A366630 -id:A366630 - cp's OEIS frontend

A366608 a(n) = phi(4^n+1), where phi is Euler's totient function (A000010).

1, 4, 16, 48, 256, 800, 3840, 12544, 65536, 186624, 986880, 3345408, 16515072, 52306176, 252645120, 760320000, 4288266240, 13628740608, 64258375680, 218462552064, 1095233372160, 3105655160832, 16510446886912, 56000724240384, 280012271910912, 869940000000000

Offset: 0

Sean A. Irvine, Oct 14 2023

nonn

Max Alekseyev, Table of n, a(n) for n = 0..583

Cf. A000010, A052539, A057940, A274903, A295501, A366605, A366606, A366607, A366609.

Cf. A053285, A366579, A366618, A366630, A366639, A366658, A366667, A366669, A366690, A366716.

EulerPhi[4^Range[0,30]+1] (* Paolo Xausa, Oct 14 2023 *)

PARI
```
{a(n) = eulerphi(4^n+1)}
```

from sympy import totient
def A366608(n): return totient((1<<(n<<1))+1) # Chai Wah Wu, Oct 14 2023

a(n) = A053285(2*n). - Max Alekseyev, Jan 08 2024

A366667 a(n) = phi(9^n+1), where phi is Euler's totient function (A000010).

Original entry on oeis.org

1, 4, 40, 288, 3072, 23600, 259200, 1847104, 21523360, 152845056, 1700870400, 12550120000, 130459631616, 997562438080, 11159367815680, 81159501312000, 926510094425920, 6670865700716544, 73205598106368000, 540340585126398016, 5691215305506816000

Offset: 0

Sean A. Irvine, Oct 15 2023

nonn

Max Alekseyev, Table of n, a(n) for n = 0..345

Cf. A062396, A000010, A366663, A366664, A366665, A366666.

Cf. A053285, A366579, A366608, A366618, A366630, A366639, A366658, A366669, A366690, A366716.

EulerPhi[9^Range[0, 20] + 1] (* Paul F. Marrero Romero, Nov 04 2023 *)

PARI
```
{a(n) = eulerphi(9^n+1)}
```

a(n) = A000010(A062396(n)). - Paul F. Marrero Romero, Nov 04 2023

a(n) = A366579(2*n). - Max Alekseyev, Jan 08 2024

A366618 a(n) = phi(5^n+1), where phi is Euler's totient function (A000010).

Original entry on oeis.org

1, 2, 12, 36, 312, 1040, 7200, 25088, 183808, 557928, 4396800, 15333120, 121680000, 406812744, 2817007200, 8558784000, 76264519680, 254230063200, 1710194342400, 6349120596480, 47334145996800, 127169887444992, 1088029470747648, 3889097389599864

Offset: 0

Sean A. Irvine, Oct 14 2023

nonn

Max Alekseyev, Table of n, a(n) for n = 0..471

Cf. A000010, A034474, A057939, A074478, A295502, A366615, A366616, A366617.

Cf. A053285, A366579, A366608, A366630, A366639, A366658, A366667, A366669, A366690, A366716.

EulerPhi[5^Range[0,30]+1] (* Harvey P. Dale, Jun 07 2025 *)

PARI
```
{a(n) = eulerphi(5^n+1)}
```

A366629 Sum of the divisors of 6^n+1.

Original entry on oeis.org

3, 8, 38, 256, 1298, 9792, 52136, 338580, 1778436, 11889152, 62367272, 414625216, 2178461956, 15224775552, 80673299432, 611106029568, 2830769440776, 19344856702976, 115255634181184, 696800841097536, 3748220725527432, 27388329197137920, 135183433256806480

Offset: 0

Sean A. Irvine, Oct 14 2023

nonn

			a(3)=256 because 6^3+1 has divisors {1, 7, 31, 217}.

Max Alekseyev, Table of n, a(n) for n = 0..430

Cf. A062394, A000203, A057938, A366622, A366617, A366627, A366628, A366630, A366670.

