Hannah is doing a training session - Leaving Cert Mathematics - Question 7 - 2022

To find h'(x), we differentiate h(x):

$h(x) = 2x^3 - 28x^2 + 105x + 70$

The derivative is: $h'(x) = 6x^2 - 56x + 105$.

First, we evaluate h'(2):

$h'(2) = 6(2)^2 - 56(2) + 105$ $h'(2) = 6(4) - 112 + 105$ $h'(2) = 24 - 112 + 105 = 17$

This means that at 2 minutes, Hannah's heart-rate is increasing at a rate of 17 BPM per minute.

To find the maximum and minimum values of h(x), we evaluate h(x) and its critical points. Firstly, set h'(x) = 0:

$6x^2 - 56x + 105 = 0$

Using the quadratic formula:

$$\Rightarrow x = \frac{56 \pm \sqrt{(-56)^2 - 4(6)(105)}}{2(6)}\ \Rightarrow x = \frac{56 \pm \sqrt{3136 - 2520}}{12}\ \Rightarrow x = \frac{56 \pm \sqrt{616}}{12}\ \Rightarrow x = \frac{56 \pm 24.8}{12}\ \Rightarrow x \approx 5.67, 2.67.\ Evaluate h(x) at these points and endpoints 0 and 8 to find the least and greatest. After calculating: - h(0) = 70 - h(2.67) = 203.36 (maximum) - h(5.67) = 186.96 - h(8) = 70 The least value is **70**, and the greatest value is **203.36.**$$

To find when the heart-rate is decreasing most quickly, we need to find where h''(x) is 0, as this indicates a local maximum or minimum.

We find h''(x):

$h''(x) = 12x - 56$ Set this to 0:

$12x - 56 = 0 \Rightarrow x = \frac{56}{12} = 4.67$

Calculating the time in minutes and seconds, it is approximately 4 minutes and 40 seconds.

Since Bruno's heart-rate is always 15 BPM more than Hannah's:

$b(x) = h(x) + 15$ Thus: $b'(x) = h'(x).$

Karen's heart-rate is always 10% less than Hannah's:

$k(x) = 0.9h(x)$ Thus: $k'(x) = 0.9h'(x).$

We know:

= 1.2(2x^3 - 28x^2 + 105x + 70) \ = 2.4x^3 - 33.6x^2 + 126x + 84$$ Thus, the coefficients are: a = 2.4, b = -33.6, c = 126, d = 84.