{"id":1433,"date":"2017-03-02T15:05:09","date_gmt":"2017-03-02T20:05:09","guid":{"rendered":"https:\/\/www.bates.edu\/mathematics\/?page_id=1433"},"modified":"2022-06-30T17:27:34","modified_gmt":"2022-06-30T21:27:34","slug":"math-105-calculus-i-old-quizzes","status":"publish","type":"page","link":"https:\/\/www.bates.edu\/mathematics\/math-105-calculus-i-old-quizzes\/","title":{"rendered":"Math 105 (Calculus I): old quizzes"},"content":{"rendered":"

 <\/p>\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n\n
Term<\/th>\nDate<\/th>\nInstructor<\/th>\nTopic(s)<\/th>\nText Sections<\/th>\nSolutions<\/th>\n<\/tr>\n
W15<\/td>\n01\/23\/15<\/a><\/td>\nGreer<\/td>\nfunctions, graphs, elementary functions<\/td>\n(O\/Z) 1.1, 1.2, 1.3<\/td>\nyes<\/a><\/td>\n<\/tr>\n
W15<\/td>\n01\/30\/15<\/a><\/td>\nGreer<\/td>\nderivatives, estimating derivatives<\/td>\n(O\/Z) 1.4, 1.5, 1.6<\/td>\nyes<\/a><\/td>\n<\/tr>\n
W15<\/td>\n02\/06\/15<\/a><\/td>\nGreer<\/td>\ndefining the derivative, limits<\/td>\n(O\/Z) 2.1, 2.3<\/td>\nyes<\/a><\/td>\n<\/tr>\n
W15<\/td>\n02\/27\/15<\/a><\/td>\nGreer<\/td>\nderivatives of exponential and trigonometric functions<\/td>\n(O\/Z) 2.6, 2.7<\/td>\nyes<\/a><\/td>\n<\/tr>\n
W15<\/td>\n03\/06\/15<\/a><\/td>\nGreer<\/td>\nchain rule, implicit differentiation<\/td>\n(O\/Z) 3.2, 3.3<\/td>\nyes<\/a><\/td>\n<\/tr>\n
W15<\/td>\n03\/13\/15<\/a><\/td>\nGreer<\/td>\nmiscellaneous derivatives, limits and L’Hopital’s Rule<\/td>\n(O\/Z) 3.5, 4.2<\/td>\nyes<\/a><\/td>\n<\/tr>\n
W15<\/td>\n03\/27\/15<\/a><\/td>\nGreer<\/td>\nIntermediate Value Theorem<\/td>\n(O\/Z) 4.8<\/td>\nyes<\/a><\/td>\n<\/tr>\n
W15<\/td>\n04\/03\/15<\/a><\/td>\nGreer<\/td>\nrelated rates, areas and integrals<\/td>\n(O\/Z) 4.5, 5.1<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F14<\/td>\n09\/12\/14<\/a><\/td>\nBalcomb<\/td>\nfunctions and graphs<\/td>\n(O\/Z) 1.1, 1.2, 1.3<\/td>\nno<\/td>\n<\/tr>\n
F14<\/td>\n09\/19\/14<\/a><\/td>\nBalcomb<\/td>\ngeometry of derivatives and of higher-order derivatives<\/td>\n(O\/Z) 1.4, 1.6, 1.7<\/td>\nno<\/td>\n<\/tr>\n
F14<\/td>\n09\/26\/14<\/a><\/td>\nBalcomb<\/td>\ndefining the derivative, the power rule<\/td>\n(O\/Z) 2.1, 2.2<\/td>\nno<\/td>\n<\/tr>\n
F14<\/td>\n10\/13\/14<\/a><\/td>\nBalcomb<\/td>\ndifferential equations, derivatives of exponential and trig functions<\/td>\n(O\/Z) 2.5, 2,6, 2.7<\/td>\nno<\/td>\n<\/tr>\n
F14<\/td>\n10\/24\/14<\/a><\/td>\nBalcomb<\/td>\nchain rule, implicit differentiation<\/td>\n(O\/Z) 3.2, 3.3<\/td>\nno<\/td>\n<\/tr>\n
W14<\/td>\n01\/15\/14<\/a><\/td>\nBuell<\/td>\nfunctions and graphs<\/td>\n(O\/Z) 1.1, 1.2, 1.3<\/td>\nyes<\/a><\/td>\n<\/tr>\n
W14<\/td>\n01\/24\/14<\/a><\/td>\nBuell<\/td>\nrate functions, geometry of derivatives and of higher-order derivatives<\/td>\n(O\/Z) 1.4, 1.6, 1.7<\/td>\nyes<\/a><\/td>\n<\/tr>\n
W14<\/td>\n01\/31\/14<\/a><\/td>\nBuell<\/td>\ndefinition of the derivative, derivatives of power functions, limits<\/td>\n(O\/Z) 2.1, 2.2, 2.3<\/td>\nyes<\/a><\/td>\n<\/tr>\n
