" If "f(2)=4" and "f'(2)=1" then "(x rar...

" If "f(2)=4" and "f'(2)=1" then "_(x rarr2)(2f(2)-2f(x))/(x-2)

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If f(2)=2 and f'(2)=1, then find lim_(x rarr2)(xf(2)-2f(x))/(x-2)

if f(2)=4,f'(2)=1 then lim_(x rarr2)(xf(2)-2f(x))/(x-2)

if f(2)=4,f'(2)=1 then lim_(x rarr2)(xf(2)-2f(x))/(x-2)

lim_(x rarr2)(f(x)-f(2))/(x-2)=

If f(2)=4 and f'(2)=1, then find (lim)_(x rarr2)(xf(2)-2f(x))/(x-2)

Let f(2)=4 and f'(2)=4. Then lim_(x rarr2)(xf(2)-2f(x))/(x-2) is equal to

If f(2) = 4 and f^(')(2) =1 then lim_(x rarr 2) (x f(2)-2f (x))/(x-2)

If f(2)=2,f'(2)=1. then lim_(x rarr2)(2x^(2)-4f(x))/(x-2)=(i)-4(ii)-2(iii)2(iv)

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