Tiling in a cubicle a little larger than the tray?

Discussion in 'Tilers' Talk' started by SteveMJ, Jul 3, 2012.

  1. SteveMJ

    SteveMJ Member

    I will be fitting a 900 mm wide shower tray in a gap that is 920 mm wide, I would like some advice as to how to deal with the 10 mm gap that will remain either side.  The shower enclosure will be tiled on 3 sides and have a glass door fitted on the fourth side, the front.

    What I propose to do at the moment is to pack out the width of the tray to fill the gap between the tray and the wall.  When I tile I will cut a thin strip of tile (say about 15 mm) to cover the packing and overlap the edge of the tray and fit these horizontally. Tile the wall as per normal with the lowest tiles resting on the horizontal strip of tiles.  The tiles proposed to be fitted are porcelain and I think that because they are solid colour I can bevel or round off the inner edge.

    I will finish with silicone sealant where the horizontal tile strips meet the shower tray and where the vertical tiles meet the horizontal ones.
    How is this as an approach?

    As this may not be clear here is a simplified diagram, I hope this is clear?

    Thanks, Steve

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
     
  2. G Brown

    G Brown New Member

    Very very bad idea. you are creating a ledge for water to dwell and creat black slimy mould. Just dot and dab a wall to reduce the gap or overboard with tile backer.
     
  3. SteveMJ

    SteveMJ Member

    Of course the ledge will collect water - I should have thought of that, even though I would have added a small slope.

    I am not keen on adding a two whole plaster sheets to give 10 mm fill on each side (or spacing it out to give 20 mm one side).  This approach takes time and cost (£) as well as reducing the available shower cubicle space.

    Could I pack behind the lower row of tiles to gives a steep slope. i.e the bottom of the lowest row of tiles being packed out by ~10 mm to overlap the shower tray similar to a normal tiling arrangement.

    UPDATE:

    I've now added a a diagram. If the tile is 200 mm high and the protrusion is 10 mm then the off-vertical angle is less than 3 degrees - I'm sure someone could sing at that point :)  (the joys of trigonometry!)

    So that is pretty close to vertical as far as the water running down is concerned.


    As a matter of curisoity what would the approach be if the gap was not 10 mm, but say 100 mm?

    Thanks, Steve
    [​IMG]
     
  4. Captain Leaky

    Captain Leaky New Member

    Do as advised, you want straight flat walls in a shower. You have to fix doors/cubicle too.
     
  5. Mr. Handyandy

    Mr. Handyandy Screwfix Select

    Upstands.


    Mr. HandyAndy - Really
     
  6. Captain Leaky

    Captain Leaky New Member

    Upstands  = Cowboy.
     
  7. Mr. Handyandy

    Mr. Handyandy Screwfix Select

    Upstands = works.
     
  8. Captain Leaky

    Captain Leaky New Member

    for a while....
     
  9. SteveMJ

    SteveMJ Member

    I added some words and a diagram above to try to explain further my 'improved' approach.

    I am not understanding the comments about an upstanding - aren't I proposing an upstanding made out of a row of slightly angled tiles?

    Thanks for your continued help, Steve
     
  10. G Brown

    G Brown New Member

    Steve. Don't bodge it. Just build the wall out, its cheap and easy too
     
  11. Jeepers, is there really no other solution to this? I'd be really *  having to add a further couple of sheets to reduce the cubcile size just so's the tiles sit on t'tray. That's so carp.

    Isn't there an 'L'-shaped trim that sits against the wall and t'top of t'tray before tiling, with tiles then fitted at steve suggests in his first post - with slightly-slopping wee ones, or a purpose-made trim?

    What I have done with this exact situation is to tile down the sides beyond the tray top and then fit the tray. The resulting gap was now down to about 5mm - which was deep-filled with sili to just below tray top level, allowed to fully set, and then a further - decor - bead of sili run along t'top. Ok, that top bead was bigger than yer average sili bead, but since it was all white, and was - of course - done to a high standard, then it worked.

    Mind you, se7en years on and the mould loves it... :(
     
  12. SteveMJ

    SteveMJ Member

    Devil,

    I thought my modified appraoch addressed the aspect of the water sitting on a ledge.  The bringing in of the lower tiles by a few degrees off vertical would allow the water to flow into the tray.

    Steve
     
  13. HOTDOG ø

    HOTDOG ø Active Member

    Never make shower walls slant or build a ledge.

    Firstly you need flat walls to fix the door/cubicle too, secondly it will go mouldy then leak.

    ALWAYS pack out the wall. It is simple to do and inexpensive too.
     
  14. Sorry, Steve - I thought your sloping tiles was a bodge... :)

    However, there's nowt wrong with t'ledge. Providfed it's done proper, like.

    Too many jobsworths on here...

    "Always pack out..." ma botty.
     
  15. Captain Leaky

    Captain Leaky New Member

    Do what you want Steve but if the pros are advising don't bodge it........
     
  16. Mr. Handyandy

    Mr. Handyandy Screwfix Select

    Upstand.

    Mr. HandyAndy - Really
     
  17. Is there a purpose-made upstand for this type of job, Mr Ha?


    Cap'n, never ever forget that the pro is suggesting otherwise...

    If Steve silis down t'gap betwixt tray and t'walls, then he won;t have to worry about leaks in any case. (Unless the walls are porous, of course. My solution of tiling down beyond tray top before sili was a masterstroke...
     
  18. Mr. Handyandy

    Mr. Handyandy Screwfix Select

  19. G Brown

    G Brown New Member

    Upstands are for dafty DIYers Andy. You should know better.

    The real point is the correct way of doing it -  altering the wall -  is so simple, easy and cost effective that why on earth would you faff around with ledges/upstands/sloping bits which onlly hold water and mould and make frame fitment akward?

    it puzzles me why you would want to make a simple job difficult?
     
  20. Hmmm, 'have to say I'm not so impressed by that stuff, Mr Ha, in the long term.

    Mr GB. Altering the wall, whilst being fairly simple, is not 'easy' or cost-effective. So why on earth would you reduce the size of the cubicle for no good reason? Could it be, perhaps, that the 'pros' only have one method and will stick religiously to it?

    I can certainly see that, as a pro job carried out for a paying customer, you should stick with the tried and trusted method. But Steve is DIYing this for his own use (I understand...). What he proposes to do will work, and saves on silliness.

    (Still prefer his first solution, tho'...)
     

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