Krishnamurthy Number

A number is said to be Krishanmurthy number if the sum of factorial of all digits of a number is equal to the number.

1! = 1.
2! = 2.
1! + 4! + 5! = 1 + 24 + 120 = 145.
4! + 0! + 5! + 8! + 5! = 24 + 1 + 120 + 40320 + 120 = 40585.

There are only 4 such number found so far.

Dr. Rajesh Kumar Thakur

Perfect Number

A number is said to be Perfect if the sum of factors of its proper divisor is equal to the number itself.
Example:- 6, 28, 496, 8128 ...

6 is the smallest Perfect number.
St. Augustine wrote in The City of God (413–426):

Six is a number perfect in itself, and not because God created all things in six days; rather, the converse is true. God created all things in six days because the number is perfect.

The first reference of Perfect number is found in Euclid's Element (Volume 9) where Euclid proved that 2^p−1(2^p − 1) is an even perfect number whenever 2^p − 1 is prime

The first four numbers according to this definition are

for p = 2: 2^1(2^2 − 1) = 6
for p = 3: 2^2(2^3 − 1) = 28
for p = 5: 2^4(2^5 − 1) = 496
for p = 7: 2^6(2^7 − 1) = 8128.
Perfect Number can also be expressed in form of Triangular Number

(Source of Image :- Wikipedia)

Dr Rajesh Kumar Thakur

Largest Prime Number M77232917 discovered on January 4 , 2018

A FedEx employee Jonathan Pace ,an engineer by profession has discovered the largest prime Number. According to GIMPS’s (Great Internet Mersenne Prime Search) website, the newly discovered prime number is calculated by raising 2 to the 77,232,917th power and subtracting 1.

M77232917 itself is reportedly 23 million digits long. According to New Scientist, it is one million digits longer than its predecessor, which clocked in at 22 million digits.

The greatest prime number discovered before M77232917 was found in 2015, and was 5 million digits longer than the one that came before it in 2013.

Although Euclid proved that if 2^P-1 is prime, then 2^P-1*(2^P-1) is a perfect number in 350 BC, the French monk Marin Mersenne was honored with the name for his conjecture of which prime numbers could be used for P to produce larger primes. Although written in the early 17th Century, the conjecture took 300 years to prove. Meanwhile, Euler also got in on the act, proving that all even perfect numbers are formed this way.

In mathematics, a Mersenne prime is a prime number that is one less than a power of two. That is, it is a prime number of the form of 2^p − 1 for some integer p.

Dr Rajesh Kumar Thakur

Friedman Number

A Friedman number is a positive integer which can be written with the help of symbols like - + , - , x, / , (), ^ etc. and using the digits of the numbers.

Example:-
25, 121, 125, 126, 127, 128, 153, 216, 289, 343, 347, 625, 688, 736, 1022, 1024,
1206, 1255, 1260, 1285, 1296, 1395, 1435, 1503, 1530, 1792, 1827, 2048, 2187, 2349,
2500, 2501, 2502, 2503, 2504, 2505, 2506, 2507, 2508, 2509, 2592 ,2737, 2916, 3125,
3159, 3281, 3375, 3378, 3685, 3784, 3864, 3972, 4088, 4096, 4106, 4167, 4536, 4624,
4628, 5120, 5776, 5832, 6144, 6145, 6455, 6880, 7928, 8092, 8192, 9025, 9216, 9261.

Explanation:-
25 = 5^2
121 = 11^2
125 = (5)^1 + 2 = 5 ^3
126 = 21 x 6
127 = -1 + 2^7
289 = (8 + 9)^2
343 = (3 + 4 ) ^3

Friedman numbers are named after Erich Friedman, an Associate Professor of Mathematics in Florida in US.


Enjoy
Rajesh Thakur

References:-
1. https://en.wikipedia.org/wiki/Friedman_number
2. http://www2.stetson.edu/~efriedma/mathmagic/0800.html

RAMANUJAN TRIPLES

A number that can be written as the sum of cubes of a number in three ways.

This is also known as TAXICAB 3

DR RAJESH KUMAR THAKUR

Ramanujan Number

Ramanujan was fond of numbers. Prof Hardy once visited the hospital to see the ailing Ramanujan riding on a taxi. The taxi number was 1729. This 1729 is called the Ramanujan Number.

C P Show in his book wrote -
“Hardy used to visit him, as he lay dying in hospital at Putney. It was on one of those visits that there happened the incident of the taxicab number. Hardy had gone out to Putney by taxi, as usual his chosen method of conveyance. He went into the room where Ramanujan was lying. Hardy, always inept about introducing a conversation, said, probably without a greeting, and certainly as his first remark: ‘I thought the number of my taxicab was 1729. It seemed to me rather a dull number.’ To which Ramanujan replied: ‘No, Hardy! No, Hardy! It is a very interesting number. It is the smallest number expressible as the sum of two cubes in two different ways.’”

a^ 3 + b^ 3 = x where x is the Ramanujan Number

This number is also known as TAXI CAB number.

Thanks for reading

Dr Rajesh Kumar Thakur

Kaprekar number

Kaprekar Number

                                                             D R Kaprekar (1905 - 1986)

A Kaprekar number is a special n digit number such that if it is squared the sum of the squared quantity’s right most n digits and remaining part are equal to the number itself.

45^2 = 2025 and 20 + 25 = 45

703^2 = 494 209 and 494 + 209 = 703

99^2 = 9801 and 98 + 01 = 99

The first few Kaprekar numbers are -
1, 9, 45, 55, 99, 297, 703, 999, 2223, 2728, 4879, 4950, 5050, 5292, 7272, 7777, 9999, 17344, 22222, 38962, 77778, 82656, 95121, 99999, 142857, 148149, 181819, 187110, 208495, 318682, 329967, 351352, 356643,-----

The Kaprekar numbers were named after Shri Dattathreya Ramchandra Kaprekar who discovered them.


Dr Rajesh Kumar Thakur