Could someone please explain why 7 is being subtracted from 64 in:
$7 · 7^{k+2} + 64 · 8^{2k+1}$ to make
$7(7^{k+2} + 8^{2k+1}) + 57 · 8^{2k+1}.$
Also, how does $7^{k+2}$ get factored by 7 to make the same thing.
Could someone please explain why 7 is being subtracted from 64 in:
$7 · 7^{k+2} + 64 · 8^{2k+1}$ to make
$7(7^{k+2} + 8^{2k+1}) + 57 · 8^{2k+1}.$
Also, how does $7^{k+2}$ get factored by 7 to make the same thing.
Note that $64=57+7$, so $ 64\cdot8^{2k+1}=7\cdot8^{2k+1}+57\cdot8^{2k+1} $
Your problem now becomes $ 7\cdot7^{k+2}+7\cdot8^{2k+1}+57\cdot8^{2k+1}=7(7^{k+2}+8^{2k+1})+57\cdot8^{2k+1} $