[ad_1]
Try to make sense of the puzzle under.
Circle1, circle2, circle3, circle4, circle5, circle6 and circle7 have radius r1, r2, r3, r4, r5, r6 and r7 respectively and periferi p1, p2, p3, p4, p5, p6 and p7 respectively. r7>r6>r5>r4>r3>r2>r1 and every circle share the identical middle. From p2 to p6 there are a selection of straight strains connecting the 2. The angle between two adjoining strains is all the time 18°.
If 0° is on an imaginary line going from the middle to the highest of circle7 and levels are counted clockwise, then rank these ten (1-10) in right order:
A 127°, p6 • p7
B 18°, p4 • p5
C 33°, c • p1
D 257°, p5 • p6
E 44°, p3 • p4
F 79°, p1 • p2
G 353°, p5 • p6
H 3°, p3 • p4
I 100°, p4 • p5
J 187°, p2 • p3
[ad_2]