Show that $x^2+6x+11$ can be written as $(x + p)^2 + q$ where p and q are integers to be found - Edexcel - A-Level Maths Pure - Question 6 - 2010 - Paper 1

The equation $y = x^2 + 6x + 11$ can be sketched as follows:

1. Identify the vertex based on the rewritten form $(x + 3)^2 + 2$.
   The vertex is at (-3, 2), indicating the lowest point on the graph.

2. Intersections with the coordinate axes:

   • Y-axis: Set $x = 0$:

     $y = 0^2 + 6(0) + 11 = 11$
     Thus, the curve intersects the Y-axis at (0, 11).

   • X-axis: Set $y = 0$:

     $0 = x^2 + 6x + 11$ The discriminant of this quadratic, $ext{D} = b^2 - 4ac = 6^2 - 4(1)(11) = 36 - 44 = -8$, shows there are no real intersections with the x-axis.

The sketch is a U-shaped curve opening upwards, with a vertex at (-3, 2) and a point on the Y-axis at (0, 11).

The discriminant of the quadratic equation $ax^2 + bx + c$ is given by the formula:

$D = b^2 - 4ac$

For our equation, we identify:

• $a = 1$
• $b = 6$
• $c = 11$

Now we substitute these values into the formula:

$D = 6^2 - 4(1)(11)$ $D = 36 - 44$ $D = -8$

Thus, the value of the discriminant is -8.