This document is available on the World Wide Web as
http://www.cs.grinnell.edu/~stone/courses/scheme/labs/procedure-definitions.xhtml
created September 9, 1997 ... last revised February 8, 2005
Define and test a Scheme procedure neighbor that takes one argument,
an integer, and returns the next higher integer if its argument is even,
the next lower integer if its argument is odd. (Start by writing a comment
that describes the purpose of the procedure.)
Define and test a Scheme procedure type-of-list that takes
one argument, a list, and returns the symbol empty if the
argument is the empty list, the symbol non-empty otherwise.
Define and test a Scheme procedure report-victory that takes
one argument, a real number, and returns the string "I won!"
if that number is positive, the string "You won!" if it is
negative, and the string "It's a tie!" if it is zero.
Define a Scheme procedure classify-by-age that takes one argument, a
non-negative integer, and returns the symbol infant if the argument
is 0 or 1, the symbol child if the argument is less than or equal to
12, the symbol adolescent if the argument is less than or equal to
18, the symbol adult if the argument is less than 65, and the symbol
senior in any other case. Test your procedure by calling it with a
representative age within each classification.
Define and test a Scheme predicate string-or-symbol? that
takes one argument and returns #t if the argument is either a
string or a symbol, #f if it is neither.
Define and test a Scheme predicate between? that takes three
arguments, all real numbers, and determines whether the second one lies
strictly between the first and third (returning #t if it is, #f if it is not). For example, 6 lies strictly between 5 and 13, so both
(between? 5 6 13) and (between? 13 6 5) should have the value
#t.
A natural number is an integer that is not negative.
Furthermore, in Scheme programs, we'll apply this term only to non-negative
integers that are represented exactly, not to approximations. (The
built-in Scheme predicate exact? can be used to test whether a
number is represented exactly.) Define and test a Scheme predicate natural-number? that determines whether its argument is a natural number.
Three line segments can be assembled into a triangle if, and only
if, the length of each of them is less than the sum of the lengths of the
other two. Define a Scheme predicate triangle? that takes
three arguments, all positive real numbers, and determines whether line
segments of those three lengths (assumed to be measured in the same units)
could be assembled into a triangle.
I am indebted to Professor Ben Gum for his contributions to the development of this lab.
This document is available on the World Wide Web as
http://www.cs.grinnell.edu/~stone/courses/scheme/labs/procedure-definitions.xhtml
created September 9, 1997 ... last revised February 8, 2005