Coursera / The Ohio State University - Calculus One

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Coursera / The Ohio State University - Calculus One (Size: 4.44 GB)
 arccosine.pdf54.33 KB
 cosine.pdf71.88 KB
 hallway-corner.pdf74.51 KB
 log-table.pdf61.74 KB
 Mooculus - Calculus (Printable).pdf2.72 MB
 Mooculus - Calculus.pdf2.73 MB
 quartersquares.pdf86.68 KB
 slideRule.pdf65.46 KB
 water-bowl-experiment.pdf46.44 KB
 water-bowl-radius.pdf42.85 KB
 water-bowl-volume.pdf5.88 KB
 1 - 1 - 1_177.00 Who will help me.srt2.28 KB
 1 - 10 - 1_186.09 Morally, what is the limit of a sum.srt6.78 KB
 1 - 11 - 1_187.10 What is the limit of a product.srt1.91 KB
 1 - 12 - 1_188.11 What is the limit of a quotient.srt13.26 KB
 1 - 13 - 1_189.12 How fast does a ball move.srt19.36 KB
 1 - 2 - 1_178.01 What is a function.srt16.13 KB
 1 - 3 - 1_179.02 When are two functions the same.srt7.16 KB
 1 - 4 - 1_180.03 How can more functions be made.srt4.52 KB
 1 - 5 - 1_181.04 What are some real-world examples of functions.srt9.76 KB
 1 - 6 - 1_182.05 What is the domain of square root.srt20.9 KB
 1 - 1 - 1_177.00 Who will help me.txt1.5 KB
 1 - 10 - 1_186.09 Morally, what is the limit of a sum.txt4.37 KB
 1 - 11 - 1_187.10 What is the limit of a product.txt1.22 KB
 1 - 12 - 1_188.11 What is the limit of a quotient.txt8.65 KB
 1 - 13 - 1_189.12 How fast does a ball move.txt12.73 KB
 1 - 2 - 1_178.01 What is a function.txt10.32 KB
 1 - 3 - 1_179.02 When are two functions the same.txt4.51 KB
 1 - 4 - 1_180.03 How can more functions be made.txt2.94 KB
 1 - 5 - 1_181.04 What are some real-world examples of functions.txt6.38 KB
 1 - 6 - 1_182.05 What is the domain of square root.txt13.62 KB
 1 - 1 - 1.00 Who will help me [146].mp46.62 MB
 1 - 10 - 1.09 Morally what is the limit of a sum [614].mp427.34 MB
 1 - 11 - 1.10 What is the limit of a product [213].mp49.34 MB
 1 - 12 - 1.11 What is the limit of a quotient [917].mp438.04 MB
 1 - 13 - 1.12 How fast does a ball move [1642].mp468.33 MB
 1 - 2 - 1.01 What is a function [1119].mp439.69 MB
 1 - 3 - 1.02 When are two functions the same [557].mp421.29 MB
 1 - 4 - 1.03 How can more functions be made [325].mp411.53 MB
 1 - 5 - 1.04 What are some real-world examples of functions [656].mp429.02 MB
 1 - 6 - 1.05 What is the domain of square root [1556].mp456.93 MB
 2 - 1 - 2_162.00 Where are we in the course.srt1.87 KB
 2 - 10 - 2_171.09 What is the difference between potential and actual infinity.srt3.64 KB
 2 - 11 - 2_172.10 What is the slope of a staircase.srt5.56 KB
 2 - 12 - 2_173.11 How fast does water drip from a faucet.srt3.38 KB
 2 - 13 - 2_174.12 BONUS What is the official definition of limit.srt4.48 KB
 2 - 14 - 2_175.13 BONUS Why is the limit of x^2 as x approaches 2 equal to 4.srt5.09 KB
 2 - 15 - 2_176.14 BONUS Why is the limit of 2x as x approaches 10 equal to 20.srt2.48 KB
 2 - 2 - 2_163.01 What is a one-sided limit.srt4.97 KB
 2 - 3 - 2_164.02 What does _continuous_ mean.srt7.18 KB
