`log_plog_punderset("n times")ubrace(rootp rootp rootp sqrt(.......rootpp,))p gt 0` and `pne1` is equal to

Let p=underset(xto0^(+))lim(1+tan^(2)sqrt(x))^((1)/(2x)) . Then log_(e)p is equal to

If a_(r ) gt 0, r in N and a_(1), a_(2) , a_(3) ,"……..",a_(2n) are in A.P. then : (a_(1) + a_(2n))/( sqrt( a_(1))+ sqrt(a_(2))) + ( a_(2) + a_(2n-1))/(sqrt(a_(2)) + sqrt(a_(3)))+"......"(a_(n)+a_(n+1))/(sqrt(a_(n))+sqrt(a_(n+1))) is equal to :

The inverse of the function f: R rarr R given by f(x) = log_{a}(x+sqrt(x^2+1)(a gt 0, a ne 1) is

A parallel plate capacitor with circular plates of radius 1 m has a capacitance of 1 nF. At t = 0, it is connected for charging in series with a resistor R = 1 M Omega across a 2V battery (Fig. 8.3). Calculate the magnetic field at a point P, halfway between the centre and the periphery of the plates, after t = 10^(-3) s . (The charge on the capacitor at time t is q (t) = CV [1 – exp (–t// tau) ], where the time constant tau is equal to CR.)

A and B are two events such that P(A) gt 0, P(B) != 1 then P(bar(A)//bar(B)) is equal to :

Let n=10lambda+r", where " lambda,rinN, 0lerle9. A number a is chosen at random from the set {1, 2, 3,…, n} and let p_n denote the probability that (a^2-1) is divisible by 10. If r=0, then np_n equals