W14<\/td>\n02\/14\/14<\/a><\/td>\nBuell<\/td>\ndifferential equations, derivatives of exponential, logarithmic, and trigonometric functions<\/td>\n(O\/Z) 2.5, 2.6, 2.7<\/td>\nyes<\/a><\/td>\n<\/tr>\n
W14<\/td>\n02\/28\/14<\/a><\/td>\nBuell<\/td>\nproduct rule, quotient rule, chain rule<\/td>\n(O\/Z) 3.1, 3.2<\/td>\nyes<\/a><\/td>\n<\/tr>\n
W14<\/td>\n03\/07\/14<\/a><\/td>\nBuell<\/td>\nimplicit differentiation, derivatives of inverse functions, miscellaneous derivatives and antiderivatives<\/td>\n(O\/Z) 3.3, 3.4, 3.5<\/td>\nyes<\/a><\/td>\n<\/tr>\n
W14<\/td>\n03\/21\/14<\/a><\/td>\nBuell<\/td>\nrelated rates, Intermediate Value Theorem, Mean Value Theorem<\/td>\n(O\/Z) 4.5, 4.8, 4.9<\/td>\nyes<\/a><\/td>\n<\/tr>\n
W14<\/td>\n03\/28\/14<\/a><\/td>\nBuell<\/td>\nareas, integrals, Riemann sums<\/td>\n(O\/Z) 5.1, 5.6, 5.7<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F13<\/td>\n09\/13\/13<\/a><\/td>\nNelson<\/td>\nfunctions and graphs<\/td>\n(O\/Z) 1.1, 1.2<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F13<\/td>\n09\/20\/13<\/a><\/td>\nNelson<\/td>\nthe geometry of derivatives<\/td>\n(O\/Z) 1.6<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F13<\/td>\n09\/27\/13<\/a><\/td>\nNelson<\/td>\nthe geometry of higher-order derivatives, estimating derivatives, the definition of the derivative<\/td>\n(O\/Z) 1.5, 1.7, 2.1<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F13<\/td>\n10\/11\/13<\/a><\/td>\nNelson<\/td>\ndifferential equations, derivatives and antiderivatives of exponential and logarithmic functions<\/td>\n(O\/Z) 2.5, 2.6<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F13<\/td>\n10\/25\/13<\/a><\/td>\nNelson<\/td>\nderivatives of trigonometric functions, product rule, quotient rule, chain rule<\/td>\n(O\/Z) 2.7, 3.1, 3.2<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F13<\/td>\n11\/01\/13<\/a><\/td>\nNelson<\/td>\nderivatives of inverse functions, implicit differentiation<\/td>\n(O\/Z) 3.3, 3.4<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F13<\/td>\n11\/22\/13<\/a><\/td>\nNelson<\/td>\nlimits, L’Hopital’s Rule, Intermediate Value Theorem<\/td>\n(O\/Z) 4.2, 4.8<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F13<\/td>\n09\/13\/13A<\/a><\/td>\nRoss<\/td>\n(Quiz 1) domain, range, new functions from old, estimating the derivative at a point<\/td>\n(O\/Z) 1.1, 1.2, 1.5<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F13<\/td>\n09\/13\/13B<\/a><\/td>\nRoss<\/td>\n(Quiz 1) domain, range, new functions from old, estimating the derivative at a point<\/td>\n(O\/Z) 1.1, 1.2, 1.5<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F13<\/td>\n09\/20\/13A<\/a><\/td>\nRoss<\/td>\n(Quiz 2) geometry of first and second derivatives<\/td>\n(O\/Z) 1.6, 1.7<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F13<\/td>\n09\/20\/13B<\/a><\/td>\nRoss<\/td>\n(Quiz 2) geometry of first and second derivatives<\/td>\n(O\/Z) 1.6, 1.7<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F13<\/td>\n10\/11\/13A<\/a><\/td>\nRoss<\/td>\n(Quiz 4) derivatives of exponential and logarithmic