1 Answer

Leena Patel · Answer 1 · 2023-01-18T22:31:53+0000

Answer;

$\text{Vertex = (2,7)}$

Explanation;

Here, we want to get the vertex of the given quadratic equation

We have the vertex form as;

where the vertex is;

The parameters of the parabola represents the coefficient of each individual unit

The coefficient of x^2 is 1

The coefficient of x is -4

The coefficient of the last number is 11

Now, we get the value of h as follows;

$h\text{ = }(-b)/(2a)\text{ =}(4)/(2)\text{ = 2}$

To get the value of k, we susbtitute the value of h for x

So, we have;

$\begin{gathered} m(2)=2^2-4(2)+11 \\ m(2)=7 \end{gathered}$

So, we have the value of k as 7

The vertex is thus a minimum at (2,7)

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