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Continuity+and+Differentiability

Continuity and differentiability are key concepts in calculus. A function is continuous if its value can change smoothly at every point in its domain. A function is differentiable if its derivative exists at every point, meaning the graph has a tangent line and its slope changes gradually. Together, continuity and differentiability allow functions to model real-world phenomena through smooth, unbroken curves and slopes.

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Continuity and Differentiability
Continuity and Differentiability posted on: 02 Jun, 2012 | updated on: 07 Jun, 2012 Powered by TCPDF (www.tcpdf.org)

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Continuity+and+Differentiability