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Small Spring Bar Removal Tool/Fork

  1. jimmyd13 Jun 27, 2018

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    I know that half a dozen people here will know this off the top of their heads ...

    ... is there a Bergeon replacement fork or a tool that's smaller than 3mm (ideally 2mm or less)? Failing that, do you recommend another spring bar removal tool? I'm trying to remove a bracelet and the opening in the end links is barely 2mm - obviously I don't want to have to damage the endlinks (a nice pair of #4s).

    Thanks
     
  2. Dan S Jun 27, 2018

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    Tiny screwdrivers work well.
     
  3. jimmyd13 Jun 27, 2018

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    Yup
    IMG_20180627_1801568.jpg
     
    Speedy2254, Dan S and GuiltyBoomerang like this.
  4. Dan S Jun 27, 2018

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    [​IMG]
     
    jimmyd13 likes this.
  5. omegastar Jun 27, 2018

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  6. Dan S Jun 27, 2018

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    These are helpful for my aging eyes.

    https://smile.amazon.com/gp/product/B0015IS6K2/ref=oh_aui_search_detailpage?ie=UTF8&psc=1

    Screen Shot 2018-06-27 at 11.22.12 AM.png
    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  7. ag986 Jun 27, 2018

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    The Bergeron 6767-F has a 1.20 mm forked end.
     
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  8. jimmyd13 Jun 27, 2018

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    Aha! That's what I'm after - I have the "S". Thanks.
     
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