I7w=Odd +(I)  1Courier NewSymbolxyx1Courier New1Courier NewTimes New RomanTimes New Romanxyx1Courier New1Courier New1Courier New1Courier NewXdVXdVXdVXdV?/ <```@@@?~~~~~ԱޱޱԱ޿޿ph (((Pdd y d< p {2 ?0 N_??04'/2?26t?j\|?uaH????@@@@@@033333??@^ߛOw????uIc@T8V;@@?@ @@@T8?P;ZT8?@?@?@@dddddddddddddddddddddddddddddddddddddddd 2 2??@$$$04'/2?26t????????܍n)܍n)@?xM|NOPQRS<HnTx|n@ogf(x) y = g(x)O0O2??@$$$(\(\?aզ?????????(\(\?aզ?tx|엺 agf(a)pi/4(x,y) = (a,g(a))2 2??@$$$04'/2?26t????????@?̶зԸعܺdL0K@(gf(a)+(gf(a+h)-gf(a))/h*(x-a)y = g(a)+(g(a+h)-g(a))/h*(x-a)2??@$$$?vHB??????????vHB?Hvua+hgf(a+h)pi/4(x,y) = (a+h,g(a+h))2??@$$$QQ?x#9?????????QQ?x#9?,nطٷ۷ܷݷ ޷M a-hgf(a-h)pi/4(x,y) = (a-h,g(a-h))2 2??@$$$04'/2?26t????????@?М3LAgf(a)+dg(a)*(x-a)y = g(a)+dg(a)*(x-a)xyz(\(\?JXT@ ףp= ף4333333@T5+?Puuor,@@@@@@@@?@@@@@@@@@@@@@@@@@@ @< @< @<SQRT(X)@@@@@@@@?@@@@@@@@@@@@@@@@Gf@/1/(2*SQRT(X))R+4RPDGIllustration of the Derivative as the Slope of Tangent Line8hs3 Ҹ?|Ocb?fGi@Times New Roman ,Illustration of the Central Difference Formulationent Linem۶mێvAh#?|Ocb?0N@Times New Roman y = gf(x)Hg"܍n)@@g@1Courier New ,(x,y) = (a,gf(a))Hg"܍n)@ Qք@1Courier New ,y = gf(a)+(gf(a+h)-gf(a))/h*(x-a)@@@Hg"콟1͠@H(.@W0w@1Courier New p,(x,y) = (a+h,gf(a+h)))0 Hg"@Woa@1Courier New (,(x,y) = (a-h,gf(a-h)) Hg"@hqsW@1Courier New ,y = gf(a-h)+(gf(a+h)-gf(a-h))/(2h)*(x-a+h) Hg"@@1Courier New ,y = gf(a)+dg(a)*(x-a)))/(2h)*(x-a)+h)\@ Hg"@