 2 - 4 - 2_165.03 What is the intermediate value theorem.srt3 KB
 2 - 1 - 2_162.00 Where are we in the course.txt1.25 KB
 2 - 10 - 2_171.09 What is the difference between potential and actual infinity.txt2.42 KB
 2 - 11 - 2_172.10 What is the slope of a staircase.txt3.61 KB
 2 - 12 - 2_173.11 How fast does water drip from a faucet.txt2.16 KB
 2 - 13 - 2_174.12 BONUS What is the official definition of limit.txt3.03 KB
 2 - 14 - 2_175.13 BONUS Why is the limit of x^2 as x approaches 2 equal to 4.txt3.41 KB
 2 - 15 - 2_176.14 BONUS Why is the limit of 2x as x approaches 10 equal to 20.txt1.63 KB
 2 - 2 - 2_163.01 What is a one-sided limit.txt3.35 KB
 2 - 3 - 2_164.02 What does _continuous_ mean.txt4.7 KB
 2 - 4 - 2_165.03 What is the intermediate value theorem.txt1.95 KB
 2 - 1 - 2.00 Where are we in the course [122].mp45.33 MB
 2 - 10 - 2.09 What is the difference between potential and actual infinity [249].mp411.45 MB
 2 - 11 - 2.10 What is the slope of a staircase [650].mp427.3 MB
 2 - 12 - 2.11 How fast does water drip from a faucet [521].mp418.47 MB
 2 - 13 - 2.12 BONUS What is the official definition of limit [334].mp412.55 MB
 2 - 14 - 2.13 BONUS Why is the limit of x2 as x approaches 2 equal to 4 [459].mp418.4 MB
 2 - 15 - 2.14 BONUS Why is the limit of 2x as x approaches 10 equal to 20 [217].mp47.85 MB
 2 - 2 - 2.01 What is a one-sided limit [345].mp415.6 MB
 2 - 3 - 2.02 What does continuous mean [501].mp419.67 MB
 2 - 4 - 2.03 What is the intermediate value theorem [223].mp48.59 MB
 3 - 1 - 3_149.00 What comes next.srt2.36 KB
 3 - 10 - 3_158.09 Why is the derivative of x^2 equal to 2x.srt13.93 KB
 3 - 11 - 3_159.10 What is the derivative of x^n.srt8.42 KB
 3 - 12 - 3_160.11 What is the derivative of x^3 + x^2.srt6.1 KB
 3 - 13 - 3_161.12 Why is the derivative of a sum the sum of derivatives.srt5.51 KB
 3 - 2 - 3_150.01 What is the definition of derivative.srt9.25 KB
 3 - 3 - 3_151.02 What is a tangent line.srt4.11 KB
 3 - 4 - 3_152.03 Why is the absolute value function not differentiable.srt2.89 KB
 3 - 5 - 3_153.04 How does wiggling x affect f(x).srt3.83 KB
 3 - 6 - 3.05 Why is sqrt(9999) so close to 99_154.995.srt6.37 KB
 3 - 1 - 3_149.00 What comes next.txt1.54 KB
 3 - 10 - 3_158.09 Why is the derivative of x^2 equal to 2x.txt9.15 KB
 3 - 11 - 3_159.10 What is the derivative of x^n.txt5.5 KB
 3 - 12 - 3_160.11 What is the derivative of x^3 + x^2.txt3.99 KB
 3 - 13 - 3_161.12 Why is the derivative of a sum the sum of derivatives.txt3.63 KB
 3 - 2 - 3_150.01 What is the definition of derivative.txt6.1 KB
 3 - 3 - 3_151.02 What is a tangent line.txt2.69 KB
 3 - 4 - 3_152.03 Why is the absolute value function not differentiable.txt1.91 KB
 3 - 5 - 3_153.04 How does wiggling x affect f(x).txt2.54 KB
 3 - 6 - 3.05 Why is sqrt(9999) so close to 99_154.995.txt4.19 KB
 3 - 1 - 3.00 What comes next Derivatives [137].mp45.98 MB
 3 - 10 - 3.09 Why is the derivative of x2 equal to 2x [1221].mp456.74 MB
 3 - 11 - 3.10 What is the derivative of xn [731].mp427.32 MB
