misli

Discussion in 'Physics & Math' started by msbiljanica, Dec 20, 2016.

  1. msbiljanica Registered Senior Member

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    76
    \(A_1\) - center ball

    \(A_1 A_2\) - radius ball

    \(A_1A_7A_8\) - circular arc

    \(A_1A_9A_{10}\) - circular arc three times higher than \(A_1A_7A_8\) \(A_1A_7A_8=A_1A_9A_{11}=A_1A_{11}A_{12}=A_1A_{12}A_{10}\)

    \(A_1A_2A_5\) - circular arc

    \(A_1A_2A_3=A_1A_3A_4=A_1A_4A_5\) , points \(A_2 , A_3 , A_4 , A_5\) on the best circle the ball (or sphere)

    \(A_1A_6A_2=A_1A_6A_3=A_1A_6A_4=A_1A_6A_5\) - circular arcs , are circular arcs on a spher

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    whether the circular arc that looks like straigh ?
     
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  3. DaveC426913 Valued Senior Member

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    I recognize that English is not your first language, and that is not a problem, but I think we need a little more description of the actual question you are asking. Can you rephrase?

    Also, your subject line is non-descriptive.
     
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  5. msbiljanica Registered Senior Member

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    blame the google translator

    I found the process of proportion angles
    However, I will gradually become familiar with the procedures of


    when we look at the top sphere of circular arcs \(A_1A_6A_2,A_1A_6A_3,A_1A_6A_4,A_1A_6A_5\) - seem straight line\(A_1A_2,A_1A_3,A_1A_4,A_1A_5\) or \(A_6A_2,A_6A_3,A_6A_4,A_6A_5\)

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  7. DaveC426913 Valued Senior Member

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    OK. What's your point?
     
  8. msbiljanica Registered Senior Member

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    trisection angle and n-regular polygon using a compass and straightedge

    tendon \(A_7A_8\) , \(A_9A_{10}\) ,\(A_{11}A_{12}\) arcs are parallel to each other

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  9. James R Just this guy, you know? Staff Member

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    39,397
    Please post your method for trisecting an angle using compass and straightedge. A list of the steps that you use would be good.

    Thankyou.
     
  10. msbiljanica Registered Senior Member

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    76
    - point \(A_1\)
    - compass , from point \(A_1\) , circular arc \(A_2A_5\)
    - straightedge , in points \(A_1 , A_2\) , straight line \(A_1A_2\)
    - straightedge , in points \(A_1 , A_5\) , straight line \(A_1A_5\)
    - point \(A_7\) , requirement \(A_1 A_7<\frac{A_1A_2}{3}\)
    - compass \(A_1 , A_7\) , from point \(A_1 \) , point \(A_8\)
    - straightedge , in points \(A_7, A_8\) , straight line \(A_7A_8\)
    - bisection circular arc \(A_2A_5\) , piont \(B_1\)
    - straightedge , in points \(A_1, B_1\) , straight line \(A_1B_1\) , point \(B_2\)

    - compass \(A_1A_2\) , from point \(A_1\) , circular arc \(A_9B_3\)
    - compass \(A_7A_8\) , from point \(A_9\) , point \(A_{11}\)
    - compass \(A_7A_8\) , from point \(A_{11}\) , point \(A_{12}\)
    - compass \(A_7A_8\) , from point \(A_{12}\) , point \(A_{10}\)
    - straighedge , in point \(A_9 ,A_{10}\) , straigt line \(A_9A_{10}\)
    - bisection circular arc \(A_9A_{10}\) , piont \(B_4\)
    - straightedge , in points \(A_1, B_4\) , straight line \(A_1B_4\) , point \(B_5\)

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    To be continued ...
     
  11. James R Just this guy, you know? Staff Member

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    39,397
    I don't understand your notation here.

    Explain how A2 is related to the arc A9B3.
     
  12. James R Just this guy, you know? Staff Member

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    39,397
    Probably for the same reason, I don't understand this, either. How are points A7,A8 and A9 used to determine the location of A11?
     
