62 DIVIDE CIRCUMFERENCES AS IN PLAN INTO SIXTEEN EQUAL PARTS. THE DIAGONALS WILL GIVE A STAR OF SIXTEEN POINTS, THE LINES OF WHICH, EXTENDED, FORM A ROSETTE OF SIXTEEN POINTS WITHIN A SQUARE. THE ANGLES OF THE SQUARE INTERSECT REGULAR HEXAGONS.

63 DESCRIBE THE CIRCUMFERENCES AS IN THE PLAN. INSCRIBE FROM A CENTRE A STARRED OCTAGON ENCLOSED WITHIN A REGULAR OCTAGON, A STARRED HEXAGON WITHIN ALTERNATE HEXAGONS, AND A CRUCIFORM FIGURE WITHIN A FOUR-POINTED STAR.

63’ DESCRIBE CIRCUMFERENCES AS IN THE PLAN, AND FROM A CENTRE INSCRIBE A STARRED OCTAGON; FROM THE EXTENDED LINES IS FORMED A CRUCIFORM FIGURE. FROM OTHER CENTRES INSCRIBE STARRED AND REGULAR HEXAGONS.