transgalactic Posted January 20, 2009 Share Posted January 20, 2009 suppose f is a continues function on point x_0 prove that g(x)=(x-x_0)*f(x) differentiable on x_0?? calculate g'(x_0) i tried to think like this: if f(x) is continues on x_0 then lim f(x) as x->x_0 equals f(x_0) mvt says f'©=[f(a)-f(b)] cauchys mvt says f'©/g'©=[f(a)-f(b)]/[g(a)-g(b)] ?? Link to comment Share on other sites More sharing options...
Bignose Posted January 20, 2009 Share Posted January 20, 2009 If you haven't learned the chain rule yet, applying the definition of the derivative should yield some good results. Link to comment Share on other sites More sharing options...
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