Cf. A069061, A366578, A366607, A366638, A366657, A366666, A366668, A366689, A366715.

a:=n->numtheory[sigma](6^n+1):
seq(a(n), n=0..100);

DivisorSigma[1, 6^Range[0, 30] + 1] (* Paolo Xausa, Jul 03 2024 *)

a(n) = sigma(6^n+1) = A000203(A062394(n)).

A366639 a(n) = phi(7^n+1), where phi is Euler's totient function (A000010).

Original entry on oeis.org

1, 4, 20, 168, 1200, 7600, 43200, 407680, 2712832, 19707408, 112560000, 945677920, 6768230400, 47530457728, 271289229120, 2096760960000, 16569393144832, 116315256993600, 597938524646400, 5699431359135360, 38890647857280000, 270061302781670400

Offset: 0

Sean A. Irvine, Oct 15 2023

nonn

Max Alekseyev, Table of n, a(n) for n = 0..387

Cf. A034491, A000010, A057937, A227575, A366635, A366636, A366637, A366638.

Cf. A053285, A366579, A366608, A366618, A366630, A366658, A366667, A366669, A366690, A366716.

EulerPhi[7^Range[0,21] + 1] (* Paul F. Marrero Romero, Nov 05 2023 *)

PARI
```
{a(n) = eulerphi(7^n+1)}
```

a(n) = A000010(A034491(n)). - Paul F. Marrero Romero, Nov 06 2023

A366658 a(n) = phi(8^n+1), where phi is Euler's totient function (A000010).

Original entry on oeis.org

1, 6, 48, 324, 3840, 19800, 186624, 1365336, 16515072, 84768120, 760320000, 5632621632, 64258375680, 366369658200, 3105655160832, 20140520400000, 280012271910912, 1495522910085120, 12824556668190720, 95907982079387520, 1080582572777472000, 5688765822212629632

Offset: 0

Sean A. Irvine, Oct 15 2023

nonn

Max Alekseyev, Table of n, a(n) for n = 0..502

Cf. A062395, A000010, A057936, A274905, A366654, A366655, A366656, A366657, A366671.

Cf. A053285, A366579, A366608, A366618, A366630, A366639, A366667, A366669, A366690, A366716.

EulerPhi[8^Range[0, 21] + 1] (* Paul F. Marrero Romero, Oct 17 2023 *)

PARI
```
{a(n) = eulerphi(8^n+1)}
```

from sympy import totient
def A366658(n): return totient((1<<3*n)+1) # Chai Wah Wu, Oct 15 2023

a(n) = A000010(A062395(n)). - Paul F. Marrero Romero, Nov 06 2023

a(n) = A053285(3*n). - Max Alekseyev, Jan 09 2024

A366627 Number of distinct prime divisors of 6^n + 1.

Original entry on oeis.org

1, 1, 1, 2, 1, 3, 3, 3, 2, 3, 3, 2, 2, 4, 3, 5, 3, 3, 6, 3, 3, 5, 4, 3, 4, 4, 4, 5, 5, 4, 9, 2, 3, 6, 3, 10, 5, 4, 3, 9, 5, 4, 7, 2, 3, 7, 5, 2, 7, 5, 6, 8, 4, 5, 10, 7, 6, 7, 3, 2, 6, 3, 2, 9, 3, 8, 11, 5, 5, 6, 7, 4, 5, 6, 4, 10, 5, 5, 10, 6, 6, 8, 4, 5, 8

Offset: 0

Sean A. Irvine, Oct 14 2023

nonn

Max Alekseyev, Table of n, a(n) for n = 0..430

Cf. A062394, A001221, A057938, A366620, A366628, A366629, A366630.

Cf. A046799, A366580, A366605, A366615, A366636, A366655, A366664, A119704, A366686, A366712.

PrimeNu[6^Range[0,84] + 1] (* Paul F. Marrero Romero, Nov 11 2023 *)

for(n = 0, 100, print1(omega(6^n + 1), ", "))

a(n) = omega(6^n+1) = A001221(A062394(n)).

A366628 Number of divisors of 6^n+1.