 3 - 12 - 3.11 What is the derivative of x3 x2 [507].mp421.86 MB
 3 - 13 - 3.12 Why is the derivative of a sum the sum of derivatives [448].mp418.21 MB
 3 - 2 - 3.01 What is the definition of derivative [634].mp427.6 MB
 3 - 3 - 3.02 What is a tangent line [328].mp415.32 MB
 3 - 4 - 3.03 Why is the absolute value function not differentiable [238].mp412.99 MB
 3 - 5 - 3.04 How does wiggling x affect f(x) [329].mp414.7 MB
 3 - 6 - 3.05 Why is sqrt(9999) so close to 99.995 [543].mp423.78 MB
 4 - 1 - 4_135.00 What will Week 4 bring us.srt1.79 KB
 4 - 10 - 4_144.09 What are extreme values.srt9.1 KB
 4 - 11 - 4_145.10 How can I find extreme values.srt12.45 KB
 4 - 12 - 4_146.11 Do all local minimums look basically the same when you zoom in.srt4.58 KB
 4 - 13 - 4_147.12 How can I sketch a graph by hand.srt10.11 KB
 4 - 14 - 4_148.13 What is a function which is its own derivative.srt12.1 KB
 4 - 2 - 4_136.01 What is the derivative of f(x) g(x).srt7.03 KB
 4 - 3 - 4_137.02 Morally, why is the product rule true.srt7.19 KB
 4 - 4 - 4_138.03 How does one justify the product rule.srt7.06 KB
 4 - 5 - 4_139.04 What is the quotient rule.srt5.26 KB
 4 - 1 - 4_135.00 What will Week 4 bring us.txt1.2 KB
 4 - 10 - 4_144.09 What are extreme values.txt6.02 KB
 4 - 11 - 4_145.10 How can I find extreme values.txt8.15 KB
 4 - 12 - 4_146.11 Do all local minimums look basically the same when you zoom in.txt3 KB
 4 - 13 - 4_147.12 How can I sketch a graph by hand.txt6.7 KB
 4 - 14 - 4_148.13 What is a function which is its own derivative.txt7.94 KB
 4 - 2 - 4_136.01 What is the derivative of f(x) g(x).txt4.58 KB
 4 - 3 - 4_137.02 Morally, why is the product rule true.txt4.81 KB
 4 - 4 - 4_138.03 How does one justify the product rule.txt4.71 KB
 4 - 5 - 4_139.04 What is the quotient rule.txt3.47 KB
 4 - 1 - 4.00 What will Week 4 bring us [121].mp44.92 MB
 4 - 10 - 4.09 What are extreme values [722].mp430.29 MB
 4 - 11 - 4.10 How can I find extreme values [954].mp438.41 MB
 4 - 12 - 4.11 Do all local minimums look basically the same when you zoom in [355].mp414.13 MB
 4 - 13 - 4.12 How can I sketch a graph by hand [728].mp430.55 MB
 4 - 14 - 4.13 What is a function which is its own derivative [901].mp437.32 MB
 4 - 2 - 4.01 What is the derivative of f(x) g(x) [646].mp431.26 MB
 4 - 3 - 4.02 Morally why is the product rule true [615].mp428.2 MB
 4 - 4 - 4.03 How does one justify the product rule [610].mp425.82 MB
 4 - 5 - 4.04 What is the quotient rule [409].mp417.74 MB
 5 - 1 - 5_122.00 Is there anything more to learn about derivatives.srt1.18 KB
 5 - 10 - 5_131.09 How do we justify the power rule.srt11.59 KB
 5 - 11 - 5_132.10 How can logarithms help to prove the product rule.srt4.21 KB
 5 - 12 - 5_133.11 How do we prove the quotient rule.srt5.92 KB
 5 - 13 - 5_134.12 BONUS How does one prove the chain rule.srt7.37 KB
 5 - 2 - 5_123.01 What is the chain rule.srt12.99 KB
 5 - 3 - 5.02 What is the derivative of (1+2x)^5 and sqrt(x^2 + 0_124.0001).srt7.8 KB
