cp's OEIS Frontend

This is a front-end for the Online Encyclopedia of Integer Sequences, made by Christian Perfect. The idea is to provide OEIS entries in non-ancient HTML, and then to think about how they're presented visually. The source code is on GitHub.

Showing 1-3 of 3 results.

A355790 Numbers that can be written as the product of two divisors greater than 1 such that the number is contained in the string concatenation of the divisors.

Original entry on oeis.org

64, 95, 110, 210, 325, 510, 624, 640, 664, 950, 995, 1010, 1100, 1110, 3250, 3325, 5134, 6240, 6400, 6640, 6664, 7125, 7616, 8145, 9500, 9950, 9995, 11000, 11100, 11110, 20100, 21052, 21175, 25100, 26208, 32500, 33250, 33325, 35126, 50100, 51020, 51204, 51340, 57125, 62400, 64000, 65114
Offset: 1

Views

Author

Scott R. Shannon, Jul 17 2022

Keywords

Examples

			64 is a term as 64 = 16 * 4 and "16" + "4" = "164" contains "64".
65114 is a term as 65114 = 4651 * 14 and "4651" + "14" = "465114" contains "65114".
See the attached text file for other examples.
		

Crossrefs

Programs

  • Python
    from sympy import divisors
    def ok(n):
        s, divs = str(n), divisors(n)[1:-1]
        return any(s in str(d)+str(n//d) for d in divs)
    print([k for k in range(1, 10**5) if ok(k)]) # Michael S. Branicky, Jul 27 2022

A356143 Numbers that can be written in two or more ways as the product of three divisors greater than 1 such that the number in binary is contained in the string concatenation of the divisors in binary.

Original entry on oeis.org

126, 252, 495, 504, 1008, 2016, 3420, 3510, 4032, 5850, 8064, 11700, 16128, 23400, 32256, 46800, 64512, 93600, 129024, 187200, 258048, 374400, 516096, 748800, 1032192, 1497600, 2064384, 2995200, 4128768, 5990400, 8257536, 11980800, 16515072, 23961600, 33030144, 47923200, 57587274, 66060288
Offset: 1

Views

Author

Scott R. Shannon, Jul 30 2022

Keywords

Comments

There are thirty-nine terms less than 100 million - the terms in the data section along with 95846400. All of these numbers have two ways that they can be written to satisfy their binary value being contained in the binary concatenation of the three divisors; it is unknown if numbers exist that can be written in three or more ways that satisfy this criterion. The only odd number in the first thirty-nine terms is 495; it is unknown if more exist.

Examples

			126 is a term as 126 = 1111110_2 = 3 * 3 * 14 = 11_2 * 11_2 * 1110_2 = 3 * 7 * 6 = 11_2 * 111_2 * 110_2 and "11" + "11" + "1110" = "11111110" contains "1111110" and "11" + "111" + "110" = "11111110" contains "1111110".
3420 is a term as 3420 = 110101011100_2 = 5 * 171 * 4 = 101_2 * 10101011_2 * 100_2 = 6 * 10 * 57 = 110_2 * 1010_2 * 111001_2 and "101" + "10101011" + "100" = "10110101011100" contains "110101011100" and "110" + "1010" + "111001" = "1101010111001" contains "110101011100".
See the attached text file for other examples.
		

Crossrefs

A356176 Numbers that can be written as the product of three divisors greater than 1 such that the number in binary is contained in the string concatenation of the divisors in binary.

Original entry on oeis.org

30, 60, 63, 90, 110, 120, 126, 180, 220, 228, 240, 252, 340, 350, 430, 440, 480, 495, 504, 606, 612, 680, 759, 840, 860, 880, 891, 927, 957, 960, 990, 1008, 1212, 1224, 1320, 1526, 1710, 1720, 1755, 1760, 1782, 1854, 1920, 1980, 2016, 2376, 2424, 2466, 2640, 2925, 2955, 2990, 3045, 3050
Offset: 1

Views

Author

Scott R. Shannon, Jul 28 2022

Keywords

Comments

See A356143 for the list of numbers that have two or more ways to be written as the product of three divisors such that the number in binary is contained in the string concatenation of the divisors in binary.

Examples

			30 is a term as 30 = 11110_2 = 5 * 3 * 2 = 101_2 * 11_2 * 10_2 and "101" + "11" + "10" = "1011110" contains "11110".
3050 is a term as 3050 = 101111101010_2 = 5 * 122 * 5 = 101_2 * 1111010_2 * 101_2 and "101" + "1111010" + "101" = "1011111010101" contains "101111101010".
See the attached text file for other examples.
		

Crossrefs

Showing 1-3 of 3 results.