Identify the maximum or minimum value and the domain and range of the graph of the function y = 2(x + 2)^2 - 3A. minimum value: 3domain: all real numbers 3range: all real numbersB. maximum value: -3domain: all real numbers ≤ 3range: all real numbersC. minimum value: -3domain: all real numbersrange: all real numbers ≥ -3D. maximum value: 3domain: all real numbersrange: all real numbers ≤ 3

y = 2(x + 2)^2 - 3 has the form y = a(x-h)^2 + k.

Here, a=2, h=-2 and k=-3.

This is a quadratic function.  Its graph is a vertical one which opens up (we know that because a = 2 is positive).  Its vertex is (-2, -3).  Because the graph opens up, (-2, -3) represents the minimum of this function.

The domain of any and all polynomial(s) includes "all real numbers."
The range is the set of possible outputs (y-values) and is (-3, infinity).