The H.C.F of two equal positive integers k, k is :

The relation between L.C.M. and H.C.F. of two positive integers will be

If g and l are L.C.M. and H.C. F. of two positive integers, then the relation will be :

If N denotes the set of all positive integers and if : NtoN is defined by f(n)= the sum of positive divisors of n, then f(2^(k).3) , where k is a positive integer, is

sum_(k=1)^(360)(1)/(k sqrt(k+1)+(k+1)sqrt(k)) is the ratio of two relatively prime positive integers m and n then the value of m+n is equal to

sum_(k=1)^(360)((1)/(ksqrt(k+1)+(k+1)sqrt(k))) is the ratio of two relative prime positive integers m and n. The value of (m+n) is equal to

If N denotes the set of all positive integers and if f:N rarr N is defined by f(n)= the sum of positive divisors of n then f(2^(k)*3) where k is a positive integer is

If NN denotes the set of all positive integers and if f:NN rarrN is defined by f(n)= the sum of positive divisors of n then f(2^(k).3) , where k is a positive integer is