Answer:
program arraysminfinder;
procedure minreplace();
var
no: array [1..10] of integer; (*no is an array of integers, 10 in all *)
a: integer= 0;
i: integer= 0;
c: integer= 0;
k: integer=0;
N: integer=0;
begin
(* We need to first initialize the array no with 0 values *)
for a := 1 to 10 do
no[a]:=0;
c:=no[1];
for a := 1 to 10 do
begin
if (no[i]<c) then
begin
c:=no[i];
k:=i;
end
else
begin
i:=i+1;
end
end;
writeln('Enter the new number:');
read(N);
no[k]:=N;
for a := 1 to 10 do
begin
writeln('The array elements are:',no[a]);
end;
end;
begin
end.
Explanation:
The program is as above. I have used a function, a for loop, an array of integers, and the if then else ladder for getting the desired output as mentioned in the program. If in case you want procedure for input and output, create a procedure like:
procedure replacenum():integer;
Begin
writeln("Enter the new number:" N);
no[k]:=N;
for a := 1 to 10 do
writeln("The array elements are:"no[a]);
end.
Similarly you can make a procedure for input.
Let P(n) be "a postage of n cents can be formed using 5-cent and 17-cent stamps if n is greater than 63".Basis step: P(64) is true since 64 cents postage can be formed with one 5-cent and one 17-cent stamp.Inductive step: Assume that P(n) is true, that is, postage of n cents can be formed using 5-cent and 17-cent stamps. We will show how to form postage of n + 1 cents. By the inductive hypothesis postage of n cents can be formed using 5-cent and 17-cent stamps. If this included a 17-cent stamp, replace this 17-cent stamp with two 5-cent stamps to obtain n + 1 cents postage. Otherwise, only 5-cent stamps were used and n 65. Hence there are at least three 5-cent stamps forming n cents. Remove three of these 5-cent stamps and replace them with two 17-cent stamps to obtain n + 1 cents postage.Hence P(n + 1) is true.
Answer:
When two or more computers are connected together so they can communicate with one another, they form a network. The largest computer network in the world in the Internet.
Answer:
Decrease the size of the window or minimize the window.
