I am trying to establish whether there are other numbers ( two digits for the moment!) that have the curious property (8+1)^2 = 81
Using a bit of algebra ( k+1)^2= 10k +1, it can be established that k=8 is the only solution ( ignoring k=0), but this is a particular case with a unit digit of 1.
Generalising further:
(k+m)^2 = 10k + m
And here i get stuck, how do i establish solutions to this equation other than the above: k=8, m=1 ?
In other words, can anyone offer me any strategies to prove that there is only one solution ( if that is indeed the case?) to
k^2 + 2km + m^2 -10k-m =0
Can i use things like discriminant? Doesn't quite make sense with two variables...
Using a bit of algebra ( k+1)^2= 10k +1, it can be established that k=8 is the only solution ( ignoring k=0), but this is a particular case with a unit digit of 1.
Generalising further:
(k+m)^2 = 10k + m
And here i get stuck, how do i establish solutions to this equation other than the above: k=8, m=1 ?
In other words, can anyone offer me any strategies to prove that there is only one solution ( if that is indeed the case?) to
k^2 + 2km + m^2 -10k-m =0
Can i use things like discriminant? Doesn't quite make sense with two variables...
