Write Leibnitz rule for integration in limit . With an example
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Proof of basic form The bounded convergence theorem states that if a sequence of functions on a set of finite measure is uniformly bounded and converges pointwise, then passage of the limit under the integral is valid. In particular, the limit and integral may be exchanged for every sequence {δn} → 0. ·
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heya ✌
In calculus, Leibniz's rule for differentiation under the integral sign, named after Gottfried Leibniz, states that for an integral of the form
That is :-
Integration of function f(x) dx with limit a to b ,
Using Leibnitz rule
→ f(a) da/dx + f(b) db/dx
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