Answer:
The number after reversing the digits is [tex]\bold{6y}[/tex]
Step-by-step explanation:
First of all, let us try to learn about representing a 2 digit number.
28 can be written as 20 + 8 OR 2 [tex]\times[/tex] 10 + 8
79 can be written as 70 + 9 OR 7 [tex]\times[/tex] 10 + 9
17 can be written as 10 + 7 OR 1 [tex]\times[/tex] 10 + 7
i.e. if we are given the unit's and ten's digits as U and T, we can write the two digit number as: T [tex]\times[/tex] 10 + U
Now, it is given that ten's digit is [tex]y[/tex].
Unit's digit is half of that i.e. [tex]\frac{y}{2}[/tex].
So, the number is
[tex]y \times 10 +\frac{y}{2}\\\Rightarrow 10 y +\frac{y}{2}\\\Rightarrow \dfrac{21}{2}y[/tex]
Now, the digits are reversed:
Unit's digit = [tex]y[/tex]
Ten's digit = [tex]\frac{y}{2}[/tex]
So, the number after reversing the digits:
[tex]\dfrac{y}{2}\times 10+y\\\Rightarrow 5y+y = \bold{6y}[/tex]
The number after reversing the digits is [tex]\bold{6y}[/tex].
