Date | May 2016 | Marks available | 2 | Reference code | 16M.1.sl.TZ1.5 |
Level | SL only | Paper | 1 | Time zone | TZ1 |
Command term | Show that | Question number | 5 | Adapted from | N/A |
Question
Consider \(f(x) = {x^2} + qx + r\). The graph of \(f\) has a minimum value when \(x = - 1.5\).
The distance between the two zeros of \(f\) is 9.
Show that the two zeros are 3 and \( - 6\).
Find the value of \(q\) and of \(r\).
Markscheme
recognition that the \(x\)-coordinate of the vertex is \( - 1.5\) (seen anywhere) (M1)
eg\(\,\,\,\,\,\)axis of symmetry is \( - 1.5\), sketch, \(f'( - 1.5) = 0\)
correct working to find the zeroes A1
eg\(\,\,\,\,\,\)\( - 1.5 \pm 4.5\)
\(x = - 6\) and \(x = 3\) AG N0
[2 marks]
METHOD 1 (using factors)
attempt to write factors (M1)
eg\(\,\,\,\,\,\)\((x - 6)(x + 3)\)
correct factors A1
eg\(\,\,\,\,\,\)\((x - 3)(x + 6)\)
\(q = 3,{\text{ }}r = - 18\) A1A1 N3
METHOD 2 (using derivative or vertex)
valid approach to find \(q\) (M1)
eg\(\,\,\,\,\,\)\(f'( - 1.5) = 0,{\text{ }} - \frac{q}{{2a}} = - 1.5\)
\(q = 3\) A1
correct substitution A1
eg\(\,\,\,\,\,\)\({3^2} + 3(3) + r = 0,{\text{ }}{( - 6)^2} + 3( - 6) + r = 0\)
\(r = - 18\) A1
\(q = 3,{\text{ }}r = - 18\) N3
METHOD 3 (solving simultaneously)
valid approach setting up system of two equations (M1)
eg\(\,\,\,\,\,\)\(9 + 3q + r = 0,{\text{ }}36 - 6q + r = 0\)
one correct value
eg\(\,\,\,\,\,\)\(q = 3,{\text{ }}r = - 18\) A1
correct substitution A1
eg\(\,\,\,\,\,\)\({3^2} + 3(3) + r = 0,{\text{ }}{( - 6)^2} + 3( - 6) + r = 0,{\text{ }}{3^2} + 3q - 18 = 0,{\text{ }}36 - 6q - 18 = 0\)
second correct value A1
eg\(\,\,\,\,\,\)\(q = 3,{\text{ }}r = - 18\)
\(q = 3,{\text{ }}r = - 18\) N3
[4 marks]
Examiners report
As a ‘show that’ question, part a) required a candidate to independently find the answers. Again, too many candidates used the given answers (of 3 and \( - 6\)) to show that the two zeros were 3 and \( - 6\) (a circular argument). Those who were able to recognize that the \(x\)-coordinate of the vertex is \( - 1.5\) tended to then use the given answers and work backwards thus scoring no further marks in part a).
Answers to part b) were more successful with a good variety of methods used and correct solutions seen.