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--- basic_tools:calculus:leibniz_integration_formula [2018/03/12 12:49]
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+++ basic_tools:calculus:leibniz_integration_formula [2018/03/28 12:28] (current)
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 ====== Leibniz Integration Formula ======
+<tabbox Intuitive>
+<tabbox Concrete>
 This tool gives a nice formula to the derivative of a one dimensional integral with dependencies to the varied quantity every where, with $f, a$ and $b$ having the right conditions
@@ Line 8: / Line 10: @@
 $$
+<tabbox Abstract>
+<tabbox Why is it interesting?>
-** Uses and further concepts**
 This formula is really nice in one dimenisonal [[basic tools:variational calculus|Variational Calculus]] and
-with $a(0) = a$, $b(0) = b$, and for the particle mechanics [[advanced_tools:noethers_theorems|Noether's Theorem]]. For integrals over arbitrary manifolds, it generalizes to the [[|Lie derivative]] of a volume element.
+with $a(0) = a$, $b(0) = b$, and for the particle mechanics [[theorems:noethers_theorems|Noether's Theorem]]. For integrals over arbitrary manifolds, it generalizes to the [[start|Lie derivative]] of a volume element.
+</tabbox>