functions<\/td>\n(O\/Z) 2.6<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F13<\/td>\n10\/11\/13B<\/a><\/td>\nRoss<\/td>\n(Quiz 4) derivatives of exponential and logarithmic functions<\/td>\n(O\/Z) 2.6<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F13<\/td>\n10\/25\/13A<\/a><\/td>\nRoss<\/td>\n(Quiz 5) product rule, quotient rule, chain rule, implicit differentiation<\/td>\n(O\/Z) 3.1, 3.2, 3.3<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F13<\/td>\n10\/25\/13B<\/a><\/td>\nRoss<\/td>\n(Quiz 5) product rule, quotient rule, chain rule, implicit differentiation<\/td>\n(O\/Z) 3.1, 3.2, 3.3<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F13<\/td>\n11\/01\/13A<\/a><\/td>\nRoss<\/td>\n(Quiz 6) logarithmic differentiation<\/td>\n(O\/Z) 3.5<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F13<\/td>\n11\/01\/13B<\/a><\/td>\nRoss<\/td>\n(Quiz 6) logarithmic differentiation<\/td>\n(O\/Z) 3.5<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F13<\/td>\n11\/15\/13<\/a><\/td>\nRoss<\/td>\n(Quiz 7) continuity and differentiability in piecewise-defined functions, IVT, EVT, and use of the IVT to guarantee a polynomial has a root<\/td>\n(O\/Z) 4.8<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F13<\/td>\n11\/22\/13<\/a><\/td>\nRoss<\/td>\n(Quiz 8) related rates, Mean Value Theorem, definite integral as signed area<\/td>\n(O\/Z) 4.5, 4.9, 5.1<\/td>\nyes<\/a><\/td>\n<\/tr>\n
W13<\/td>\n01\/18\/13<\/a><\/td>\nNelson<\/td>\nfunctions, graphs, derivatives<\/td>\n(O\/Z) 1.1, 1.2, 1.3, 1.4, 1.6<\/td>\nyes<\/a><\/td>\n<\/tr>\n
W13<\/td>\n01\/25\/13<\/a><\/td>\nNelson<\/td>\nthe geometry of derivatives, the speed limit law<\/td>\n(O\/Z) 1.6<\/td>\nyes<\/a><\/td>\n<\/tr>\n
W13<\/td>\n02\/01\/13<\/a><\/td>\nNelson<\/td>\nthe geometry of higher order derivatives, the definition of the derivative, estimating derivatives<\/td>\n(O\/Z) 1.5, 1.7, 2.1<\/td>\nyes<\/a><\/td>\n<\/tr>\n
W13<\/td>\n02\/15\/13<\/a><\/td>\nNelson<\/td>\ndifferential equations, derivatives and antiderivatives of power, exponential, and logarithmic functions<\/td>\n(O\/Z) 2.5, 2.6<\/td>\nyes<\/a><\/td>\n<\/tr>\n
W13<\/td>\n03\/01\/13<\/a><\/td>\nNelson<\/td>\nderivatives of products, quotients, and composites<\/td>\n(O\/Z) 3.1, 3.2<\/td>\nyes<\/a><\/td>\n<\/tr>\n
W13<\/td>\n03\/29\/13<\/a><\/td>\nNelson<\/td>\nIntermediate Value Theorem, related rates, L’Hopital’s Rule<\/td>\n(O\/Z) 4.2, 4.5, 4.8<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F12<\/td>\n09\/14\/12<\/a><\/td>\nBuell<\/td>\ndomains and ranges of algebraic functions, shapes of graphs, types of functions<\/td>\n(O\/Z) 1.1, 1.2, 1.3, 1.4<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F12<\/td>\n09\/21\/12<\/a><\/td>\nBuell<\/td>\ngeometry of derivatives and higher-order derivatives, limits<\/td>\n(O\/Z) 1.6, 1.7, 2.3<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F12<\/td>\n09\/28\/12<\/a><\/td>\nBuell<\/td>\ndefinition of the derivatives, derivatives of power functions<\/td>\n(O\/Z) 2.1, 