Date | May Specimen | Marks available | 2 | Reference code | SPM.2.sl.TZ0.6 |
Level | SL only | Paper | 2 | Time zone | TZ0 |
Command term | Show that | Question number | 6 | Adapted from | N/A |
Question
Nadia designs a wastepaper bin made in the shape of an open cylinder with a volume of \(8000{\text{ c}}{{\text{m}}^3}\).
Nadia decides to make the radius, \(r\) , of the bin \(5{\text{ cm}}\).
Merryn also designs a cylindrical wastepaper bin with a volume of \(8000{\text{ c}}{{\text{m}}^3}\). She decides to fix the radius of its base so that the total external surface area of the bin is minimized.
Let the radius of the base of Merryn’s wastepaper bin be \(r\) , and let its height be \(h\) .
Calculate
(i) the area of the base of the wastepaper bin;
(ii) the height, \(h\) , of Nadia’s wastepaper bin;
(iii) the total external surface area of the wastepaper bin.
State whether Nadia’s design is practical. Give a reason.
Write down an equation in \(h\) and \(r\) , using the given volume of the bin.
Show that the total external surface area, \(A\) , of the bin is \(A = \pi {r^2} + \frac{{16000}}{r}\) .
Write down \(\frac{{{\text{d}}A}}{{{\text{d}}r}}\).
(i) Find the value of \(r\) that minimizes the total external surface area of the wastepaper bin.
(ii) Calculate the value of \(h\) corresponding to this value of \(r\) .
Determine whether Merryn’s design is an improvement upon Nadia’s. Give a reason.
Markscheme
(i) \({\text{Area}} = \pi {(5)^2}\) (M1)
\( = 78.5{\text{ (c}}{{\text{m}}^2}{\text{)}}\) (\(78.5398 \ldots \)) (A1)(G2)
Note: Accept \(25\pi \) .
(ii) \(8000 = 78.5398 \ldots \times h\) (M1)
\(h = 102{\text{ (cm)}}\) (\(101.859 \ldots \)) (A1)(ft)(G2)
Note: Follow through from their answer to part (a)(i).
(iii) \({\text{Area}} = \pi {(5)^2} + 2\pi (5)(101.859 \ldots )\) (M1)(M1)
Note: Award (M1) for their substitution in curved surface area formula, (M1) for addition of their two areas.
\( = 3280{\text{ (c}}{{\text{m}}^2}{\text{)}}\) (\(3278.53 \ldots \)) (A1)(ft)(G2)
Note: Follow through from their answers to parts (a)(i) and (ii).
No, it is too tall/narrow. (A1)(ft)(R1)
Note: Follow through from their value for \(h\).
\(8000 = \pi {r^2}h\) (A1)
\(A = \pi {r^2} + 2\pi r\left( {\frac{{8000}}{{\pi {r^2}}}} \right)\) (A1)(M1)
Note: Award (A1) for correct rearrangement of their part (c), (M1) for substitution of their rearrangement into area formula.
\( = \pi {r^2} + \frac{{16000}}{r}\) (AG)
\(\frac{{{\text{d}}A}}{{{\text{d}}r}} = 2\pi r - 16000{r^{ - 2}}\) (A1)(A1)(A1)
Note: Award (A1) for \(2\pi r\) , (A1) for \( - 16000\) (A1) for \({r^{ - 2}}\) . If an extra term is present award at most (A1)(A1)(A0).
(i) \(\frac{{{\text{d}}A}}{{{\text{d}}r}} = 0\) (M1)
\(2\pi {r^3} - 16000 = 0\) (M1)
\(r = 13.7{\text{ cm}}\) (\(13.6556 \ldots \)) (A1)(ft)
Note: Follow through from their part (e).
(ii) \(h = \frac{{8000}}{{\pi {{(13.65 \ldots )}^2}}}\) (M1)
\( = 13.7{\text{ cm}}\) (\(13.6556 \ldots \)) (A1)(ft)
Note: Accept \(13.6\) if \(13.7\) used.
Yes or No, accompanied by a consistent and sensible reason. (A1)(R1)
Note: Award (A0)(R0) if no reason is given.