 5 - 4 - 5_125.03 What is implicit differentiation.srt6.8 KB
 5 - 5 - 5_126.04 What is the folium of Descartes.srt4.66 KB
 5 - 6 - 5_127.05 How does the derivative of the inverse function relate to the derivative of the...13.03 KB
 5 - 1 - 5_122.00 Is there anything more to learn about derivatives.txt843 bytes
 5 - 10 - 5_131.09 How do we justify the power rule.txt8.11 KB
 5 - 11 - 5_132.10 How can logarithms help to prove the product rule.txt2.96 KB
 5 - 12 - 5_133.11 How do we prove the quotient rule.txt4.17 KB
 5 - 13 - 5_134.12 BONUS How does one prove the chain rule.txt5.19 KB
 5 - 2 - 5_123.01 What is the chain rule.txt9.13 KB
 5 - 3 - 5.02 What is the derivative of (1+2x)^5 and sqrt(x^2 + 0_124.0001).txt5.49 KB
 5 - 4 - 5_125.03 What is implicit differentiation.txt4.75 KB
 5 - 5 - 5_126.04 What is the folium of Descartes.txt3.24 KB
 5 - 6 - 5_127.05 How does the derivative of the inverse function relate to the derivative of the...9.1 KB
 5 - 1 - 5.00 Is there anything more to learn about derivatives [100].mp43.35 MB
 5 - 10 - 5.09 How do we justify the power rule [1117].mp443.86 MB
 5 - 11 - 5.10 How can logarithms help to prove the product rule [328].mp413.47 MB
 5 - 12 - 5.11 How do we prove the quotient rule [501].mp420.99 MB
 5 - 13 - 5.12 BONUS How does one prove the chain rule [648].mp427.04 MB
 5 - 2 - 5.01 What is the chain rule [1032].mp442.35 MB
 5 - 3 - 5.02 What is the derivative of (12x)5 and sqrt(x2 0.0001) [704].mp428.25 MB
 5 - 4 - 5.03 What is implicit differentiation [534].mp423.74 MB
 5 - 5 - 5.04 What is the folium of Descartes [440].mp420.17 MB
 5 - 6 - 5.05 How does the derivative of the inverse function relate to the derivative of the...46.07 MB
 6 - 1 - 6_109.00 What are transcendental functions.srt2.8 KB
 6 - 10 - 6_118.09 Why do sine and cosine oscillate.srt5.58 KB
 6 - 11 - 6_119.10 How can we get a formula for sin(a+b).srt5.02 KB
 6 - 12 - 6_120.11 How can I approximate sin 1.srt4.01 KB
 6 - 13 - 6_121.12 How can we multiply numbers with trigonometry.srt4.45 KB
 6 - 2 - 6_110.01 Why does trigonometry work.srt3.79 KB
 6 - 3 - 6_111.02 Why are there these other trigonometric functions.srt6.34 KB
 6 - 4 - 6_112.03 What is the derivative of sine and cosine.srt12.15 KB
 6 - 5 - 6_113.04 What is the derivative of tan x.srt12.36 KB
 6 - 6 - 6_114.05 What are the derivatives of the other trigonometric functions.srt6.52 KB
 6 - 1 - 6_109.00 What are transcendental functions.txt1.95 KB
 6 - 10 - 6_118.09 Why do sine and cosine oscillate.txt3.66 KB
 6 - 11 - 6_119.10 How can we get a formula for sin(a+b).txt3.37 KB
 6 - 12 - 6_120.11 How can I approximate sin 1.txt2.63 KB
 6 - 13 - 6_121.12 How can we multiply numbers with trigonometry.txt2.97 KB
 6 - 2 - 6_110.01 Why does trigonometry work.txt2.47 KB
 6 - 3 - 6_111.02 Why are there these other trigonometric functions.txt4.26 KB
 6 - 4 - 6_112.03 What is the derivative of sine and cosine.txt8.05 KB
 6 - 5 - 6_113.04 What is the derivative of tan x.txt8.2 KB
