The graphs of two functions, $f$ and $g$, are shown on the co-ordinate grid below - Junior Cycle Mathematics - Question 11 - 2015

The roots of $f$ can be found by setting the function equal to zero:

$(x + 2)^2 - 4 = 0$
We solve this to find $x + 2 = ightarrow 0$ or $x + 2 = ±2$. Thus, the roots are $x = -2$ and $x = 0$.

For $g$, we also set the function to zero:

$(x - 3)^2 - 4 = 0$
From this, we get $x - 3 = ±2$. So the roots are $x = 1$ and $x = 5$.

To sketch the graph of $h$, we recognize that it is a parabola that opens upwards with its vertex at the point (1,-4). The values of $h$ can be calculated for several values around 1 (e.g., at $x = 0$, $x = 2$, and $x = 1$) to provide shape. Plotting these points will give an accurate representation.

To solve for $p$, we start from the equation:

$(x - p)^2 = 2x^{-1} - 10x + 23$
Rearranging this, we notice that we need to isolate the equation:

$(x - p)^2 = -10x + 23$
Identifying that $p$ is a natural number, we can examine suitable values for $p$ (given relations to the vertex provides hints regarding symmetrical properties at $x = 5$). Solving gives $p = 5$.

The axis of symmetry for a quadratic function of the form $ax^2 + bx + c$ is given by the formula:

$x = -\frac{b}{2a}$
For $k(x)$, we have $a = 1$ and $b = -10$. Substituting gives:

$x = -\frac{-10}{2(1)} = 5$
Thus, the equation of the axis of symmetry is $x = 5$.