Answer:
The answer is 91
Step-by-step explanation:
We have the following equality:
[tex]49x^2+56x-64=a^2x^2+2abx+b^2-c[/tex]
Then a must satisfy that [tex]49=a^2[/tex]. So,
[tex]a=7[/tex] or [tex]a=-7[/tex].
1) If a=7, then, it follows for the first equality that 56=14b. Then b=4. Finally, substituting b=4 in the first equality we obtain that -64=16-c. So, c= 80. We conclude that
[tex]a+b+c=7+4+80=91[/tex].
As the problem states, we only consider values of a greater than zero. Then 91 is the only solution for [tex]a+b+c[/tex].
