A random variable X has poisson distribution with mean 2. Then `P(x gt 1.5)` is equal to a)`(2)/(e^(2))` b)0 c)`1-(3)/(e^(2))` d)`(3)/(e^(2))`

A poisson variable X satisfies P(X= 1) = P(X = 2) then P(X = 6) equal to a) (4)/(45) e^(-2) b) (1)/(45) e^(-1) c) (1)/(9) e^(-2) d) (1)/(4) e^(-2)

If y=(logx)^(2) , then (dy)/(dx) at x=e is equal to a)2 b) e/2 c)e d) 2/e

underset( x to 0)(lim) (e^(x^2) - cos x)/( x^2) is equal to a) 3/2 b) 1/2 c)1 d) - (3)/(2)

underset(x to 0 ) lim {(1 + tan x ) /(1 + sin x )}^(cosec x ) is equal to : a) (1)/(e) b) 1 c) e d) e^(2)

lim _(x to 0) (log (1 + 3x ^(2)))/( x ( e ^(5x) -1 )) is equal to a) 3/5 b) 5/3 c) (-3)/(5) d) (-5)/(3)

The random variable X has a probability distribution P(X) of the following form, where k is some number. Find P(X le 2) and P(X ge 2) P(x)={k, if x=0 " " 2k, if x=1 " " 3k if x=2 " " 0, otherwise}

If f(x)=log[e^(x)((3-x)/(3+x))^(1//3)] then f'(1) is equal to a) (3)/(4) b) (2)/(3) c) (1)/(3) d) (1)/(2)

The random variable X has a probability distribution P(X) of the following form, where k is some number. Find P(X lt 2) P(x)={k, if x=0 " " 2k, if x=1 " " 3k if x=2 " " 0, otherwise}

Integrate the function (e^(2 x)-1)/(e^(2 x)+1)