 6 - 6 - 6_114.05 What are the derivatives of the other trigonometric functions.txt4.31 KB
 6 - 1 - 6.00 What are transcendental functions [203].mp47.24 MB
 6 - 10 - 6.09 Why do sine and cosine oscillate [439].mp418.7 MB
 6 - 11 - 6.10 How can we get a formula for sin(ab) [415].mp417.51 MB
 6 - 12 - 6.11 How can I approximate sin 1 [325].mp412.88 MB
 6 - 13 - 6.12 How can we multiply numbers with trigonometry [411].mp418.82 MB
 6 - 2 - 6.01 Why does trigonometry work [312].mp414.98 MB
 6 - 3 - 6.02 Why are there these other trigonometric functions [448].mp422.66 MB
 6 - 4 - 6.03 What is the derivative of sine and cosine [1004].mp442.23 MB
 6 - 5 - 6.04 What is the derivative of tan x [925].mp438.23 MB
 6 - 6 - 6.05 What are the derivatives of the other trigonometric functions [535].mp421.89 MB
 7 - 1 - 7_098.00 What applications of the derivative will we do this week.srt1.73 KB
 7 - 10 - 7_107.09 How quickly does the water level rise in a cone.srt9.01 KB
 7 - 11 - 7_108.10 How quickly does a balloon fill with air.srt4.13 KB
 7 - 2 - 7_099.01 How can derivatives help us to compute limits.srt13.47 KB
 7 - 3 - 7_100.02 How can l'Hôpital help with limits not of the form 0-0.srt20.57 KB
 7 - 4 - 7_101.03 Why shouldn't I fall in love with l'Hôpital.srt11.27 KB
 7 - 5 - 7_102.04 How long until the gray goo destroys Earth.srt4.14 KB
 7 - 6 - 7_103.05 What does a car sound like as it drives past.srt4.98 KB
 7 - 7 - 7_104.06 How fast does the shadow move.srt6.57 KB
 7 - 8 - 7_105.07 How fast does the ladder slide down the building.srt5.39 KB
 7 - 9 - 7_106.08 How quickly does a bowl fill with green water.srt4.98 KB
 7 - 1 - 7_098.00 What applications of the derivative will we do this week.txt1.14 KB
 7 - 10 - 7_107.09 How quickly does the water level rise in a cone.txt5.9 KB
 7 - 11 - 7_108.10 How quickly does a balloon fill with air.txt2.71 KB
 7 - 2 - 7_099.01 How can derivatives help us to compute limits.txt8.83 KB
 7 - 3 - 7_100.02 How can l'Hôpital help with limits not of the form 0-0.txt13.46 KB
 7 - 4 - 7_101.03 Why shouldn't I fall in love with l'Hôpital.txt7.27 KB
 7 - 5 - 7_102.04 How long until the gray goo destroys Earth.txt2.69 KB
 7 - 6 - 7_103.05 What does a car sound like as it drives past.txt3.3 KB
 7 - 7 - 7_104.06 How fast does the shadow move.txt4.36 KB
 7 - 8 - 7_105.07 How fast does the ladder slide down the building.txt3.44 KB
 7 - 9 - 7_106.08 How quickly does a bowl fill with green water.txt3.33 KB
 7 - 1 - 7.00 What applications of the derivative will we do this week [122].mp45.62 MB
 7 - 10 - 7.09 How quickly does the water level rise in a cone [700].mp426.95 MB
 7 - 11 - 7.10 How quickly does a balloon fill with air [345].mp413.05 MB
 7 - 2 - 7.01 How can derivatives help us to compute limits [926].mp434.86 MB
 7 - 3 - 7.02 How can lHopital help with limits not of the form 0-0 [1443].mp460.15 MB
 7 - 4 - 7.03 Why shouldnt I fall in love with lHopital [814].mp432.97 MB
 7 - 5 - 7.04 How long until the gray goo destroys Earth [346].mp414.21 MB
