[" If "n" is a natural number such thatn...

[" If "n" is a natural number such thatn "-p_(1)^(@)*P_(2)^(@)cdots P_(2)^(2)" and "p_(1),p_(2),...,P_(2)" are distin "],[" then in nelongs to "],[[" (A) "(k+ln2,alpha)," (B) "[k ln2,oo)],[[" (A) "(-oo,k/n2]," (D) "ln2,oo]]]

Similar Questions

Explore conceptually related problems

If n is a natural number such that n=P_1^(a_1)P_2^(a_2)P_3^(a_3)...P_k^(a_k) where p_1,p_2,...p_k are distinct primes then minimum value of log n is:

If n is a natural number such that n=P_(1)^(a_(1))P_(2)^(a_(2))P_(3)^(a_(3))...P_(k)^(a_(k)) where p_(1),p_(2),...p_(k) are distinct primes then minimum value of ln n is:

When P is a natural number then p^(n+1)+(p+1)^(2n-1) is divisible by

if p_(1) and p_(2) are odd prime numbers such that p_(1)gtp_(2) then P_(1)^(2) - P_(2)^(2) is always

If P_(1) and P_(2) are two odd prime numbers, such that P_(1) gt P_(2), then P_(1)^(2)-P_(2)^(2) is………….

If P_1 and P_2 are two odd prime numbers such that P_1>P_2 then P_1^2-P_2^2 is

2.^(n)P_(3)=^(n+1)P_(3)

If ^(^^)(n_(1)-n_(2))P_(2)=132,^(n_(1)-n_(2))P_(2)=30 then

If p is a natural number, then prove that p^(n+1) + (p+1)^(2n-1) is divisible by p^(2) + p +1 for every positive integer n.

[" If "n" is a natural number such thatn "-p_(1)^(@)*P_(2)^(@)cdots P_(2)^(2)" and "p_(1),p_(2),...,P_(2)" are distin "],[" then in nelongs to "],[[" (A) "(k+ln2,alpha)," (B) "[k ln2,oo)],[[" (A) "(-oo,k/n2]," (D) "ln2,oo]]]

Similar Questions

Recommended Questions