The function $h(x)$ below gives the approximate height of the water at Howth Harbour on a particular day, from 12 noon to 5 p.m., where $h(x) = 10x^2 - 50x + 130$, where $h(x)$ is the height of the water in centimeters, and $x$ is the time in hours after 12 noon - Junior Cycle Mathematics - Question 14 - 2016

To draw the graph of the function $h(x) = 10x^2 - 50x + 130$, I will first find its vertex, which corresponds to the lowest point of the parabola. The vertex can be found using the formula:

$x = -\frac{b}{2a} = -\frac{-50}{2 \cdot 10} = 2.5$

Next, substitute $x = 2.5$ back into the function to find the corresponding $h(2.5)$:

$h(2.5) = 10(2.5)^2 - 50(2.5) + 130 = 10(6.25) - 125 + 130 = 62.5 + 5 = 67.5$

So the lowest point is at $(2.5, 67.5)$. At $x = 0$ (12 noon), the height is:

$h(0) = 10(0)^2 - 50(0) + 130 = 130$

At $x = 5$ (5 p.m.),

$h(5) = 10(5)^2 - 50(5) + 130 = 10(25) - 250 + 130 = -25 + 130 = 105$

Now plot these points and connect them smoothly to draw the parabola.