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{{Infobox number {{Infobox number
| number = 49 | number = 49
| divisor = 1, 7, 49 | divisor = 1,1-;
7, 49
}} }}
'''49''' ('''forty-nine''') is the ] following ] and preceding ]. '''49''' ('''forty-nine''') is the ] following ] and preceding ].

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Find sources: "49" number – news · newspapers · books · scholar · JSTOR (May 2016) (Learn how and when to remove this message)
Natural number
← 48 49 50 →
40 41 42 43 44 45 46 47 48 49 0 10 20 30 40 50 60 70 80 90
Cardinalforty-nine
Ordinal49th
(forty-ninth)
Factorization7
Divisors1,1-;


7, 49
Greek numeralΜΘ´
Roman numeralXLIX
Binary1100012
Ternary12113
Senary1216
Octal618
Duodecimal4112
Hexadecimal3116

49 (forty-nine) is the natural number following 48 and preceding 50.

In mathematics

Forty-nine is the square of the prime number seven and hence the fourth non-unitary square prime of the form p

49 has an aliquot sum of 8; itself a prime power, and hence an aliquot sequence of two composite members (49, 8, 7,1,0).

It appears in the Padovan sequence, preceded by the terms 21, 28, 37 (it is the sum of the first two of these).

Along with the number that immediately derives from it, 77, the only number under 100 not having its home prime known (as of 2016).

The smallest triple of three squares in arithmetic succession is (1,25,49), and the second smallest is (49,169,289).

49 is the smallest discriminant of a totally real cubic field.

49 and 94 are the only numbers below 100 whose all permutations are composites but they are not multiples of 3, repdigits or numbers which only have digits 0, 2, 4, 5, 6 and 8, even excluding the trivial one digit terms.

49 = 7^2 and 94 = 2 * 47

The number of prime knots with 9 crossings is 49.

Decimal representation

The sum of the digits of the square of 49 (2401) is the square root of 49.

49 is the first square where the digits are squares. In this case, 4 and 9 are squares.

Reciprocal

See also: Repeating decimal

The fraction ⁠1/49⁠ is a repeating decimal with a period of 42:

⁠1/49⁠ = 0.0204081632 6530612244 8979591836 7346938775 51 (42 digits repeat)

There are 42 positive integers less than 49 and coprime to 49. (42 is the period.) Multiplying 020408163265306122448979591836734693877551 by each of these integers results in a cyclic permutation of the original number:

  • 020408163265306122448979591836734693877551 × 2 = 040816326530612244897959183673469387755102
  • 020408163265306122448979591836734693877551 × 3 = 061224489795918367346938775510204081632653
  • 020408163265306122448979591836734693877551 × 4 = 081632653061224489795918367346938775510204
  • ...

The repeating number can be obtained from 02 and repetition of doubles placed at two places to the right:

02
  04
    08
      16
        32
          64
           128
             256
               512
                1024
                  2048
+                   ...
----------------------
020408163265306122448979591836734693877551...0204081632...

because 1⁄49 satisfies:

x = 1 50 + 2 x 100 = 1 50 ( 1 + x ) . {\displaystyle x={\frac {1}{50}}+{\frac {2x}{100}}={\frac {1}{50}}(1+x)\,.}

In chemistry

  • The atomic number of indium.
  • During the Manhattan Project, plutonium was also often referred to simply as "49". Number 4 was for the last digit in 94 (atomic number of plutonium) and 9 for the last digit in Pu-239, the weapon-grade fissile isotope used in nuclear bombs.

In astronomy

In religion

In sports

See also: 49er § Sports

In music

See also: 49er § Music

In other fields

See also: List of highways numbered 49

Forty-nine is:

See also

References

  1. "Sloane's A000931 : Padovan sequence". The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-05-30.
  2. Sloane, N. J. A. (ed.). "Sequence A006832 (Discriminants of totally real cubic fields.)". The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2024-03-20.
  3. Sloane, N. J. A. (ed.). "Sequence A002863 (Number of prime knots with n crossings)". The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
  4. Hammel, E.F. (2000). "The taming of "49" — Big Science in little time. Recollections of Edward F. Hammel, pp. 2-9. In: Cooper N.G. Ed. (2000). Challenges in Plutonium Science" (PDF). Los Alamos Science. 26 (1): 2–9.
  5. Hecker, S.S. (2000). "Plutonium: an historical overview. In: Challenges in Plutonium Science". Los Alamos Science. 26 (1): 1–2.
  6. "Days of Forty-Nine, The". California State University, Fresno. Retrieved 2022-10-09.
  7. "RN2803: Days of '49". English Folk Dance and Song Society. Retrieved 2022-10-09.
  8. "Forty-nine dance". Encyclopedia Britannica. Retrieved May 25, 2018.
  9. Sharp, Damian (2001). Simple Numerology: A Simple Wisdom book (A Simple Wisdom Book series). Red Wheel. p. 7. ISBN 978-1-57324-560-9.
Integers
0s
100s
200s
300s
400s
500s
600s
700s
800s
900s
1000
Category: