StudioVeena.com Forums Discussions Xpole hex screw stuck

  • Xpole hex screw stuck

    Posted by AngelVonSpin on January 29, 2013 at 7:16 am

    Hi, I am trying to dismantle my xpole and the hex screws are stuck in a couple of places so I can’t undo the xjoint, . One is very tight and can’t be undone, another the hex screw seems to be threaded so the Allen key cant lock on and turn the screw. Can anyone help with advice? Thanks

    AngelVonSpin replied 11 years, 9 months ago 5 Members · 9 Replies
  • 9 Replies
  • Mary Ellyn

    Member
    January 29, 2013 at 10:37 am

    If your allen key can actually get into the hole all the way into the hex screw are you certain you are turning the correct direction? What your describing is that one is stripped and the other won't turn so first consider if you are by chance turning it the wrong way?

    If not then the way to get stuck joints out is to insert a broomstick inside the other end of the pole, turn it over and pound the joint out by pounding into the ground. Personally I recommend using metal conduit instead of a wooden broom handle.

  • Mary Ellyn

    Member
    January 29, 2013 at 10:38 am

    By the way…this method can ruin your XJoints and you may need to replace them but sometimes it's the only way to get them out of the tube.

  • chemgoddess1

    Member
    January 29, 2013 at 10:54 am

    You will need to replace your X Joints (they run about $20).  If the hex is stripped (as it sounds as it is) there is no way to replace that as it is attached inside the spreader.  Use ME's technique to get the pieces apart… here is the video of the technique: http://www.youtube.com/watch?v=2M3jmHUosR0

     

  • Mary Ellyn

    Member
    January 29, 2013 at 11:18 am

    Thanks Chemmie…for some reason I couldn't find that video!

  • BACE16

    Member
    January 29, 2013 at 11:34 am

    If it's just the screws that are stuck and the joint isn't twisted, put something over the end of the allen key to make it longer.  I have that problem and called Xpole, they said to put another xjoint over the handle of the allen key.  It gives you a better grip and more torque so you can unscrew it easier.

  • AngelVonSpin

    Member
    January 29, 2013 at 3:51 pm

    One is stripped and one is too tight for me to release , I will try what’s recommended. I was thinking of getting an xstage but am starting to question if stuck x joints are common as it would make putting the stage up and down difficult

  • chemgoddess1

    Member
    January 30, 2013 at 6:51 am

    If the X Joints are tightened correctly and checked regularly you should not have a problem with them.  How many of us loosen and retighten them regularly?  How many of us even check our poles regularly?

     

    I have set up and torn down numerouis X Stages and never had an issue with the joints (when I set them up).  I did have issues when other people set them up though.

     

    Read the instructions.  Check them regularly.

  • X Pole Tech

    Member
    February 1, 2013 at 10:37 am

    Removal of Rounded Hex Screws in X-Poles

    The X-Pole Tech Team has found that the best way to remove rounded hex screws is not an extractor – which can be used as a last resort – but a Star (Torx) socket driver and a ratchet/socket wrench. Photo Below.

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

    The Star (Torx) socket can be found at most hardware stores, Torx is the official name for the product. There are 2x sizes of Star used for X-Poles a T27 for the Static/Spinning and Adjuster hex screws and T30 for the main hex X-Joint screw.

    It is important that you use a Socket style Star unit (as per the photo – there are different shaped bodies) as the Star shaft needs driving into the Hex screw hole with a hammer.

    Take the Star (Torx) socket, ensure it is at 90° to the screw hole and drive it into the hole as far as possible with a hammer. Be careful not to miss and hit your pole tube!!!

    With the Star socket well driven in (especially with the X-Joint screw – make sure it goes in all the way) carefully attached a socket wrench, being sure you do not disturb the socket and loosen it and gently and progressively turn it Counter Clockwise. That is the opposite way to a clock hand!

    The force must be applied gently and progressively, DO NOT jerk or quickly move the wrench, as this could cause the star to further round off the screw hole!

    The Tech Team are able to remove 99% of the rounded Hex we encounter quickly and easily with this method.

    If your screws are damaged in anyway please replace them immediately. Additional screws can be purchased for your local X-Pole distributor.

    Hope this helps.

    X-Pole Tech Team

  • AngelVonSpin

    Member
    February 2, 2013 at 4:11 am

    Thank you x poke tech x

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