The new pyramids are in your type 2 box. All fFlaps. Mind you, this is in addition to the blue pyramid bags, which I prefer well above the cardboard boxes or clear tubes. On Sat, Dec 10, 2011 at 9:33 AM, Terry Bailey Sr. <tbaileysr@xxxxxxxxx> wrote: > Ok I am confused. There are three types of boxes for games. > > 1. Two halves a lid and a bottom. > 2. Boxes like bicycle playing cards come in with a tuck flap. > 3. Boxes where each end is glued thus once opened does not recluse. > > > In my opinion number 1 is best followed by 2. 3 however is a huge mistake and never be > Used for a game. > > That being said I prefer pyramids to be in clear containers so you can get the colors you need for a given game. > > Sent from my iPad > > On Dec 10, 2011, at 9:02 AM, S Myers <iamthecheeze@xxxxxxxxx> wrote: > >> well, yes, that ... obviously that the 2-pieces boxes have glue, too. >> >> Or you could open the box top fFlaps at both ends, (leaving the glued >> edge still together) and the whole thing becomes a cardboard >> parallelogram which smooshes fFlat very nicely. And you can reclose >> the box-top fFlaps and get your box back in shape again. >> >> On Sat, Dec 10, 2011 at 8:43 AM, Terry Bailey Sr. <tbaileysr@xxxxxxxxx> wrote: >>> But they dont close back. Once you break the glu to open them they are done. >>> >>> Sent from my iPad >>> >>> On Dec 9, 2011, at 5:45 PM, S Myers <iamthecheeze@xxxxxxxxx> wrote: >>> >>>> I was surprised at fFirst too. But I think it makes good sense this >>>> way. You are less likely to have the box lid come off, and little >>>> pieces go everywhere. The two-piece boxes are perfect fFor card >>>> games, but the one-piece box is better fFor pyramids. And these boxes >>>> are easier to collapse down to fFlat, and still be able to reuse the >>>> box later. It's a good choice, really. >>>> >>>> On Fri, Dec 9, 2011 at 12:50 PM, Terry Bailey Sr. <tbaileysr@xxxxxxxxx> wrote: >>>>> Unfortunate >>>>> >>>>> Sent from my iPhone , that's why there are typo's. Smart phone but not smart >>>>> thumbs. >>>>> >>>>> >>>>> On Dec 9, 2011, at 12:18 PM, TheLoneGoldfish <thelonegoldfish@xxxxxxxxx> >>>>> wrote: >>>>> >>>>> They open like a normal box (flap at the thin side), instead of being a >>>>> tray/lid. >>>>> >>>>> On Fri, Dec 9, 2011 at 4:34 AM, Christopher Hickman <tophu@xxxxxxx> wrote: >>>>>> >>>>>> On Dec 8, 2011, at 5:05 PM, TheLoneGoldfish wrote: >>>>>> >>>>>> Also, thanks for keeping the box size the same for the 1 stash boxes as >>>>>> the other games' boxes. When I first saw they opened differently I was >>>>>> worried for a bit. >>>>>> >>>>>> >>>>>> How do they open? >>>>>> >>>>>> Topher >>>>>> >>>>>> _______________________________________________ >>>>>> Icehouse mailing list >>>>>> Icehouse@xxxxxxxxxxxxxxxxxxxx >>>>>> http://lists.looneylabs.com/mailman/listinfo/icehouse >>>>>> >>>>> >>>>> _______________________________________________ >>>>> Icehouse mailing list >>>>> Icehouse@xxxxxxxxxxxxxxxxxxxx >>>>> http://lists.looneylabs.com/mailman/listinfo/icehouse >>>>> >>>>> >>>>> _______________________________________________ >>>>> Icehouse mailing list >>>>> Icehouse@xxxxxxxxxxxxxxxxxxxx >>>>> http://lists.looneylabs.com/mailman/listinfo/icehouse >>>>> >>>> >>>> >>>> >>>> -- >>>> A pizza with the radius 'z' and thickness 'a' >>>> has the volume pi*z*z*a. >>>> _______________________________________________ >>>> Icehouse mailing list >>>> Icehouse@xxxxxxxxxxxxxxxxxxxx >>>> http://lists.looneylabs.com/mailman/listinfo/icehouse >>> _______________________________________________ >>> Icehouse mailing list >>> Icehouse@xxxxxxxxxxxxxxxxxxxx >>> http://lists.looneylabs.com/mailman/listinfo/icehouse >> >> >> >> -- >> A pizza with the radius 'z' and thickness 'a' >> has the volume pi*z*z*a. >> _______________________________________________ >> Icehouse mailing list >> Icehouse@xxxxxxxxxxxxxxxxxxxx >> http://lists.looneylabs.com/mailman/listinfo/icehouse > _______________________________________________ > Icehouse mailing list > Icehouse@xxxxxxxxxxxxxxxxxxxx > http://lists.looneylabs.com/mailman/listinfo/icehouse -- A pizza with the radius 'z' and thickness 'a' has the volume pi*z*z*a.