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000864969 001__ 864969
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000864969 008__ 151209s2015\\\\nyua\\\\oab\\\001\0\eng\d
000864969 020__ $$a9781606508558 $$q(electronic book)
000864969 035__ $$a(MiAaPQ)EBC4389020
000864969 035__ $$a(Au-PeEL)EBL4389020
000864969 035__ $$a(CaPaEBR)ebr11152407
000864969 035__ $$a(CaONFJC)MIL832650
000864969 035__ $$a(OCoLC)939262275
000864969 040__ $$aFINmELB$$bspa$$erda$$cFINmELB
000864969 050_4 $$aQA300$$b.G485 2015
000864969 0820_ $$a515$$223
000864969 1001_ $$aGeveci, Tunc.,$$eauthor.
000864969 24510 $$aIntroductory calculus :$$bunderstanding the derivative /$$cTunc Geveci.
000864969 264_1 $$aNew York, [New York] (222 East 46th Street, New York, NY 10017) :$$bMomentum Press,$$c2015.
000864969 300__ $$a1 online resource (136 pages) :$$billustrations.
000864969 336__ $$atext$$2rdacontent
000864969 337__ $$acomputer$$2rdamedia
000864969 338__ $$aonline resource$$2rdacarrier
000864969 500__ $$aCo-published with Cognella Academic Publishing.
000864969 500__ $$aIncludes index.
000864969 5050_ $$a1. The foundation of the derivative -- The derivative of a function at a point -- The derivative as a function -- The Leibniz notation -- 
000864969 5058_ $$a2. Using the derivative for powers and linear combinations -- The derivatives of rational powers of x -- The derivatives of linear combinations -- Higher-order derivatives -- The proof of the power rule for arbitrary rational powers -- 
000864969 5058_ $$a3. Using the derivatives of sine and cosine -- The derivatives of sine and cosine at 0 -- The derivative functions corresponding to sine and cosine -- 
000864969 5058_ $$a4. Using the derivative in velocity and acceleration -- 
000864969 5058_ $$a5. Local linear approximations -- The differential -- The traditional notation for the differential -- The accuracy of local linear approximations -- 
000864969 5058_ $$a6. Understanding the product and quotient rules -- The quotient rule -- 
000864969 5058_ $$a7. Applying the chain rule -- A plausibility argument for the chain rule -- The chain rule in the Leibniz notation -- The chain rule for more than two functions -- The proof of the chain rule -- 
000864969 5058_ $$a8. The problems of related rates -- 
000864969 5058_ $$a9. The intermediate value theorem -- Newton's method -- 
000864969 5058_ $$a10. Using implicit differentiation -- 
000864969 5058_ $$aIndex.
000864969 506__ $$aAccess limited to authorized users.
000864969 588__ $$aTitle from PDF title page (viewed on December 9, 2015).
000864969 650_0 $$aCalculus.
000864969 650_0 $$aDerivatives (Mathematics)
000864969 655_4 $$aLibros electronicos.
000864969 852__ $$bebk
000864969 85640 $$3ProQuest Ebook Central Academic Complete$$uhttps://univsouthin.idm.oclc.org/login?url=https://ebookcentral.proquest.com/lib/usiricelib-ebooks/detail.action?docID=4389020$$zOnline Access
000864969 909CO $$ooai:library.usi.edu:864969$$pGLOBAL_SET
000864969 980__ $$aEBOOK
000864969 980__ $$aBIB
000864969 982__ $$aEbook
000864969 983__ $$aOnline