Let `log_2N=a_1+b_1,log_3N=a_2+b_2` and `log_5N=a_3+b_3`, where `a_1,a_2,a_3notin1` and `b_1,b_2 b_3 in [0,1)`.
If `a_1=6,a_2=4` and `a_3=3`,the difference of largest and smallest integral values of N, is

Let log_(a)N=alpha + beta where alpha is integer and beta =[0,1) . Then , On the basis of above information , answer the following questions. The difference of largest and smallest integral value of N satisfying alpha =3 and a =5 , is

If A=[[a_1,b_1,c_1],[a_2,b_2,c_2],[a_3,b_3,c_3]] and B=[[ c_1,c_2,c_2],[a_1,a_2,a_3],[b_1,b_2,b_3]] then

If A={1,2,3,4} and B={1,2,3,5,6}, then find A cap B and B cap A. Are they equal.

In the pair of linear equations a_1x+b_1y+c_1=0 and a_2x+ b_2y + C_2 = 0. If a_1/a_2 ne b_1/b_2 then the

If a_1,a_2,a_3,.....,a_(n+1) be (n+1) different prime numbers, then the number of different factors (other than1) of a_1^m.a_2.a_3...a_(n+1) , is

Let, a_1,a_2,a_3,…. be in harmonic progression with a_1=5 " and " a_(20)=25 The least positive integer n for which a_n lt 0

The velocity of a particle is given by v = 3+6 (a_1 + a_2 t) where a, and an are constants and t is time. The acc. of particle is:

Given that log_2a=lamda,log_4b=lamda^2 and log_(c^2)(8)=2/(lamda^3+1) write log_2((a^2b^5)/5) as a function of lamda,(a,b,cgt0,cne1) .

Let a_1, a_2, a_3, ,a_(11) be real numbers satisfying a_1=15 , 27-2a_2>0 a n da_k=2a_(k-1)-a_(k-2) for k=3,4, , 11. If (a1 2+a2 2+...+a 11 2)/(11)=90 , then the value of (a1+a2++a 11)/(11) is equals to _______.

Let a_(0)=2,a_1=5 and for n ge 2, a_n=5a_(n-1)-6a_(n-2) . Then prove by induction that a_(n)=2^(n)+3^(n) forall n in Z^+ .