probability --- arcs

mr.wong · 2016-06-19 22:38:26

Inside the circumference E with length 1 unit of a circle ,
there are 2 arcs A with length 1/3 unit and B with length
1/2 unit . Both A and B can move freely along E , but there
is a point X at E such that A can get through X while B
cannot . Find the expected length of the overlapping portion
of the 2 arcs .

bobbym · 2016-06-20 00:13:44

Hi;

but there is a point X at E such that A can get through X while B cannot

I do not understand what this means, can you explain a bit more?

mr.wong · 2016-06-20 16:28:21

Hi bobbym ,

It means that there is a fixed point X lying in E which blocks B from
getting through it , thus B has to return its direction of moving , while A
is not affected by the existence of X , A can just get through it in moving .

bobbym · 2016-06-20 17:17:19

Hi;

So, it sort of bounces off that point?

mr.wong · 2016-06-20 18:28:35

Hi bobbym ,

When one end of B reaches the point X , then it
will stop there . ( also for X ) If B moves again then it can only move backwards . Whenever one end reaches X it will stop again . Thus X will never get inside of B .

mr.wong · 2016-06-25 15:44:54

The answer is just simply be 1/3 * 1/2 = 1/6 un ,
the point X plays no role in this problem and can
be neglected .
The case for an arc which can be blocked by a
point X in the circumference is just equivalent to the case for a small segment moving freely inside a large segment but must keep entirely inside it .
While an arc not affected by the existence of X is
equivalent to a small segment moving in a large
segment and permitted to exceed both ends of it .
( of course still keep touching with it )
For cases involving only one arc which can be blocked by X ,
the existence of X can be neglected ,
but it will be different if there are more than 1 such
arcs . For example , if there is an additional arc C
,say also with length 1/2 unit and moving inside E , which can also can be blocked by X . Then the expected length of the overlapping portion of A , B
and C will be 1/3 * 1/3 = 1/9 un . ( by formula )
In this case the existence of X cannot be neglected .
Otherwise if arc C can get through X during moving
, then the answer will be 1/2 * 1/2 * 1/3 = 1/12 un ,
in this case the point X can also be neglected .

thickhead · 2016-06-26 03:55:51

Does E form the complete circumference of the circle or only part of it? I thought E is also an arc.

mr.wong · 2016-06-26 15:35:17

Hi thickhead ,

E forms the complete circumference of the circle .

thickhead · 2016-06-26 17:44:38

Hi mr.wong,
Now I understand the situation. when there is no endlimit for the arc every point on the circumference has the same exposure to the arc and uniform probability at every point. On any addition of similar arc the probability of remaining on both is multiplied by each probability. However when there is an arc with end limit. Some points have more exposure and some less exposure but average probability is the same as limitless arc. when arc with stop at X is added interference of B and c produces probability of

this 1/3 has nothing to do with the first 1/3 of free arc A, a confusion created by your cunning narration.In fact if anther arc of length 1/2 stopping at X is added the probability would be 1/3*1/12=1/36

Math Is Fun Forum

#1 2016-06-19 22:38:26

probability --- arcs

#2 2016-06-20 00:13:44

Re: probability --- arcs

#3 2016-06-20 16:28:21

Re: probability --- arcs

#4 2016-06-20 17:17:19

Re: probability --- arcs

#5 2016-06-20 18:28:35

Re: probability --- arcs

#6 2016-06-25 15:44:54

Re: probability --- arcs

#7 2016-06-26 03:55:51

Re: probability --- arcs

#8 2016-06-26 15:35:17

Re: probability --- arcs

#9 2016-06-26 17:44:38

Re: probability --- arcs

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