**(a)**
$I_n = \int_0^3 x^{n-1}(x\sqrt{16+x^2})\,\mathrm{d}x$ Correct splitting *and* use of parts [M1]

$= \left[x^{n-1} \cdot \dfrac{(16+x^2)^{\frac{3}{2}}}{3}\right]_0^3 - \int_0^3(n-1)x^{n-2}\dfrac{(16+x^2)^{\frac{3}{2}}}{3}\,\mathrm{d}x$ [A1]

$= 3^{n-2} \cdot 125 - \left(\dfrac{n-1}{3}\right)\int_0^3 x^{n-2}(16+x^2)\sqrt{16+x^2}\,\mathrm{d}x$ Method to get 2nd integral of correct form [M1]

$= 3^{n-2} \cdot 125 - \left(\dfrac{n-1}{3}\right)\{16I_{n-2} + I_n\}$ [i.e. reverting to $I$'s in 2nd integral] [M1]

$\Rightarrow 3I_n = 3^{n-1} \cdot 125 - 16(n-1)I_{n-2} - (n-1)I_n$ Collecting up $I_n$s [M1]

$(n+2)I_n = 125 \times 3^{n-1} - 16(n-1)I_{n-2}$ **AG** [A1]

**Total: 6 marks**

**(b)(i)**
Spiral (with $r$ increasing) [B1]

From $O$ to just short of $\theta = \pi$ [B1]

**Total: 2 marks**

**(b)(ii)**
$r = \frac{1}{4}\theta^4 \Rightarrow \dfrac{\mathrm{d}r}{\mathrm{d}\theta} = \theta^3$ and $r^2 + \left(\dfrac{\mathrm{d}r}{\mathrm{d}\theta}\right)^2 = \frac{1}{16}\theta^8 + \theta^6$ [M1A1]

$L = \int_0^3 \frac{1}{4}\theta^3\sqrt{16+\theta^2}\,\mathrm{d}\theta \left(= \frac{1}{4}I_3\right)$ [M1A1]

Now $I_1 = \left[\dfrac{1}{3}(16+x^2)^{\frac{3}{2}}\right]_0^3 = \dfrac{61}{3}$ [B1]

and $5I_3 = 125 \times 9 - 16 \times 2\left(\dfrac{61}{3}\right) = \dfrac{1423}{3}$ or $474\tfrac{1}{3}$ Use of given reduction formula [M1]

so that $L = \dfrac{1}{20} \times \dfrac{1423}{3} = \dfrac{1423}{60}$ or $23\dfrac{43}{60}$ ft only from suitable $k\,I_3$ [A1, A1ft]

**Total: 7 marks**