 7 - 6 - 7.05 What does a car sound like as it drives past [357].mp414.46 MB
 7 - 7 - 7.06 How fast does the shadow move [511].mp419.41 MB
 7 - 8 - 7.07 How fast does the ladder slide down the building [350].mp414.35 MB
 7 - 9 - 7.08 How quickly does a bowl fill with green water [407].mp418.33 MB
 8 - 1 - 8_087.00 What sorts of optimization problems will calculus help us solve.srt2.42 KB
 8 - 10 - 8_096.09 How large of an object can you carry around a corner.srt13.68 KB
 8 - 11 - 8_097.10 How short of a ladder will clear a fence.srt5.36 KB
 8 - 2 - 8_088.01 What is the extreme value theorem.srt12.5 KB
 8 - 3 - 8_089.02 How do I find the maximum and minimum values of f on a given domain.srt12.9 KB
 8 - 4 - 8_090.03 Why do we have to bother checking the endpoints.srt5.82 KB
 8 - 5 - 8_091.04 Why bother considering points where the function is not differentiable.srt9.12 KB
 8 - 6 - 8_092.05 How can you build the best fence for your sheep.srt10.6 KB
 8 - 7 - 8_093.06 How large can xy be if x + y = 24.srt7.1 KB
 8 - 8 - 8_094.07 How do you design the best soup can.srt14.76 KB
 8 - 9 - 8_095.08 Where do three bubbles meet.srt16.12 KB
 8 - 1 - 8_087.00 What sorts of optimization problems will calculus help us solve.txt1.6 KB
 8 - 10 - 8_096.09 How large of an object can you carry around a corner.txt9.04 KB
 8 - 11 - 8_097.10 How short of a ladder will clear a fence.txt3.55 KB
 8 - 2 - 8_088.01 What is the extreme value theorem.txt8.3 KB
 8 - 3 - 8_089.02 How do I find the maximum and minimum values of f on a given domain.txt8.53 KB
 8 - 4 - 8_090.03 Why do we have to bother checking the endpoints.txt3.84 KB
 8 - 5 - 8_091.04 Why bother considering points where the function is not differentiable.txt6.08 KB
 8 - 6 - 8_092.05 How can you build the best fence for your sheep.txt6.92 KB
 8 - 7 - 8_093.06 How large can xy be if x + y = 24.txt4.62 KB
 8 - 8 - 8_094.07 How do you design the best soup can.txt9.64 KB
 8 - 9 - 8_095.08 Where do three bubbles meet.txt10.56 KB
 8 - 1 - 8.00 What sorts of optimization problems will calculus help us solve [138].mp45.55 MB
 8 - 10 - 8.09 How large of an object can you carry around a corner [1032].mp440.23 MB
 8 - 11 - 8.10 How short of a ladder will clear a fence [403].mp415.37 MB
 8 - 2 - 8.01 What is the extreme value theorem [856].mp432.45 MB
 8 - 3 - 8.02 How do I find the maximum and minimum values of f on a given domain [906].mp432.17 MB
 8 - 4 - 8.03 Why do we have to bother checking the endpoints [415].mp419.36 MB
 8 - 5 - 8.04 Why bother considering points where the function is not differentiable [717].mp425.09 MB
 8 - 6 - 8.05 How can you build the best fence for your sheep [849].mp437.66 MB
 8 - 7 - 8.06 How large can xy be if x y 24 [542].mp420.36 MB
 8 - 8 - 8.07 How do you design the best soup can [1032].mp445.67 MB
 8 - 9 - 8.08 Where do three bubbles meet [1245].mp450.49 MB
 9 - 1 - 9_075.00 What is up with all the numerical analysis this week.srt2.25 KB
 9 - 10 - 9_084.09 What is the mean value theorem.srt9.12 KB
