Let b be the initial amount of books. Steve sells half of his books, so the number of Steve's books become
[tex] b \to \dfrac{b}{2} [/tex]
Then, he buys 6 more, so the number increases by 6:
[tex] \dfrac{b}{2} \to \dfrac{b}{2}+6 [/tex]
This number is now 14, so you have
[tex] \dfrac{b}{2}+6 = 14 [/tex]
Subtract 6 from both sides:
[tex] \dfrac{b}{2} = 8 [/tex]
Multiply both sides by 2:
[tex] b = 16 [/tex]
c/2+6=14
Subtract 6 from both sides.
c/2=8
Multiply both sides by 2.
c=16
Check your work by plugging 16 into the equation.
16/2+6=14
8+6=14
That's correct, 8+6 is 14, so the answer is that C (the number of comic books) is 16.
Steve started with 16 comic books.
I believe that's the answer to the question you meant to ask. But just to recap, the question I answered would be "How many comic books did Steve have at first?" or "How many comic books did Steve start out with?" or something similar. I hope that this answer helps!
