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Mean Value and Rolle’s Theorem. Review- 3-B. a. c. b. Rolle’s Theorem. Let f be differentiable on ( a,b ) and continuous on [ a,b ]. If then there is at least one point c belonging to ( a,b ) where.
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Mean Value andRolle’s Theorem Review- 3-B
a c b Rolle’s Theorem Let f be differentiable on (a,b) and continuous on [a,b]. If then there is at least one point c belonging to (a,b) where
1.) Determine whether Rolle’s Theorem can be applied on the interval, then find the values of c in the interval given the function with an interval of [1,2]
2.) Determine whether Rolle’s Theorem can be applied on the interval, then find the values of c in the interval given the function with an interval of [-2,2]
3.) Determine whether Rolle’s Theorem can be applied on the interval, then find the values of c in the interval given the function with an interval of [2,4]
c a b Mean Value Theorem • Let f be differentiable on (a,b) and continuous on [a,b], then there exists a point c belonging to (a,b) where
4.) Find all values of c which satisfies the MVT for the function on [-1,3]
5.) Find all values of c which satisfies the MVT for the function on [1,2]
6.) Find all values of c which satisfies the MVT for the function on [0,p]
Home Work Page 176 #11-19 odd, 39, 41, and 47
