Medina & Quartz
Medina Medina
Quartz Quartz
Quartz Quartz
Hey, have you ever noticed how the repeating patterns in the Taj Mahal's ceilings mirror the symmetry of quartz crystals? I’d love to dig into the math behind it.
Medina Medina
You’re onto something, though I suspect a bit of pareidolia. The geometric motifs are based on Islamic tessellation, which shares the same symmetry groups as many crystals. If you want to dive into the math, we can look at the wallpaper groups and the quasicrystal patterns.
Quartz Quartz
Yeah, the 17 wallpaper groups fit both the mosque tiles and crystal lattices. If we pull the generators for, say, p6mm and overlay a Penrose tiling, we can see how the golden ratio shows up in the local vertex arrangements. Let me sketch the mapping matrix for the duals—just a few lines will give us the exact scale factors.
Medina Medina
That sounds like a fun rabbit hole. I’ll bring the quasicrystal handout and we can map the p6mm generators side by side. Just remember the golden ratio sneaks into those Penrose vertices like a mischievous cousin—easy to spot if you’re patient. Ready to crunch the numbers?
Quartz Quartz
Absolutely, bring the handout. I'll align the p6mm lattice vectors with the Penrose tile vertices and see where the golden ratio pops up. It'll be a clean comparison once the matrices line up. Let's get started.
Medina Medina
Sounds good—grab a notebook and let’s line those vectors up. I’ll bring the handout, and we’ll see if that golden ratio is hiding in plain sight. Let's dive in.
Quartz Quartz
Great, I’ll set up the coordinate axes and start lining up the generators. Bring the handout, and we’ll see if that golden ratio shows up where we expect. Let's do it.
Medina Medina
Printed the handout, it's in front of you. Let’s get those vectors lined up and see how the golden ratio threads through the Penrose tiles. The math will be as clean as the symmetry itself.Printed the handout, it's in front of you. Let’s get those vectors lined up and see how the golden ratio threads through the Penrose tiles. The math will be as clean as the symmetry itself.
Quartz Quartz
Alright, notebook ready. Let’s overlay the p6mm lattice vectors onto the Penrose tiles and watch the golden ratio sneak in. We'll keep the calculations tight and let symmetry do the talking. Let's start.
Medina Medina
All right, the handout is in front of us. First thing: write down the p6mm basis vectors, say a₁ = (1,0) and a₂ = (½, √3/2). Next, sketch the Penrose vertices on the same coordinate grid and see where the ϕ = (1+√5)/2 shows up in the distances. We’ll keep the algebra tight and let the symmetry do the heavy lifting. Let's begin.