A Sierpinski/Riesel-like problem - Page 36

sweety439 · 2017-08-18, 03:05

Code:

k,n
2,3
3,2

With conjectured k=4, k=1 remains.

sweety439 · 2017-08-18, 03:06

Code:

k,n
2,1
3,1

With conjectured k=5, k=1 and k=4 remain.

sweety439 · 2017-08-18, 03:07

Code:

k,n
1,2
2,3
3,1
4,29
5,234
6,2
7,1
8,5

With conjectured k=9, this conjecture is proven.

sweety439 · 2017-08-18, 03:09

Code:

k,n
1,4
2,3
3,4

With conjectured k=4, this conjecture is proven.

sweety439 · 2017-08-18, 03:11

Code:

k,n
1,16
3,1
4,10

With conjectured k=5, k=2 remains.

sweety439 · 2017-08-18, 03:12

Code:

k,n
1,16
2,1
3,2
4,10
5,1
6,1

With conjectured k=7, this conjecture is proven.

sweety439 · 2017-08-18, 03:13

Code:

k,n
1,4
2,1
3,1
5,2

With conjectured k=6, k=4 remains.

sweety439 · 2017-08-18, 03:14

Code:

k,n
2,1
3,1

With conjectured k=4, k=1 remains.

sweety439 · 2017-08-18, 03:18

Code:

k,n
1,3
2,4
3,2
4,1

With conjectured k=5, this conjecture is proven.

sweety439 · 2017-08-18, 03:19

Code:

k,n
1,5
2,2
3,1

With conjectured k=4, this conjecture is proven.

sweety439 · 2017-08-18, 03:21

Code:

k,n
1,163
2,1
3,114
5,1

With conjectured k=6, k=4 proven composite by partial algebraic factors, this conjecture is proven.

2017-08-18, 03:05	#386
sweety439 "99(4^34019)99 palind" Nov 2016 (P^81993)SZ base 36 2×13×113 Posts	Sierpinski base 149 Code: k,n 2,3 3,2 With conjectured k=4, k=1 remains.

2017-08-18, 03:06	#387
sweety439 "99(4^34019)99 palind" Nov 2016 (P^81993)SZ base 36 5572₈ Posts	Sierpinski base 155 Code: k,n 2,1 3,1 With conjectured k=5, k=1 and k=4 remain.

2017-08-18, 03:07	#388
sweety439 "99(4^34019)99 palind" Nov 2016 (P^81993)SZ base 36 2×13×113 Posts	Sierpinski base 159 Code: k,n 1,2 2,3 3,1 4,29 5,234 6,2 7,1 8,5 With conjectured k=9, this conjecture is proven.

2017-08-18, 03:09	#389
sweety439 "99(4^34019)99 palind" Nov 2016 (P^81993)SZ base 36 2·13·113 Posts	Sierpinski base 164 Code: k,n 1,4 2,3 3,4 With conjectured k=4, this conjecture is proven.

2017-08-18, 03:11	#390
sweety439 "99(4^34019)99 palind" Nov 2016 (P^81993)SZ base 36 101101111010₂ Posts	Sierpinski base 167 Code: k,n 1,16 3,1 4,10 With conjectured k=5, k=2 remains.

2017-08-18, 03:12	#391
sweety439 "99(4^34019)99 palind" Nov 2016 (P^81993)SZ base 36 2×13×113 Posts	Sierpinski base 173 Code: k,n 1,16 2,1 3,2 4,10 5,1 6,1 With conjectured k=7, this conjecture is proven.

2017-08-18, 03:13	#392
sweety439 "99(4^34019)99 palind" Nov 2016 (P^81993)SZ base 36 2·13·113 Posts	Sierpinski base 174 Code: k,n 1,4 2,1 3,1 5,2 With conjectured k=6, k=4 remains. Last fiddled with by sweety439 on 2017-08-18 at 03:14

2017-08-18, 03:14	#393
sweety439 "99(4^34019)99 palind" Nov 2016 (P^81993)SZ base 36 2×13×113 Posts	Sierpinski base 179 Code: k,n 2,1 3,1 With conjectured k=4, k=1 remains.

2017-08-18, 03:18	#394
sweety439 "99(4^34019)99 palind" Nov 2016 (P^81993)SZ base 36 5572₈ Posts	Riesel base 131 Code: k,n 1,3 2,4 3,2 4,1 With conjectured k=5, this conjecture is proven.

2017-08-18, 03:19	#395
sweety439 "99(4^34019)99 palind" Nov 2016 (P^81993)SZ base 36 2×13×113 Posts	Riesel base 134 Code: k,n 1,5 2,2 3,1 With conjectured k=4, this conjecture is proven.

2017-08-18, 03:21	#396
sweety439 "99(4^34019)99 palind" Nov 2016 (P^81993)SZ base 36 2·13·113 Posts	Riesel base 139 Code: k,n 1,163 2,1 3,114 5,1 With conjectured k=6, k=4 proven composite by partial algebraic factors, this conjecture is proven.

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