  13. msbiljanica Registered Senior Member

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    76
    - view http://www.sciforums.com/attachments/a-3d-sfera-png.1261/ , what is on the ball switch to plane

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    - \(A_1\) the center of the circle, whose parts are circular arcs \(A_7A_8\) ,\(A_9A_{10}\), \(A_2A_5\)
    - \(A_9B_3\) , We know that the circular arc three times higher than \(A_7A_8\) ,since we do not know what the arc is listed point \(B_3\)
    - point \(A_2\) has nothing to do with the circular arc \(A_9B_3\)
    - \(A_9A_{10}\) - circular arc three times higher than \(A_7A_8\) ,\(A_7A_8=A_9A_{11}=A_{11}A_{12}=A_{12}A_{10}\)

    I hope that you understand
     
  14. James R Just this guy, you know? Staff Member

    Messages:
    39,397
    Is it your assertion that the points A9, A11, A12 and A10 are equally spaced and therefore that angles such as A9A1A11 and A11A1A12 are equal?

    It is not clear to me how you split the arc A9B3 into three equal parts using the compass and straightedge.

    Are you saying that A1A7 has length (1/3) A1A2? If so, tell me how you did the 1/3 division using compass and straightedge.
     
  15. msbiljanica Registered Senior Member

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    76
    ball
    arc \( A_7A_8=A_9A_{11}=A_{11}A_{12}=A_{12}A_{10}\)
    \( A_9A_{11}+A_{11}A_{12}+A_{12}A_{10}=A_9A_{10}\)
    \( A_2A_3=A_3A_4=A_4A_5\)
    \( A_2A_3+A_3A_4+A_4A_5=A_2A_5\)
    \( A_6A_2=A_6A_3=A_6A_4=A_6A_5\)
    angle \( A_7A_1A_8=A_9A_1A_{11}=A_{11}A_1A_{12}=A_{12}A_1A_{10}\)
    \( A_9A_1A_{11}+A_{11}A_1A_{12}+A_{12}A_1A_{10}=A_9A_1A_{10}\)
    \( A_2A_1A_3=A_3A_1A_4=A_4A_1A_5\)
    \( A_2A_1A_3+A_3A_1A_4+A_4A_1A_5=A_2A_1A_5\)
    \( A_6A_1A_2=A_6A_1A_3=A_6A_1A_4=A_6A_1A_5\)

    arc \( A_9B_3\) is not divided into three parts , It is applied to tendons \( A_7A_8\) three times , to give a tendon \( A_9A_{10}\)
    proportions staight line is known in primary school , I gave \( A_1A_7<\frac{A_1A_2}{3}\) , points \( A_{11}A_{12}\) should be in angle \( A_2A_1A_5\) in plane
     
  16. msbiljanica Registered Senior Member

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    76
    that's the way, without the knowledge of what is happening in the sphere of


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    - given the angle \(C_1C_2C_3\)

    - straightedge and compass , straight line \(C_2C_3\) , is divided into two equal parts, point \(C_4\)

    - straightedge and compass , straight line \(C_2C_4\) , is divided into two equal parts, point \(C_5\)

    - compass \(C_2C_5\) , from the point \(C_2\), point \(C_6\)

    - straightedge and compass, angle bisection \(C_1C_2C_3\) , point \(C_7\)

    - straightedge , straight line \(C_2C_7\)



    - compass \(C_2C_3\) , from the point \(C_2\) , arc \(C_3C_1\)

    - compass \(C_5C_6\) , from the point \(C_3\) , point \(D_1\)

    - compass \(C_5C_6\) , from the point \(D_1\) , point \(D_2\)

    - compass \(C_5C_6\) , from the point \(D_2\) , point\(D_3\)

    - straightedge , straight line \(C_3D_3\)

    - straightedge and compass, angle bisection \(C_3D_3\) , point \(D_4\)

    - straightedge , straight line \(C_2D_4\) , point \(D_5\)



    YOU TRY TO KEEP ... Figure down

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  17. msbiljanica Registered Senior Member

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    - straightedge and compass , perpendicular to the line \(a_1\) straight line \(C_2C_7\)
    - compass \(C_3D_5\) , in point \(C_2\) , points \(E_1 and E_2\)
    - straightedge and compass , perpendicular to the line \(a_2\) line \(a_1\) , point \(E_3\)
    - straightedge and compass , perpendicular to the line \(a_3\) line \(a_1\) , point \(E_3\)
    - straighedge , straight line \(E_3E_4\) , point \(E_5\)
    - straightedge and compass , perpendicular to the line \(a_4\) straight line \(C_5C_6\) , point \(E_6\)
    - straightedge and compass , perpendicular to the line \(a_5\) straight line \(C_5C_6\) , point \(E_7\)

