If lim(x to k)(x^(4)-1)/(x-1) = underse...

If `lim_(x to k)(x^(4)-1)/(x-1) = underset(x to k) lim (x^(3) - k^(3))/(x^(2) - k^(2))` them k is

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If Lim_(x to 1) (x^(4)-1)/(x-1)=Lim_(x to k) (x^(3)-k^(3))/(x^(2)-k^(2)) , find the value of k .

If lim_(x to 1) (x^(3) - 1)/(x - 1) = lim_(x to k) (x^(4) - k^(4))/(x^(3) - k^(3)) , find the value of k.

If lim_(x to 1) (x^(3) - 1)/(x - 1) = lim_(x to k) (x^(4) - k^(4))/(x^(3) - k^(3)) , find the value of k.

Evaluate, lim_(x to 1) (x^(4)-1)/(x-1)=lim_(x to k) (x^(3)-k^(3))/(x^(2)-k^(2)) , then find the value of k.

Find the value of k, if lim_(x rarr 1) (x^(4)-1)/(x-1) = lim_(x rarr k)(x^(3)-k^(3))/(x^(2)-k^(2))

Evaluate, lim_(x to 1) (x^(4)-1)/(x-1)=lim_(x to k) (x^(3)-k^(3))/(x^(2)-k^(2)) , then find the value of k.

Let lim_(x rarr1)(x^(4)-1)/(x-1)=lim_(k rarr k)(x^(3)-k^(3))/(x^(2)-k^(2)) then value of k is

lim_(xtooo)(1+k/x)^(m/x)

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