Date | May 2015 | Marks available | 4 | Reference code | 15M.1.sl.TZ1.3 |
Level | SL only | Paper | 1 | Time zone | TZ1 |
Command term | Solve | Question number | 3 | Adapted from | N/A |
Question
Given that \({2^m} = 8\) and \({2^n} = 16\), write down the value of \(m\) and of \(n\).
Hence or otherwise solve \({8^{2x + 1}} = {16^{2x - 3}}\).
Markscheme
\(m = 3,{\text{ }}n = 4\) A1A1 N2
[2 marks]
attempt to apply \({({2^a})^b} = {2^{ab}}\) (M1)
eg\(\;\;\;6x + 3,{\text{ }}4(2x - 3)\)
equating their powers of \(2\) (seen anywhere) M1
eg\(\;\;\;3(2x + 1) = 8x - 12\)
correct working A1
eg\(\;\;\;8x - 12 = 6x + 3,{\text{ }}2x = 15\)
\(x = \frac{{15}}{2}\;\;\;(7.5)\) A1 N2
[4 marks]
Total [6 marks]
Examiners report
Indices laws were well understood with many candidates solving the equation correctly. Some candidates used logs, which took longer, and errors crept in.
Indices laws were well understood with many candidates solving the equation correctly. Some candidates used logs, which took longer, and errors crept in.