Let `f(a)=g(a)=k` and their `n t h` derivatives exist and are not equal for some `ndot` If. `("lim")_(xveca)(f(a)g(x)-f(a)-g(a)f(x)+g(a))/(g(x)-f(x))=4`

Let f(a)=g(a)=k and their n t h derivatives exist and are not equal for some ndot If. ("lim")_(x->a)(f(a)g(x)-f(a)-g(a)f(x)+g(a))/(g(x)-f(x))=4 . Find the value of k.

Let f(a)=g(a)=k and their nth derivatives exist and are not equal for some n. If.lim_(x rarr a)(f(a)g(x)-f(a)-g(a)f(x)+g(a))/(g(x)-f(x))=4

Let f(a)=g(a)=k and their nth derivatives exist and be not equal for some n. If lim_(xtoa) (f(a)g(x)-f(a)-g(a)f(x)+g(a))/(g(x)-f(x))=4 then find the value of k.

Let f(a)=g(a)=k and their nth derivatives exist and be not equal for some n. If lim_(xtoa) (f(a)g(x)-f(a)-g(a)f(x)+g(a))/(g(x)-f(x))=4 then find the value of k.

Let f(a)=g(a)=k and their nth derivatives exist and be not equal for some n. If lim_(xtoa) (f(a)g(x)-f(a)-g(a)f(x)+g(a))/(g(x)-f(x))=4 then find the value of k.

Let f(a) = g(a) = k and their n^(th) order derivatives exist and are not equal for some n in N , further if lim_(x rarr a) (f(a)g(x)-f(a)-g(a) f(x)+g(a))/(g(x)-f(x)) = 4 then the value of k is

Let f(a)=g(a)=k and the their nth derivatives f^(n)(a),g^(n)(a) exixst and are not equal for some n. further if lim_(x to a)(f(a)g(x)-f(a)-g(a)f(x)+g(a))/(g(x)-f(x))=4 then the value of k is

Let f(a)=g(a)=k and their n^th order derivatives f^n(a),g^n(a) exist and are not equal for some n in N . Further, if lim_(xrarra)(f(a)g(x)-f(a)-g(a)f(x)+g(a))/(g(x)-f(x))=4 , then the value of k, is