    YOU TRY TO KEEP ... Figure down

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  18. msbiljanica Registered Senior Member

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    - straightedge and compass , perpendicular \( b_1\) straight line \(C_2D_5\)
    - straightedge and compass , perpendicular \(b_2\) on the \(b_1\) from point \(D_3\) , straight line \(D_6D_3\)
    - straightedge and compass , perpendicular \(b_3\) on the \(b_1\) from point \(D_2\) , straight line \(D_7D_2\)

    YOU TRY TO KEEP ... Figure down
    \(F_1\) is located on the arc \(C_3C_1 \), \(C_3F_1=C_1F_1\)

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  19. msbiljanica Registered Senior Member

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    - straightedge , straight line \(C_2F_1\) , \(C_2F_1=C_2C_3\)
    - compass \(C_2E_5\) , from point \(C_2\) , point\(F_3\)
    - straightedge and compass , straight line the normal to \(C_2F_3\)
    - compass \(D_6D_3\) , from point \(C_2\) , point\(F_4\)
    - straightedge ,straight line extension \(C_2F_4\)
    - compass \(D_7D_2\) , from point \(C_2\) , point \(F_5\)
    - straightedge and compass , normal from point \(F_5\) na duž \(C_2F_1\) , point \(F_6\)

    Solution - in the picture below

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  20. msbiljanica Registered Senior Member

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    - compass \(C_2F_6\) , from point \(E_6\) , point \(A_{12}\)
    - compass \(C_2F_6\) , from point \(E_7 \), point \(A_{13}\)
    - straightedge , semi-line \(C_2A_{11}\)
    - straightedge , semi-line \(C_2A_{12}\)

    trisection is complete, any error !!!

    this is true for angles \(180^o<\alpha<0^o \), larger angles of first division of the \(180^o\)

    are you ready for the process of construction of the regular polygon
     
  21. msbiljanica Registered Senior Member

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    76
    valid for the odd \(a={3,5,7,9,11,...}\)


    Proper ninth angle

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    - straight line \(A_1A_2\)
    - straightedge and compass ,\(\frac{A_1A_2}{10}\) , point \(A_4\) , \(a+1\) , \(a=9. followed by .9+1=10\)
    - straightedge and compass , \(A_1A_3\) normal \(A_1A_2 \) , angle \(C_3C_1C_2=90^o\)
    - compass \(A_1A_4\) , from point \(A_5\)
    - straightedge , straight line \(A_4A_5\)
    - straightedge and compass , bisection arc \(A_2A_3\) , point \(A_6\)

    YOU TRY TO KEEP ... Figure down

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  22. origin Heading towards oblivion Valued Senior Member

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    This is making no sense to me. I don't know if it is just a language problem or what.

    How can you divide lines into 2 equal parts with just a straight edge and a compass? Seems to me that you are using a ruler somewhere in this analysis.
     
  23. msbiljanica Registered Senior Member

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    76
    the proportion of straight line (to be in Serbia to enter primary school in mathematics)

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    - straightedge , straight line \(AB\)
    - straightedge , straight line \(AC\) , angle \(CAB\)
    - point \(D\)
    - compass \(AD\) , from point \(D\) , point \(F\)
    - compass \(AD\) , from point \(F\) , point \(H\)
    - compass \(AD\) , from point \(H\) , point \(J\)
    - compass \(AD\) , from point \(A\) , point \(E\)
    - compass \(AD\) , from point \(E\) , point \(G\)
    - compass \(AD\) , from point \(G\) , point \(I\)
    - compass \(AD\) , from point \(I\) , point \(K\)

    - straightedge , straight line \(ED\)
    - straightedge , straight line \(GF\)
    - straightedge , straight line \(IH\)
    - straightedge , straight line \(KJ\)

    - compass \(ED\), from point \(F\) , point \(L\)
    - compass \(ED\), from point \(H\) , point \(M\)
    - compass \(ED\), from point \(M\) , point \(N\)
    - compass \(ED\), from point \(J\) , point \(O\)
    - compass \(ED\), from point \(O\) , point \(P\)
    - compass \(ED\), from point \(P\) , point \(Q\)

    To be continued ...
     

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