Date | May 2011 | Marks available | 3 | Reference code | 11M.3.HL.TZ1.5 |
Level | Higher level | Paper | Paper 3 | Time zone | Time zone 1 |
Command term | Estimate and Show that | Question number | 5 | Adapted from | N/A |
Question
This question is about Hubble’s law and the age of the universe.
(i) State Hubble’s law.
(ii) State why Hubble’s law cannot be used to determine the distance from Earth to nearby galaxies, such as Andromeda.
(i) Show that \(\frac{1}{{{H_0}}}\) is an estimate of the age of the universe, where H0 is the Hubble constant.
(ii) Assuming H0 = 80 km s−1Mpc−1, estimate the age of the universe in seconds.
Markscheme
(i) recessional speed of a galaxy is directly proportional to distance from Earth/ v=H0d with symbols defined;
(ii) local velocity of Andromeda relative to Earth greater than (recessional) speed due to expansion of universe / OWTTE;
(i) relative speed between two points in universe separated by distance d is \(v = \frac{d}{T}\) where T is the age of the universe;
\(v = \frac{d}{T}\)=H0d therefore \(T = \frac{1}{{{H_0}}}\);
(ii) \(T = \frac{1}{{80}} \times \frac{{{{10}^6} \times 3.26 \times 9.46 \times {{10}^{15}}}}{{1000}} = 4 \times {10^{17}}\left( {\rm{s}} \right)\);
Do not deduct unit mark if seconds not given, as question asks for answer in seconds.