If P is a prime, n is a positive integer...

If `P` is a prime, n is a positive integer and `n+p=2000, LCM` of `n and p` is `21879` then

Promotional Banner

Promotional Banner

Topper's Solved these Questions

REAL NUMBERS
MTG IIT JEE FOUNDATION|Exercise Exercise (Subjective Problems) ( Integer/Numerical Value Type)|10 Videos
REAL NUMBERS
MTG IIT JEE FOUNDATION|Exercise Olympiad/HOTS Corner|15 Videos
REAL NUMBERS
MTG IIT JEE FOUNDATION|Exercise Exercise ( Subjective Problems) ( Short Answer Type)|10 Videos
QUADRATIC EQUATIONS
MTG IIT JEE FOUNDATION|Exercise OLYMPAID/HOTS CORNER|15 Videos
SOME APPLICATIONS OF TRIGONOMETRY
MTG IIT JEE FOUNDATION|Exercise OLYMPIAD /HOTS CORNER |20 Videos

Similar Questions

Explore conceptually related problems

Statement-I: The exponent of 3 in 100! is 48 . Statement-II: If n is a t ve integer and p is a prime number then exponent is [(n)/(p)]+[(n)/(p^(2))]+[(n)/(p^(3))]+...

If p is a prime number,then LCM of p and (p+1) is

If a is any real number and m;n are positive integers; then (a^p)^q = a^(pq) = (a^q)^p

If a is any real number and m;n are positive integers; then a^(p)xx a^(q)=a^(p+q)

If n be a positive integer and P_(n) denotes the product of the binomial coefficients in the expansion of (1+x)^(n), prove that (P_(n+1))/(P_(n))=((n+1)^(n))/(n!)

If a is any real number and m;n are positive integers; then (a^(p))/(a^(q))=a^(p-q)

MTG IIT JEE FOUNDATION-REAL NUMBERS-Exercise ( Subjective Problems) ( Long Answer Type)

Let n=640640640643, without actually computing n^2. prove that n^2 lea...
Text Solution
|
Find the largest number of four digits exactly divisible by 12, 15, 18...
Text Solution
|
If P is a prime, n is a positive integer and n+p=2000, LCM of n and p ...
Text Solution
|
Find the smallest positive integer k such that (2000) (2001) k is a pe...
Text Solution
|
Let a, b, c, k be rational numbers such that k is not perfect cube if ...
Text Solution
|