Original entry on oeis.org

2, 2, 2, 4, 2, 8, 8, 12, 4, 8, 8, 4, 4, 16, 8, 32, 8, 8, 64, 8, 8, 48, 16, 8, 16, 16, 16, 32, 32, 16, 512, 4, 8, 64, 8, 1536, 32, 16, 8, 512, 32, 16, 128, 4, 8, 128, 32, 4, 128, 64, 64, 256, 16, 32, 1024, 192, 64, 128, 8, 4, 64, 8, 4, 768, 8, 256, 2048, 32, 32

Offset: 0

Sean A. Irvine, Oct 14 2023

nonn

			a(3)=4 because 6^3+1 has divisors {1, 7, 31, 217}.

Max Alekseyev, Table of n, a(n) for n = 0..430

Cf. A062394, A000005, A057938, A366621, A366627, A366629, A366630, A366670.

Cf. A046798, A366577, A366606, A366616, A366637, A366656, A366665, A344897, A366688, A366714.

a:=n->numtheory[tau](6^n+1):
seq(a(n), n=0..100);

DivisorSigma[0, 6^Range[0, 70] + 1] (* Paolo Xausa, Apr 19 2025 *)

PARI
```
a(n) = numdiv(6^n+1);
```

a(n) = sigma0(6^n+1) = A000005(A062394(n)).

A366669 a(n) = phi(10^n+1), where phi is Euler's totient function (A000010).

Original entry on oeis.org

1, 10, 100, 720, 9792, 90900, 990000, 9090900, 94117632, 681410880, 9897840000, 86925373920, 979102080000, 9080325951840, 95255567232000, 712493107200000, 9926748531589120, 90004044661864320, 989999010000000000, 9090909090909090900, 97910150554895155200

Offset: 0

Sean A. Irvine, Oct 15 2023

nonn

Max Alekseyev, Table of n, a(n) for n = 0..331

Cf. A000010, A003021, A057934, A062397, A119704, A295503, A344897, A366668.

Cf. A053285, A366579, A366608, A366618, A366630, A366639, A366658, A366667, A366690, A366716.

EulerPhi[10^Range[0,20] + 1] (* Paul F. Marrero Romero, Nov 10 2023 *)

PARI
```
{a(n) = eulerphi(10^n+1)}
```

a(n) = A000010(A062397(n)). - Paul F. Marrero Romero, Nov 10 2023

A366670 Smallest prime dividing 6^n + 1.

Original entry on oeis.org

2, 7, 37, 7, 1297, 7, 13, 7, 17, 7, 37, 7, 1297, 7, 37, 7, 353, 7, 13, 7, 41, 7, 37, 7, 17, 7, 37, 7, 281, 7, 13, 7, 2753, 7, 37, 7, 577, 7, 37, 7, 17, 7, 13, 7, 89, 7, 37, 7, 193, 7, 37, 7, 1297, 7, 13, 7, 17, 7, 37, 7, 41, 7, 37, 7, 4926056449, 7, 13, 7, 137

Offset: 0

Sean A. Irvine, Oct 15 2023

nonn

Max Alekseyev, Table of n, a(n) for n = 0..4095

Cf. A020639, A062394, A274904, A366630.

Cf. A002586, A366609, A366671, A038371, A366719.

Table[FactorInteger[6^n + 1][[1,1]], {n, 0, 68}] (* Paul F. Marrero Romero, Oct 17 2023 *)

a(n) = A020639(A062394(n)). - Paul F. Marrero Romero, Oct 17 2023

cp's OEIS Frontend

A366608 a(n) = phi(4^n+1), where phi is Euler's totient function (A000010).

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A366667 a(n) = phi(9^n+1), where phi is Euler's totient function (A000010).

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Mathematica

PARI

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A366618 a(n) = phi(5^n+1), where phi is Euler's totient function (A000010).

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Mathematica

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A366629 Sum of the divisors of 6^n+1.

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Maple

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A366639 a(n) = phi(7^n+1), where phi is Euler's totient function (A000010).

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Mathematica

PARI

Formula

A366658 a(n) = phi(8^n+1), where phi is Euler's totient function (A000010).

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Programs

Mathematica

PARI

Python

Formula

A366627 Number of distinct prime divisors of 6^n + 1.

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Author

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Programs

Mathematica

PARI

Formula

A366628 Number of divisors of 6^n+1.

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Author

Keywords

Examples

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Crossrefs