Answer:
The smallest positive integer solution to the given system of congruences is 30.
Step-by-step explanation:
The given system of congruences is
[tex]x=0(mod5)[/tex]
[tex]x=8(mod11)[/tex]
where, m and n are positive integers.
It means, if the number divided by 5, then remainder is 0 and if the same number is divided by 11, then the remainder is 8. It can be defined as
[tex]x=5m[/tex]
[tex]x=11n+8[/tex]
[tex]5m\cong 11n+8[/tex]
Now, we can say that m>n because m and n are positive integers.
For n=1,
[tex]5m=11(1)+8=19[/tex]
[tex]5m=19[/tex]
19 is not divisible by 5 so m is not an integer for n=1.
For n=2,
[tex]5m=11(2)+8[/tex]
[tex]5m=30[/tex]
[tex]m=6[/tex]
The value of m is 6 and the value of n is 2. So the smallest positive integer solution to the given system of congruences is
[tex]x=5(6)=30[/tex]
Therefore the smallest positive integer solution to the given system of congruences is 30.
