Numerical properties of 191

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Show numerical properties of 191

We start by listing out divisors for 191

Divisor	Divisor Math
1	191 ÷ 1 = 191

Positive or Negative Number Test:

Positive Numbers > 0

Since 191 ≥ 0 and it is an integer
191 is a positive number

Whole Number Test:

Positive numbers including 0
with no decimal or fractions

Since 191 ≥ 0 and it is an integer
191 is a whole number

Prime or Composite Test:

Since 191 is only divisible by 1 and itself
it is a prime number

Perfect/Deficient/Abundant Test:

Calculate divisor sum D
If D = N, then it's perfect
If D > N, then it's abundant
If D < N, then it's deficient
Divisor Sum = 1
Since our divisor sum of 1 < 191
191 is a deficient number!

Odd or Even Test (Parity Function):

A number is even if it is divisible by 2
If not divisible by 2, it is odd

95.5  =	191
	2

Since 95.5 is not an integer, 191 is not divisible by
it is an odd number
This can be written as A(191) = Odd

Evil or Odious Test:

Get binary expansion
If binary has even amount 1's, then it's evil
If binary has odd amount 1's, then it's odious
191 to binary = 10111111
There are 7 1's, 191 is an odious number

Triangular Test:

Can you stack numbers in a pyramid?
Each row above has one item less than the row before it
Using a bottom row of 20 items, we cannot form a pyramid
191 is not triangular

Triangular number: 1st  2nd  3rd  4th  5th  6th  7th  8th  9th  10th  

Rectangular Test:

Is there an integer m such that n = m(m + 1)
No integer m exists such that m(m + 1) = 191
191 is not rectangular

Rectangular number: 1st  2nd  3rd  4th  5th  6th  7th  8th  9th  10th  

Automorphic (Curious) Test:

Does n² ends with n
191² = 191 x 191 = 36481
Since 36481 does not end with 191
it is not automorphic (curious)

Automorphic number: 1st  2nd  3rd  4th  5th  6th  7th  8th  9th  10th  

Undulating Test:

Do the digits of n alternate in the form abab
In this case, a = 1 and b = 9
In order to be undulating, Digit 1: 111 should be equal to 1
In order to be undulating, Digit 2: 999 should be equal to 9
In order to be undulating, Digit 3: 111 should be equal to 1
Since all 3 digits form our abab undulation pattern
191 is undulating

Square Test:

Is there a number m such that m² = n
13² = 169 and 14² = 196 which do not equal 191
Therefore, 191 is not a square

Cube Test:

Is there a number m such that m³ = n
5³ = 125 and 6³ = 216 ≠ 191
Therefore, 191 is not a cube

Palindrome Test:

Is the number read backwards equal to the number?
The number read backwards is 191
Since 191 is the same backwards and forwards
it is a palindrome

Palindromic Prime Test:

Is it both prime and a palindrome
From above, since 191 is both prime and a palindrome
it is a palindromic prime

Repunit Test:

A number is repunit if every digit is equal to 1
Since there is at least one digit in 191 ≠ 1
then it is NOT repunit

Apocalyptic Power Test:

Does 2ⁿ contains the consecutive digits 666.
2¹⁹¹ = 3.1385508676933E+57
Since 2¹⁹¹ does not have 666
191 is NOT an apocalyptic power

Pentagonal Test:

It satisfies the form:

n(3n - 1)
2

Check values of 11 and 12

Using n = 12, we have:

12(3(12 - 1)
2

12(36 - 1)
2

12(35)
2

420
2

210 ← Since this does not equal 191
this is NOT a pentagonal number

Using n = 11, we have:

11(3(11 - 1)
2

11(33 - 1)
2

11(32)
2

352
2

176 ← Since this does not equal 191
this is NOT a pentagonal number

Pentagonal number: 1st  2nd  3rd  4th  5th  6th  7th  8th  9th  10th  

Hexagonal Test:

Is there an integer m such that n = m(2m - 1)
No integer m exists such that m(2m - 1) = 191
Therefore 191 is not hexagonal

Hexagonal number: 1st  2nd  3rd  4th  5th  6th  7th  8th  9th  10th  

Heptagonal Test:

Is there an integer m such that:

m  =	n(5n - 3)
	2

No integer m exists such that m(5m - 3)/2 = 191
Therefore 191 is not heptagonal

Heptagonal number: 1st  2nd  3rd  4th  5th  6th  7th  8th  9th  10th  

Octagonal Test:

Is there an integer m such that n = m(3m - 3)
No integer m exists such that m(3m - 2) = 191
Therefore 191 is not octagonal

Octagonal number: 1st  2nd  3rd  4th  5th  6th  7th  8th  9th  10th  

Nonagonal Test:

Is there an integer m such that:

m  =	n(7n - 5)
	2

No integer m exists such that m(7m - 5)/2 = 191
Therefore 191 is not nonagonal

Nonagonal number: 1st  2nd  3rd  4th  5th  6th  7th  8th  9th  10th  

Tetrahedral (Pyramidal) Test:

Satisfies the form:

n(n + 1)(n + 2)
6

Check values of 9 and 10

Using n = 10, we have:

10(10 + 1)(10 + 2)
6

10(11)(12)
6

1320
6

220 ← Since this does not equal 191
This is NOT a tetrahedral (Pyramidal) number

Using n = 9, we have:

9(9 + 1)(9 + 2)
6

9(10)(11)
6

990
6

165 ← Since this does not equal 191
This is NOT a tetrahedral (Pyramidal) number

Narcissistic (Plus Perfect) Test:

Is equal to the square sum of it's m-th powers of its digits
191 is a 3 digit number, so m = 3
Square sum of digits^m = 1³ + 9³ + 1³
Square sum of digits^m = 1 + 729 + 1
Square sum of digits^m = 731
Since 731 <> 191
191 is NOT narcissistic (plus perfect)

Catalan Test:

Cn  =	2n!
	(n + 1)!n!

Check values of 6 and 7

Using n = 7, we have:

C7  =	(2 x 7)!
	7!(7 + 1)!

Using our factorial lesson

C7  =	14!
	7!8!

C7  =	87178291200
	(5040)(40320)

C7  =	87178291200
	203212800

C₇ = 429
Since this does not equal 191
This is NOT a Catalan number

Using n = 6, we have:

C6  =	(2 x 6)!
	6!(6 + 1)!

Using our factorial lesson

C6  =	12!
	6!7!

C6  =	479001600
	(720)(5040)

C6  =	479001600
	3628800

C₆ = 132
Since this does not equal 191
This is NOT a Catalan number

Property Summary for the number 191

  ·  Positive
  ·  Whole
  ·  Prime
  ·  Deficient
  ·  Odd
  ·  Odious
  ·  Undulating
  ·  Palindrome
  ·  Palindromic Prime

Number Property Calculator Video

Tags:

• divisor
• even
• narcissistic numbers
• number property
• number
• odd
• palindrome
• pentagon
• pentagonal number
• perfect number
• property

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