# scheme programming sum function

Define a function sum, which takes two numbers, or two real functions, and returns their sum. E.g.

(sum 1 2) => 3 ((sum cos exp) 0) => 2

I get that for the sum of two numbers the code would be the following:

(define sum(lambda (x y)
(+ x y)))

But what would be the code for the two real functions...? How would I do this? can anyone please help.

Also how would i do this...?

Define a function sum-all which works like sum, but works on a list of numbers or a list of functions. Assume the list contains at least one element. E.g.

(sum-all (list 1 2 3)) => 6

((sum-all (list cos sin exp)) 0) => 2

NOTE: THIS IS NOT HOMEWORK... I WAS GOING THROUGH A PAST MIDTERM.

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What have you tried? – jamesdlin Mar 4 '12 at 8:49
the function that I tried with is posted above: (define sum(lambda (x y) (+ x y))) – user1028 Mar 4 '12 at 8:51
for ((sum cos exp) 0) to work sum would need to be (lambda (f g) (lambda (v) (+ (f v) (g v)))) to combine this with the other sum function (lambda (a b) (+ a b)) you'd need to look at the types of the arguments and decide what to do with them. – Dan D. Mar 4 '12 at 9:00
(define sum (lambda (x y) (+ x y))) is nearly equivalent to (define sum +). – Christoffer Hammarström Mar 4 '12 at 15:23

For the first part of your question, I'll have to agree with PJ.Hades that this is the simplest solution:

(define (sum x y)
(if (and (number? x) (number? y))
(+ x y)
(lambda (n)
(+ (x n) (y n)))))

For the second part, we can make good use of higher-order procedures for writing a simple solution that is a generalization of the previous one:

(define (sum-all lst)
(if (andmap number? lst)
(apply + lst)
(lambda (n)
(apply + (map (lambda (f) (f n)) lst)))))

In both procedures, I'm assuming that all the operands are of the same kind: they're either all-numbers or all-functions, as inferred from the sample code provided in the question.

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Do you mean this?

(define (sum a b)
(if (and (number? a) (number? b))
(+ a b)
(lambda (x)
(+ (a x) (b x)))))
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I'm a little rusty with my Scheme, so perhaps there's a better way to do this, but you could do:

(define (sum-all lst)
(define (sum-funcs-helper funcs x)
(if (empty? funcs)
0
(+ ((car funcs) x)
(sum-funcs-helper (cdr funcs) x))))
(if (empty? lst)
0 ;; Beats me what this is supposed to return.
(if (number? (car lst))
(apply + lst)
(lambda (x) (sum-funcs-helper lst x)))))
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(define (sum lst)

(cond

[(empty? lst) 0]

[else (foldr + 0 lst)]))
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