The correct answer is A

Explanation

Since the graph of y = (x^2) minus (4 times x) + c in the xy-plane contains the point (negative 2 comma 0), it follows that substituting the value x = negative 2 into y = (x^2) minus (4 times x) + c) yields y = 0. Hence 0 = ((negative 2)^2) minus 4 times (negative 2) + c, which simplifies to 0 = 4 minus (negative 8) + c, or 0 = 12 + c. Therefore, c = negative 12.

Alternatively, since the graph of y = (x^2) minus (4 times x) + c) in the xy-plane contains the points (negative 2 comma 0) and (6 comma 0), and the coefficient of x^2 is 1, the equation is equivalent to y = (x +2) times (x minus 6), which multiplies out to y = (x^2) minus (4 times x) minus 12. Therefore, c = negative12.