If `(e^(5x)+e^(x))/(e^(3x))` is expand in a series of ascending powers of x and n is and odd natural number then the coefficent of `x^(n)` is

If (7x-1)/(1-5x+6x^(2)) is expanded in ascending powers of x when |x|<(1)/(3), then the cofficient of x^(n) is -A.2^(n)+4.3^(n), then A=

If "log"_(e) (1)/(1 + x + x^(2) + x^(3)) be expemnded in asecending power of x , show that the coefficient of x^(n) is - (1)/(n) if n is odd or of the form 4m + 2 and (3)/(2) if n is of the form 4m

If (x-4)/(x^(2)-5x+6) can be expanded in the ascending powers of x, then the coefficient of x^(3)

int(e^(3x))/((5+e^(3x))^(4))dx

lim_(x rarr -a) (x^(n)+a^(n))/(x+a) (where n is an odd natural number)

In the expansion of (e^(x)-1-x)/(x^(2)) is ascending powers of x the fourth term is

x=(e^(n)-e^(-n))/(e^(n)+e^(-n)) then the value of n

e^(4x)+2e^(3x)-e^x-6=0 find the number of solutions

(d)/(dx)[log((x^(n))/(e^(x)))]=

Evaluate: int(e^(3x)+e^(5x))/(e^(x)+e^(-x))dx