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3
Michael De Vlieger, St. Louis, Missouri, 2019 0322
Michael De Vlieger, St. Louis, Missouri, 2019 0322
For terms m = A002182(n)row k: m ≥ A002110(k)
For terms m = A002182(n)row k: m ≥ A002110(k)
A002182
A002182
360
360
A324581
A324581
184877
184877
A324582
A324582
66555720
66555720
×
×
2³ · 3² · 5 · 7⁵ · 11 =
2³ · 3² · 5 · 7⁵ · 11 =
A324582(n) = A002182(n) × A324581(n). These charts show the pri
A324582(n) = A002182(n) × A324581(n). These charts show the prime divisors of A002182(n) with multiplicity, in color, overlaid upon those of A324582(n) in black. The prime divisors of A324581(n) with multiplicity appear only in black with no color overlay. The colors represent sequences in which the product pertains. In the example, the red dots indicate prime divisors of 360, which is the 13th term in A002182 and is also in A002201. The primes in black produce 184877, the 13th term in A324581. 360 × 184877 = A324852(13).
The black dots essentially tell how each term of A002182 can b
The black dots essentially tell how each term of A002182 can be formed as a sum of corresponding primorials (with each multiplied by the number of dots in that pillar), while the dots with color tell how the same term/number can be formed as a product of primorials, each primorial now corresponding with a horizontal layer in the colored section.
2 3 5 7 11
2 3 5 7 11
PRIME DIVISOR
PRIME DIVISOR
3 2 1
3 2 1
MULTIPLICITY
MULTIPLICITY
(13)
(13)
Example & Key
Example & Key
A324581, A324582. A324582, A002110, A002182, A002201. A324582,
A324581, A324582. A324582, A002110, A002182, A002201. A324582, A002182. A324582, A002182, A002201.
https://oeis.org/A324582
https://oeis.org/A324582
OEIS A324582
OEIS A324582
https://oeis.org/A324581
https://oeis.org/A324581
OEIS A324581
OEIS A324581
1
960000/10000
960000/10000
2
65535
2400
3600
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