A Nice Exponential Math Problem | Math Olympiad Question
A Nice Exponential Math Problem | Math Olympiad Question #matholympiad
Жүктеу.....
Пікірлер: 9
@user-qc6gj8cg2j8 ай бұрын
FIRST Nice video sir👍👍 Awesome, thank you so much.🤞
@PakMaths
8 ай бұрын
Thanks.....❣️❣️👍
@aryabhattagamharia55868 ай бұрын
Amazing question sir
@PakMaths
8 ай бұрын
❣️❣️❣️
@deadkiller41298 ай бұрын
I did this via a comparison approach Given natural number powers of 2 that is greater than 2016 but close to it is 2048, which is 2^11. Writing 2016 in terms of 2048 via subtraction would be 2048 - 32. By comparison, 2^x -2^y = 2^11 - 2^5 x=11, y=5
@PakMaths
8 ай бұрын
Excellent.....👍👍
@YAWTon
8 ай бұрын
@@PakMaths Yes, obvious and much faster method, but difficult to turn it into a 9 minutes boring YT clip...
@YAWTon8 ай бұрын
"this (63) is a prime number". Really?! I don't think so, since 63=3*3*7...
@PakMaths
8 ай бұрын
Sorry it's not a prime number, but cannot be expressed in the power of a single digit.
Пікірлер: 9
FIRST Nice video sir👍👍 Awesome, thank you so much.🤞
@PakMaths
8 ай бұрын
Thanks.....❣️❣️👍
Amazing question sir
@PakMaths
8 ай бұрын
❣️❣️❣️
I did this via a comparison approach Given natural number powers of 2 that is greater than 2016 but close to it is 2048, which is 2^11. Writing 2016 in terms of 2048 via subtraction would be 2048 - 32. By comparison, 2^x -2^y = 2^11 - 2^5 x=11, y=5
@PakMaths
8 ай бұрын
Excellent.....👍👍
@YAWTon
8 ай бұрын
@@PakMaths Yes, obvious and much faster method, but difficult to turn it into a 9 minutes boring YT clip...
"this (63) is a prime number". Really?! I don't think so, since 63=3*3*7...
@PakMaths
8 ай бұрын
Sorry it's not a prime number, but cannot be expressed in the power of a single digit.