Answer :
Answer:
The correct answer is E that is 18 eggs.
Explanation:
Assuming initially eggs be n which he bought
So, the price per dozen = $(12×12/n)
But finally, he bought (n + 2) eggs in the same price that is $12.
So, the new price per dozen = $(12×12/(n + 2))
Therefore,
12×12/n - 12×12/(n + 2) = 1
Taking 12 × 12 common from the above equation:
(12×12)[(n + 2) - n]/[n(n + 2)] = 1
144×2 = n(n + 2)
n(n + 2) = 288
n² +2n - 288 = 0
Now, we can either solve the above quadratic equation as follows,
n² + 2n - 288 = 0
n² + 18n - 16n - 288 = 0
(n + 18)(n - 16) = 0
As n would be positive because eggs cannot be in negative numbers therefore, n = 16
And he bought 2 extra, So
n = 16 + 2
n = 18 eggs
The eggs he bought is 18