The graph of the function y=f(x) has a unique tangent at the point (a, 0) through which the graph passes then, `lim_(x->a) (ln(1+6f(x))/(3f(x))`

If the graph of the function y=f(x) has a unique tangent at the point (a ,0) through which the graph passes, then evaluate lim_(x->a)(log_e{1+6f(x)})/(3f(x))

The graph of the function y = f(x) has a unique tangent at the point (e^a,0) through which the graph passes then lim__(x->e^a) (log_e {1+7f (x)} - sin f(x))/(3f(x))

The graph of the function y = f(x) has a unique tangent at the point (e^a,0) through which the graph passes then lim__(x->e^a) (log_e {1+7f (x)} - sin f(x))/(3f(x))

The graph of the function y=f(x) has a unique tangent at the point (a,0) through which the graph passes. Then evaluate lim_(x to a) (log_(e){1+6f(x)})/(3f(x)).

The graph of the function y=f(x) has a unique tangent at the point (a,0) through which the graph passes. Then evaluate lim_(x to a) (log_(e){1+6f(x)})/(3f(x)).

If the graph of the function y=f(x) has a unique tangent at the point (a,0) through which the graph passes,then evaluate lim_(x rarr a)(log_(e){1+6f(x)})/(3f(x))

The graph of the function y=f(x) has a unique tangent at the point (a,0) through the graph passes. Then, "lim"_(xrarra)[["log"_(e) (1+6) f (x)]]/(3f (x)) is equal to :

If the graph of the function y=f(x) has a unique tangent at the point (a ,0) through which the graph passes, then evaluate ("lim")_(xveca)((log)_e{1+6f(x)})/(3f(x))

The graph of function y=f(x) has a unique tangent at (e^a,0) , through which the graph passes, then lim_(xrarre^a)(log(1+7f(x))-sin(f(x)))/(3f(x)) is equal to