| Date | May 2018 | Marks available | 4 | Reference code | 18M.1.hl.TZ2.5 |
| Level | HL only | Paper | 1 | Time zone | TZ2 |
| Command term | Show that | Question number | 5 | Adapted from | N/A |
Question
The geometric sequence u1, u2, u3, … has common ratio r.
Consider the sequence \(A = \left\{ {{a_n} = {\text{lo}}{{\text{g}}_2}\left| {{u_n}} \right|{\text{:}}\,n \in {\mathbb{Z}^ + }} \right\}\).
Show that A is an arithmetic sequence, stating its common difference d in terms of r.
A particular geometric sequence has u1 = 3 and a sum to infinity of 4.
Find the value of d.
Markscheme
METHOD 1
state that \({u_n} = {u_1}{r^{n - 1}}\) (or equivalent) A1
attempt to consider \({{a_n}}\) and use of at least one log rule M1
\({\text{lo}}{{\text{g}}_2}\left| {{u_n}} \right| = {\text{lo}}{{\text{g}}_2}\left| {{u_1}} \right| + \left( {n - 1} \right){\text{lo}}{{\text{g}}_2}\left| r \right|\) A1
(which is an AP) with \(d = {\text{lo}}{{\text{g}}_2}\left| r \right|\) (and 1st term \({\text{lo}}{{\text{g}}_2}\left| {{u_1}} \right|\)) A1
so A is an arithmetic sequence AG
Note: Condone absence of modulus signs.
Note: The final A mark may be awarded independently.
Note: Consideration of the first two or three terms only will score M0.
[4 marks]
METHOD 2
consideration of \(\left( {d = } \right){a_{n + 1}} - {a_n}\) M1
\(\left( d \right) = {\text{lo}}{{\text{g}}_2}\left| {{u_{n + 1}}} \right| - {\text{lo}}{{\text{g}}_2}\left| {{u_n}} \right|\)
\(\left( d \right) = {\text{lo}}{{\text{g}}_2}\left| {\frac{{{u_{n + 1}}}}{{{u_n}}}} \right|\) M1
\(\left( d \right) = {\text{lo}}{{\text{g}}_2}\left| r \right|\) A1
which is constant R1
Note: Condone absence of modulus signs.
Note: The final A mark may be awarded independently.
Note: Consideration of the first two or three terms only will score M0.
attempting to solve \(\frac{3}{{1 - r}} = 4\) M1
\(r = \frac{1}{4}\) A1
\(d = - \,2\) A1
[3 marks]
