If `f(x)` is continuous at `x=0`, where `f(x)=(log(2+x)-log(2-x))/(tan x)`, for `x!=0`, then `f(0)=`

If f(x) is continuous at x=0 , where f(x)=(log 100 + log (0.01 +x))/(3x) , for x!=0 , then f(0)=

If f(x) is continuous at x=0 , where f(x)=(log(1+x+x^(2))+log(1-x+x^(2)))/(sin x) , for x!=0 , then f(0)=

If f(x) is continuous at x=0 , where f(x)=((4^(sin x)-1)^(2))/(x log (1+2x)) , for x!=0 , then f(0)=

If f(x) is continuous at x=0 , where f(x)=((3^(sin x)-1)^(2))/(x log (1-x)) , for x!=0 , then f(0)=

If f(x) is continuous at x=0 , where f(x)=(log sec^(2)x)/(x sin x) , for x!= 0 then f(0)=

If f(x) is continuous at x=1 , where f(x)=(log_(2)2x)^(1/(log_(2)x) , for x!=1 , then f(1)=

If f(x) is continuous at x=0 , where f(x)=(log(1+x^(2))-log(1-x^(2)))/(sec x- cos x) , for x !=0 , then f(0)=

If f(x) is continuous at x=0 , where f(x)=(log(1+x^(2))-log(1-x^(2)))/(sec x- cos x) , for x !=0 , then f(0)=

If f(x) is continuous at x=7 , where f(x)=(log x-log 7)/(x-7) , for x!=7 , then f(7)=

If f(x) is continuous at x=0 , where f(x)=(1-cos 3x)/( x tan x) for x != 0 , then f(0)=