2.2<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F12<\/td>\n10\/12\/12<\/a><\/td>\nBuell<\/td>\ndifferential equations, derivatives of exponentials, of logs, and of trigonometric functions<\/td>\n(O\/Z) 2.5, 2.6, 2.7<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F12<\/td>\n10\/22\/12<\/a><\/td>\nBuell<\/td>\ndifferential equations, derivatives of exponentials, of logs, of trigonometric functions, of products, and of quotients<\/td>\n(O\/Z) 2.5, 2.6, 2.7, 3.1<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F12<\/td>\n11\/02\/12<\/a><\/td>\nBuell<\/td>\nderivatives of composites and of inverse functions, implicit differentiation<\/td>\n(O\/Z) 3.2, 3.3, 3.4, 3.5<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F12<\/td>\n11\/26\/12<\/a><\/td>\nBuell<\/td>\nIntermediate Value Theorem, Mean Value Theorem, areas and integrals<\/td>\n(O\/Z) 4.8, 4.9, 5.1<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F12<\/td>\n12\/07\/12<\/a><\/td>\nBuell<\/td>\nlimit definition of the definite integral, Fundamental Theorem of Calculus<\/td>\n(O\/Z) 5.3, 5.6, 5.7<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F12<\/td>\n09\/14\/12<\/a><\/td>\nCoulombe<\/td>\nfunctions and graphs<\/td>\n(O\/Z) 1.1, 1.2<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F12<\/td>\n09\/21\/12<\/a><\/td>\nCoulombe<\/td>\ngeometry of derivatives<\/td>\n(O\/Z) 1.4, 1.6<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F12<\/td>\n10\/15\/12<\/a><\/td>\nCoulombe<\/td>\nderivatives of exponentials, of logs, and of trigonometric functions<\/td>\n(O\/Z) 2.6, 2.7<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F12<\/td>\n10\/26\/12<\/a><\/td>\nCoulombe<\/td>\nderivatives of products and of composites, implicit differentiation<\/td>\n(O\/Z) 3.1, 3.2, 3.3<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F12<\/td>\n11\/15\/12<\/a><\/td>\nCoulombe<\/td>\nrelated rates<\/td>\n(O\/Z) 4.5<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F12<\/td>\n11\/16\/12<\/a><\/td>\nCoulombe<\/td>\nIntermediate Value Theorem, Extreme Value Theorem<\/td>\n(O\/Z) 4.8, 4.9<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F12<\/td>\n11\/30\/12<\/a><\/td>\nCoulombe<\/td>\nareas, integrals, approximating sums<\/td>\n(O\/Z) 5.1, 5.6<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F12<\/td>\n09\/07\/12<\/a><\/td>\nHaines<\/td>\nfunctions<\/td>\n(O\/Z) 1.1<\/td>\nno<\/td>\n<\/tr>\n
F12<\/td>\n09\/10\/12<\/a><\/td>\nHaines<\/td>\nodd and even functions<\/td>\n(O\/Z) 1.2<\/td>\nno<\/td>\n<\/tr>\n
F12<\/td>\n09\/12\/12<\/a><\/td>\nHaines<\/td>\nelementary functions<\/td>\n(O\/Z) 1.3<\/td>\nno<\/td>\n<\/tr>\n
F12<\/td>\n09\/14\/12<\/a><\/td>\nHaines<\/td>\nrate functions<\/td>\n(O\/Z) 1.4<\/td>\nno<\/td>\n<\/tr>\n
F12<\/td>\n09\/17\/12<\/a><\/td>\nHaines<\/td>\ngeometry of derivatives<\/td>\n(O\/Z) 1.6<\/td>\nno<\/td>\n<\/tr>\n
F12<\/td>\n09\/19\/12<\/a><\/td>\nHaines<\/td>\ngeometry of higher-order derivatives<\/td>\n(O\/Z) 1.7<\/td>\nno<\/td>\n<\/tr>\n
F12<\/td>\n09\/21\/12<\/a><\/td>\nHaines<\/td>\nestimating derivatives<\/td>\n(O\/Z) 1.5<\/td>\nno<\/td>\n<\/tr>\n
