A continuously compouned interest formula is

    A(t) = ,


where A(0) is starting amount (principal deposit); A(t) is the current amount; 
t is the time in years; "r" is the exponential rate coefficient, which is
under the problem's question.


30 months is 2.5 years, so we want

    2A(0) = .


It implies

    2 = .


Take the natural logarithm of both sides

    ln(2) = 2.5*r


and find the rate r

    r =  = 0.2773  (rounded).


ANSWER.  The compounded interest rate should be about 0.2773, or 27.73%.