Answer:
Step-by-step explanation:
To find the equivalent expression that is most useful for finding the year where the population was at a minimum, you should transform the given equation, 8x² − 64x + 720 , to its vertex form, y = A(x - h)² + k, where the vertex is (h, k) and it would represent the minimum (if A is positive) or the maximum (if A is negative).
The easiest way to find the vertex form is by completing squares.
This is how you complete squares and get the vertex form of the equation of the parabola:
- Introduce the dependent variable: y = 8x² − 64x + 720
- Subtract 720 from both sides: y - 720 = 8x² - 64x
- Extract common factor 8 on the right side: y - 720 = 8(x² - 8x)
- Add (8/2)² inside the parenthesis on the right side and the equivalent value to the left side: y - 720 + 8(8/2)² = 8 (x² - 8x + 4²)
- Simplify: y - 720 + 128 = 8 (x² - 8x + 16)
- Factor the perfect square trinomial: y - 592 = 8 (x - 4)²
- Add 592 to both sides: y = 8(x - 4)² + 592
So, the answer is y = 8 (x - 4)² + 592