K12 Oval 1.45

GemCad Ray Traces for RI = 1.70
Random Model	Cosine Model	ISO Model

K12 Oval 1.45 Designed by Fred Van Sant 1997 Rendered by Bob Keller
Angles for R.I. = 1.70+	49 facets + 12 facets on girdle = 61
2-fold, mirror-image symmetry	96 index
L/W = 1.45 Table Area= 30.3% T/W = 0.5511 C/W = 0.1708	P/W = 0.6088 H/W = 0.7995 g2/W = .311423
VF = .413306 GVF = .005385	Brightness at 0 degrees tilt for RI = 1.70 COS = 72.2 ISO = 84.3

Pavilion
1	41.00	20-28-68-76	Cut to equal depth - make PCP (culet)
2	41.00	12-36-60-84	Meet culet
3	41.00	4-44-52-92	Meet culet
g1	90.00	18-30-66-78	Cut to equal depth, set size
4	48.00	18-30-66-78	Meet g1.1.1.g1
5	62.05	9-39-57-87	Meet 2.1.4
6	70.41	03-45-51-93	Meet 3.2.5
g2	90.00	9-39-57-87	Meet 5.4.g1
g3	90.00	03-45-51-93	Meet 6.5.g2
Crown
1	44.48	03-45-51-93	Match g3, establish upper girdle line
2	42.66	9-39-57-87	Meet g2.g3.1
3	45.75	18-30-66-78	Meet g1.g2.2
4	34.00	06-42-54-90	Meet g3.1.2.g2
5	34.00	24-72	Meet 3.2.4, g1.3.3.g1
6	24.00	06-42-54-90	Meet 4.1.1.4, 4.2.3.5
7	24.00	24-72	Meet 6.4.2.3.5
T	0.00	Table	Table Width / Width = .5511

There are two ways to make the K12 Oval shape.

1. At 90° cut the side and end pairs to make L/W. Then cut the other four girdles at 90° to achieve g2/W by measurement.
2. Breakpoint Method:
   a. Cut pavilion set 1, 2 & 3 to PCP.
   b. Cut four facets at 90°, end indices, to size stone.
   c. Chain-cut break facets, starting as shown, to meetpoints as you go.
   d. Chain-cut girdles at 90°, starting next to the ends, to make a level girdle line.

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