ON LIST; G1; PAUSE; COMMENT In various combinations, ORDER, FACTOR, the computational flags EXP, MCD, GCD, and FLOAT, together with the output control flags ALLFAC, RAT, DIV, and LIST provide a variety of output alternatives. With experience, it is usually possible to use these tools to produce a result in the desired form, or at least in a form which is far more acceptable than the one produced by the default settings. I encourage you to experiment with various combinations while this information is fresh in your mind; PAUSE; OFF LIST, RAT, DIV, GCD, FLOAT; ON ALLFAC, MCD, EXP; COMMENT You may have wondered whether or not an assignment to a variable, say F1, automatically updates the value of a bound variable, say G1, which was previously assigned an expression containing F1. The answer is: 1. If F1 was a bound variable in the expression when it was set to G1, then subsequent changes to the value of F1 have no effect on G1 because all traces of F1 in G1 disappeared after F1 contributed its value to the formation of G1. 2. If F1 was an indeterminate in an expression previously assigned to G1, then for each subsequent use of G1, F1 contributes its current value at the time of that use. These phenomena are illustrated by the following sequence:; PAUSE; F2 := F; G1 := F1 + F2; F2 := G; G1; F1 := G; F1 := H; G1; F1 := G; G1; COMMENT Experience indicates that it is well worth studying this sequence and experimenting with others until these phenomena are thoroughly understood. You might, for example, mimic the above example, but with another level of evaluation included by inserting a statement analogous to "Q9:=G1" after "F2:=G", and inserting an expression analogous to "Q9" at the end, to compare with G1. ; PAUSE; COMMENT Note also, that if an indeterminant is used directly, or indirectly through another expression, in evaluating itself, this will lead to an infinite recursion. For example, the following expression results in infinite recursion at the first evaluation of H1. On some machines (Vax/Unix, IBM) this will cause REDUCE to terminate abnormally. H1 := H1 + 1 You may experiment with this problem, later at your own risk. It is often desirable to make an assignment to an indeterminate in a previously established expression have a permanent effect, as if the assignment were done before forming the expression. This can be done by using the substitute function, SUB. G1 := F1 + F2; H1 := SUB(F1=H, G1); F1 := G; H1; COMMENT Note the use of "=" rather than ":=" in SUB. This function is also valuable for achieving the effect of a local assignment within a subexpression, without binding the involved indeterminate or functional form in the rest of the expression or wherever else it occurs. More generally the SUB function can have any number of equations of the form "indeterminate or functional form = expression", separated by commas, before the expression which is its last argument. Try devising a set of examples which reveals whether such multiple substitutions are done left to right, right to left, in parallel, or unpredictably. This is the end of lesson 2. To execute lesson 3, start a fresh REDUCE job. ;END;