Set 8: Quadratic Equations (Advanced)

Explanation

Answer: A

How is the graph of $y = (x - 2)^2$ transformed from $y = x^2$ ?

Shifted right 2 units

✓ Correct

Shifted left 2 units

Shifted down 2 units

Shifted up 2 units

Detailed Explanation

Choice A is correct. Choice A is the correct answer. In vertex form $y = a(x - h)^2 + k$ , the value $h$ represents the horizontal shift. 1. The equation is $y = (x - 2)^2$ , so $h = 2$ . 2. A positive $h$ value indicates a shift to the right. Think: "What x value makes the term zero?" Here, $x=2$ , so the vertex moves to $x=2$ . Choice B is incorrect because a left shift would be $(x + 2)^2$ . Choice C is incorrect because a down shift would be $x^2 - 2$ . Choice D is incorrect because an up shift would be $x^2 + 2$ .

Key Steps:

•

The correct answer is Shifted right 2 units

Why others are wrong:

B: Choice B is incorrect and may result from a calculation error.

C: Choice C is incorrect and may result from a calculation error.

D: Choice D is incorrect and may result from a calculation error.

Start Practicing

Set 8: Quadratic Equations (Advanced)

Detailed Explanation

🎯 Keep Practicing!