Mathematics 9709 · AS & A Level · Differentiation

Differentiation — practice question

The curve is described by $y = 2x^2 + kx + k - 1$, with $k$ as a constant.
(a)[3]

The line $y = 2x + 3$ is tangent to the curve. Determine the value of $k$.

(b)[3]

Now that $k = 2$ is given, write the curve in the form $y = 2(x + a)^2 + b$, where $a$ and $b$ are constants, and hence give the coordinates of the vertex of the curve.

Worked solution & mark scheme

This 6-mark question has a full step-by-step worked solution and mark scheme. One marking point: Set up quadratic $2x^2+(k-2)x+k-4=0$

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