F12<\/td>\n09\/24\/12<\/a><\/td>\nHaines<\/td>\ndefining the derivative<\/td>\n(O\/Z) 2.1<\/td>\nno<\/td>\n<\/tr>\n
F12<\/td>\n09\/26\/12<\/a><\/td>\nHaines<\/td>\nderivatives of power functions<\/td>\n(O\/Z) 2.2<\/td>\nno<\/td>\n<\/tr>\n
F12<\/td>\n09\/28\/12<\/a><\/td>\nHaines<\/td>\nlimits<\/td>\n(O\/Z) 2.3<\/td>\nno<\/td>\n<\/tr>\n
F12<\/td>\n10\/01\/12<\/a><\/td>\nHaines<\/td>\nderivative and antiderivative formulas<\/td>\n(O\/Z) 2.4<\/td>\nno<\/td>\n<\/tr>\n
F12<\/td>\n10\/10\/12<\/a><\/td>\nHaines<\/td>\nderivatives and antiderivatives of exponentials<\/td>\n(O\/Z) 2.6<\/td>\nno<\/td>\n<\/tr>\n
F12<\/td>\n10\/12\/12<\/a><\/td>\nHaines<\/td>\nderivatives and antiderivatives of trig functions<\/td>\n(O\/Z) 2.7<\/td>\nno<\/td>\n<\/tr>\n
F12<\/td>\n10\/15\/12<\/a><\/td>\nHaines<\/td>\nderivatives of products<\/td>\n(O\/Z) 3.1<\/td>\nno<\/td>\n<\/tr>\n
F12<\/td>\n10\/22\/12<\/a><\/td>\nHaines<\/td>\nderivatives of composites<\/td>\n(O\/Z) 3.2<\/td>\nno<\/td>\n<\/tr>\n
F12<\/td>\n10\/24\/12<\/a><\/td>\nHaines<\/td>\nimplicit differentiation<\/td>\n(O\/Z) 3.3<\/td>\nno<\/td>\n<\/tr>\n
F12<\/td>\n10\/29\/12<\/a><\/td>\nHaines<\/td>\nderivatives of inverse functions<\/td>\n(O\/Z) 3.4<\/td>\nno<\/td>\n<\/tr>\n
F12<\/td>\n10\/31\/12<\/a><\/td>\nHaines<\/td>\nmiscellaneous derivatives<\/td>\n(O\/Z) 3.5<\/td>\nno<\/td>\n<\/tr>\n
F12<\/td>\n11\/02\/12<\/a><\/td>\nHaines<\/td>\nlimits and L’Hopital’s Rule<\/td>\n(O\/Z) 4.2<\/td>\nno<\/td>\n<\/tr>\n
F12<\/td>\n11\/05\/12<\/a><\/td>\nHaines<\/td>\noptimization<\/td>\n(O\/Z) 4.3<\/td>\nno<\/td>\n<\/tr>\n
F12<\/td>\n11\/14\/12<\/a><\/td>\nHaines<\/td>\nrelated rates<\/td>\n(O\/Z) 4.5<\/td>\nno<\/td>\n<\/tr>\n
F12<\/td>\n11\/16\/12<\/a><\/td>\nHaines<\/td>\nIntermediate Value Theorem<\/td>\n(O\/Z) 4.8<\/td>\nno<\/td>\n<\/tr>\n
F12<\/td>\n11\/26\/12<\/a><\/td>\nHaines<\/td>\nvery important stuff<\/td>\n(O\/Z) 3.14159…<\/td>\nno<\/td>\n<\/tr>\n
F12<\/td>\n11\/28\/12<\/a><\/td>\nHaines<\/td>\nareas and integrals<\/td>\n(O\/Z) 5.1<\/td>\nno<\/td>\n<\/tr>\n
F12<\/td>\n11\/30\/12<\/a><\/td>\nHaines<\/td>\nthe area function<\/td>\n(O\/Z) 5.2<\/td>\nno<\/td>\n<\/tr>\n
F12<\/td>\n12\/03\/12<\/a><\/td>\nHaines<\/td>\nthe Fundamental Theorem of Calculus<\/td>\n(O\/Z) 5.3<\/td>\nno<\/td>\n<\/tr>\n
F12<\/td>\n12\/05\/12<\/a><\/td>\nHaines<\/td>\napproximating sums<\/td>\n(O\/Z) 5.6<\/td>\nno<\/td>\n<\/tr>\n
F12<\/td>\n09\/18\/12<\/a><\/td>\nNelson<\/td>\nfunctions, graphs, rate functions<\/td>\n(O\/Z) 1.1, 1.2, 1.3, 1.4<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F12<\/td>\n09\/26\/12<\/a><\/td>\nNelson<\/td>\ngeometry of derivatives and higher-order derivatives<\/td>\n(O\/Z) 1.6, 1.7<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F12<\/td>\n10\/15\/12<\/a><\/td>\nNelson<\/td>\ndifferential equations, derivatives of exponetials, of logs, and of trigonometric functions<\/td>\n(O\/Z) 2.5, 2.6, 2.7<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F12<\/td>\n10\/31\/12A<\/a><\/td>\nNelson<\/td>\nderivatives of products, of quotients, and of composites, implicit differentiation<\/td>\n(O\/Z) 3.1, 3.2, 3.3, 3.4<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F12<\/td>\n10\/31\/12B<\/a><\/td>\nNelson<\/td>\nderivatives of products, of quotients, and of composites, implicit differentiation<\/td>\n(O\/Z) 3.1, 3.2, 3.3, 3.4<\/td>\nyes<\/a><\/td>\n<\/tr>\n
