The Maple computer algeba system has a command `seq(f, i = m..n, step)`

, which returns the sequence `fm`

,...`fn`

, where `fi`

is the expression `f`

with all occurrences of the symbol `i`

replaced by the numeric value of `i`

in the sequence of integers from `m`

to `n`

. Implement a scheme function `(seq f (start step end))`

, and produces a list of values (`f(start)`

,`f(start+step)`

,...,`f(start+n*step)`

), where n is the largest integer such that `start+n*step <= end`

and `start+(n+1)*step > end`

.

I thought this would work: `(seq (lambda (x) (* x x)) '(0 2 7))`

=> `(0 4 16 36)`