Answer:
[tex]\frac{7}{25}[/tex]
Step-by-step explanation:
In the interval [tex]n\in [1, 25][/tex], there are [tex](25-1)+1=25[/tex] numbers total. The number [tex]2[/tex] appears as the ones digit for [tex]3[/tex] numbers in this interval: [tex]0\bold{2}, 1\bold{2}, 2\bold{2}[/tex]. The subset [tex]n\in [20, 25][/tex] marks the interval of numbers in the set that has the number [tex]2[/tex] as the tens digit. There are [tex](5-1)+1=5[/tex] numbers in this set. Since [tex]22[/tex] is counted twice, there are a total of [tex]5+3-1=7[/tex] numbers in the original interval that contain the number [tex]2[/tex]. Therefore, the probability a random selected number from the interval has the number [tex]2[/tex] in it is [tex]\fbox{$\frac{7}{25}$}[/tex].