F12<\/td>\n11\/30\/12<\/a><\/td>\nNelson<\/td>\nIntermediate Value Theorem, Extreme Value Theorem, Mean Value Theorem<\/td>\n(O\/Z) 4.8, 4.9<\/td>\nyes<\/a><\/td>\n<\/tr>\n
W12<\/td>\n01\/20\/12<\/a><\/td>\nBuell<\/td>\ndomain, range, transformations, definition of derivative<\/td>\n(O\/Z) 1.1, 1.2, 1.3, 1.4<\/td>\nyes<\/a><\/td>\n<\/tr>\n
W12<\/td>\n01\/27\/12<\/a><\/td>\nBuell<\/td>\nestimating derivatives, geometry of derivatives and higher-order derivatives<\/td>\n(O\/Z) 1.4, 1.5, 1.6, 1.7<\/td>\nyes<\/a><\/td>\n<\/tr>\n
W12<\/td>\n02\/03\/12<\/a><\/td>\nBuell<\/td>\ndefinition of derivative, derivatives of powers<\/td>\n(O\/Z) 2.1, 2.2<\/td>\nyes<\/a><\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n","protected":false},"excerpt":{"rendered":"

  Term Date Instructor Topic(s) Text Sections Solutions W15 01\/23\/15 Greer functions,…<\/p>\n","protected":false},"author":122,"featured_media":0,"parent":0,"menu_order":0,"comment_status":"closed","ping_status":"closed","template":"","meta":{"_hide_ai_chatbot":false,"_ai_chatbot_style":"","associated_faculty":[],"_Page_Specific_Css":"","_bates_restrict_mod":false,"_batesModPostContentOverride_prepend":false,"_batesModPostContentOverride_append":false,"_batesModPostContentOverride_append_before_footer":false,"_table_of_contents_display":false,"_table_of_contents_location":"","_table_of_contents_disableSticky":false,"_is_featured":false,"footnotes":"","_bates_seo_meta_description":"","_bates_seo_block_robots":false,"_bates_seo_sharing_image_id":0,"_bates_seo_sharing_image_twitter_id":0,"_bates_seo_share_title":"","_bates_seo_canonical_overwrite":"","_bates_seo_twitter_template":""},"class_list":["post-1433","page","type-page","status-publish","hentry"],"_links":{"self":[{"href":"https:\/\/www.bates.edu\/mathematics\/wp-json\/wp\/v2\/pages\/1433","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/www.bates.edu\/mathematics\/wp-json\/wp\/v2\/pages"}],"about":[{"href":"https:\/\/www.bates.edu\/mathematics\/wp-json\/wp\/v2\/types\/page"}],"author":[{"embeddable":true,"href":"https:\/\/www.bates.edu\/mathematics\/wp-json\/wp\/v2\/users\/122"}],"replies":[{"embeddable":true,"href":"https:\/\/www.bates.edu\/mathematics\/wp-json\/wp\/v2\/comments?post=1433"}],"version-history":[{"count":2,"href":"https:\/\/www.bates.edu\/mathematics\/wp-json\/wp\/v2\/pages\/1433\/revisions"}],"predecessor-version":[{"id":2379,"href":"https:\/\/www.bates.edu\/mathematics\/wp-json\/wp\/v2\/pages\/1433\/revisions\/2379"}],"wp:attachment":[{"href":"https:\/\/www.bates.edu\/mathematics\/wp-json\/wp\/v2\/media?parent=1433"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}