Set 8: Quadratic Equations (Intermediate)

Explanation

Answer: A

Find the value of $k$ so that the line $y = 2x + k$ is tangent to the parabola $y = x^2$ .

-1

✓ Correct

-2

Detailed Explanation

Choice A is correct. Choice A is the correct answer. A line is tangent to a parabola if they intersect at exactly one point. 1. Set equal: $x^2 = 2 x + k$ . 2. Rearrange: $x^2 - 2 x - k = 0$ . 3. Set discriminant to 0: $\Delta = (-2)^2 - 4(1)(-k) = 0$ . 4. $4+ 4 k = 0 \Rightarrow 4 k = -4 \Rightarrow k = -1$ . Choice B is incorrect. Choice C is incorrect. Choice D is incorrect.

Key Steps:

•

The correct answer is -1

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.

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