The graphs of two functions, f and g, are shown on the co-ordinate grid below - Junior Cycle Mathematics - Question 11 - 2014

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

• (x + 2)² - 4 = 0

This implies:

• (x + 2)² = 4
• x + 2 = ±2

Therefore, x = 0 and x = -4 are the roots of f.

For g, we likewise set it to zero:

• (x - 3)³ - 4 = 0

This gives:

• (x - 3)³ = 4
• x - 3 = ± oot{3}{4}

So, the roots of g are x = 3 + oot{3}{4} and x = 3 - oot{3}{4}.

To sketch the graph of h(x), we recognize that it is a parabola that shifts the vertex of f downwards. The vertex is at (1, -4). We evaluate:

• h(-1) = ((-1) - 1)² - 4 = 0 - 4 = -4
• h(1) = (0) - 4 = -4
• h(3) = (2)² - 4 = 0

Using these points and the symmetry of the parabola, we can sketch the graph above.

Rearranging the equation, we have:

(x - p)² - 2 = x² - 10x + 23

Now factoring this, we get:

(x - p)² = x² - 10x + 25.

This implies:

(x - p) = ±(x - 5)

To satisfy this equality, we must have p = 5. Therefore, the value of p is 5.

The axis of symmetry for a quadratic function in the standard form $k(x) = ax^2 + bx + c$ is given by the formula:

$x = -\frac{b}{2a}$

In this case, a = 1 and b = -10:

$x = -\frac{-10}{2 \cdot 1} = \frac{10}{2} = 5$

Thus, the equation of the axis of symmetry is x = 5.