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wu :: forums    riddles    putnam exam (pure math) (Moderators: Icarus, Eigenray, william wu, Grimbal, SMQ, towr)    Trigonometry « Previous topic | Next topic » Pages: 1  Reply Notify of replies Send Topic Print    Author  Topic: Trigonometry  (Read 519 times) Radiohead_man Junior Member     Gender: Posts: 74 Trigonometry   « on: Dec 13th, 2004, 7:56am » Quote Modify Find all the values of a for which the series cos(a); cos(2a); cos(4a); cos(8a); ... cos(2na), ... consists of negative numbers only.     IP Logged I'm a reasonable man get off my case, get off my case. Barukh Uberpuzzler     Gender: Posts: 2276 Re: Trigonometry   « Reply #1 on: Dec 13th, 2004, 9:16am » Quote Modify on Dec 13th, 2004, 7:56am, Radiohead_man wrote: cos(a); cos(2a); cos(4a); cos(8a); ... cos(2na), ... Did you mean 2na ? IP Logged John_Gaughan Uberpuzzler Behold, the power of cheese!     Gender: Posts: 767 Re: Trigonometry   « Reply #2 on: Dec 13th, 2004, 12:58pm » Quote Modify Interesting. It seems that as n gets larger, a is restricted to larger and larger values. I am not sure if a converges on anything though. It appears not to, but my math skills only go up to Calculus III IP Logged x = (0x2B | ~0x2B) x == the_question Obob Senior Riddler     Gender: Posts: 489 Re: Trigonometry   « Reply #3 on: Dec 13th, 2004, 2:13pm » Quote Modify The condition that cos a < 0 implies that [pi]<a<2[pi] (if a is a solution to the problem then so is 2[pi]k+a for any integer).  Next, the condition that cos 2a < 0 implies that either [pi]/2<a<[pi] or 3[pi]/2<a<2[pi].  Taking into consideration the first restraint, we have 3[pi]/2<a<2[pi].   In general, the condition that cos 2^k a < 0 implies that a lies in one of the 2^k intervals of the form m[pi]/2^(k-1) +[pi]/2^k, for 0[le] m [le] (2^k)-1.  Taking into consideration the restrictions imposed from the inequalities, cos a < 0,..., cos 2^(k-1) a <0, this clearly implies that 2[pi]-[pi]/2^k < a < 2[pi].  But if a is any number in [0,2[pi]], then for some sufficiently large k, the inequality 2[pi]-[pi]/2^k < a < 2[pi] does not hold.  Therefore there are no such a. IP Logged Barukh Uberpuzzler     Gender: Posts: 2276 Re: Trigonometry   « Reply #4 on: Dec 13th, 2004, 11:08pm » Quote Modify on Dec 13th, 2004, 2:13pm, Obob wrote: Therefore there are no such a. What about a = 2n+1[pi]/3 ?   IP Logged Obob Senior Riddler     Gender: Posts: 489 Re: Trigonometry   « Reply #5 on: Dec 13th, 2004, 11:24pm » Quote Modify Wow I'm a complete idiot.  If you replace every instance of cos with sin in my above post, everything I said should be true. IP Logged Grimbal wu::riddles Moderator Uberpuzzler     Gender: Posts: 7527 Re: Trigonometry   « Reply #6 on: Dec 14th, 2004, 3:59am » Quote Modify on Dec 13th, 2004, 11:08pm, Barukh wrote: What about a = 2n+1[pi]/3 ?     Or (n[smiley=pm.gif]1/3)*2[pi] IP Logged Pages: 1  Reply Notify of replies Send Topic Print Forum Jump: ----------------------------- riddles -----------------------------  - easy   - medium   - hard   - what am i   - what happened   - microsoft   - cs => putnam exam (pure math)   - suggestions, help, and FAQ   - general problem-solving / chatting / whatever ----------------------------- general -----------------------------  - guestbook   - truth   - complex analysis   - wanted   - psychology   - chinese « Previous topic | Next topic »

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