Lagranje's Mean Value theorem
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Lagrange's mean value theorem:
Let f(x) be defined and continuous at all x in the closed interval [a,b] and diffrentiable at all x in open interval (a,b).
There exists at least one number c satisfying a<c<b
Such that f¹(c)=f(b)-f(a)/b-a.
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Hope this helped you.............
__________________________
Lagrange's mean value theorem:
Let f(x) be defined and continuous at all x in the closed interval [a,b] and diffrentiable at all x in open interval (a,b).
There exists at least one number c satisfying a<c<b
Such that f¹(c)=f(b)-f(a)/b-a.
________________________________________________
Hope this helped you.............
Answered by
4
Lagrange's mean value Theorem :-
if a function ' f ' is
(1) continuous in closed interval [a, b]
(2) derivable in open interval (a, b) , then there exist at least one value c€ (a , b)
such that
{f(b) - f(a)}/(b - a) = f'(c)
if a function ' f ' is
(1) continuous in closed interval [a, b]
(2) derivable in open interval (a, b) , then there exist at least one value c€ (a , b)
such that
{f(b) - f(a)}/(b - a) = f'(c)
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