`underset(xto0)lim(log(1+x+x^(2))+log(1-x+x^(2)))/(secx-cosx)=`

lim_(xto0) (log(1+x+x^(2))+log(1-x+x^(2)))/(secx-cosx)=

lim_(x rarr0)(log(1+x+x^(2))+log(1-x+x^(2)))/(sec x-cos x)

lim_(x rarr0( a) -1)(log(1+x+x^(2))+log(1-x+x^(2)))/(sec x-cos x)=

The value of lim_(xrarr0)(ln(1+2x+4x^(2))+ln(1-2x+4x^(2)))/(secx-cosx) is equal to

underset(x to 1)lim (log_(2) 2x)^(log_ x^( 5)) is equal to

Let f(x)=(log (1+x+x^2)+log(1-x+x^2))/(sec x-cosx) , x ne 0 .Then the value of f(0) so that f is continuous at x=0 is

lim_(x rarr0)(log(1-x^(2)))/(log cos x)

underset(x to 0)lim x log sin x is equal to

lim_(x rarr0)(log(1-(x)/(2)))/(x)