 9 - 11 - 9_085.10 Why does f'(x) _ 0 imply that f is increasing.srt6.98 KB
 9 - 12 - 9_086.11 Should I bother to find the point c in the mean value theorem.srt5.34 KB
 9 - 2 - 9_076.01 Where does f(x+h) = f(x) + h f'(x) come from.srt7.35 KB
 9 - 3 - 9_077.02 What is the volume of an orange rind.srt8.04 KB
 9 - 4 - 9_078.03 What happens if I repeat linear approximation.srt12.7 KB
 9 - 5 - 9_079.04 Why is log 3 base 2 approximately 19-12.srt9.78 KB
 9 - 6 - 9_080.05 What does dx mean by itself.srt6.93 KB
 9 - 7 - 9_081.06 What is Newton's method.srt12.84 KB
 9 - 1 - 9_075.00 What is up with all the numerical analysis this week.txt1.49 KB
 9 - 10 - 9_084.09 What is the mean value theorem.txt6.08 KB
 9 - 11 - 9_085.10 Why does f'(x) _ 0 imply that f is increasing.txt4.64 KB
 9 - 12 - 9_086.11 Should I bother to find the point c in the mean value theorem.txt3.49 KB
 9 - 2 - 9_076.01 Where does f(x+h) = f(x) + h f'(x) come from.txt4.84 KB
 9 - 3 - 9_077.02 What is the volume of an orange rind.txt5.26 KB
 9 - 4 - 9_078.03 What happens if I repeat linear approximation.txt8.36 KB
 9 - 5 - 9_079.04 Why is log 3 base 2 approximately 19-12.txt6.47 KB
 9 - 6 - 9_080.05 What does dx mean by itself.txt4.61 KB
 9 - 7 - 9_081.06 What is Newton's method.txt8.4 KB
 9 - 1 - 9.00 What is up with all the numerical analysis this week [134].mp45.18 MB
 9 - 10 - 9.09 What is the mean value theorem [651].mp429.93 MB
 9 - 11 - 9.10 Why does f(x) 0 imply that f is increasing [510].mp422.92 MB
 9 - 12 - 9.11 Should I bother to find the point c in the mean value theorem [427].mp420.1 MB
 9 - 2 - 9.01 Where does f(xh) f(x) h f(x) come from [559].mp425.01 MB
 9 - 3 - 9.02 What is the volume of an orange rind [640].mp432.73 MB
 9 - 4 - 9.03 What happens if I repeat linear approximation [1033].mp437.16 MB
 9 - 5 - 9.04 Why is log 3 base 2 approximately 19-12 [1021].mp441.44 MB
 9 - 6 - 9.05 What does dx mean by itself [538].mp422.31 MB
 9 - 7 - 9.06 What is Newtons method [955].mp440.51 MB
 10 - 1 - 10_061.00 What does it mean to antidifferentiate.srt3.36 KB
 10 - 10 - 10_070.09 What is the antiderivative of f(mx+b).srt6.27 KB
 10 - 11 - 10_071.10 Knowing my velocity, what is my position.srt3.65 KB
 10 - 12 - 10_072.11 Knowing my acceleration, what is my position.srt5.43 KB
 10 - 13 - 10_073.12 What is the antiderivative of sine squared.srt4.32 KB
 10 - 14 - 10_074.13 What is a slope field.srt6.12 KB
 10 - 2 - 10_062.01 How do we handle the fact that there are many antiderivatives.srt6.2 KB
 10 - 3 - 10_063.02 What is the antiderivative of a sum.srt4.22 KB
 10 - 4 - 10_064.03 What is an antiderivative for x^n.srt7.64 KB
 10 - 5 - 10_065.04 What is the most general antiderivative of 1-x.srt4.91 KB
 10 - 1 - 10_061.00 What does it mean to antidifferentiate.txt2.21 KB
 10 - 10 - 10_070.09 What is the antiderivative of f(mx+b).txt4.08 KB
 10 - 11 - 10_071.10 Knowing my velocity, what is my position.txt2.4 KB
 10 - 12 - 10_072.11 Knowing my acceleration, what is my position.txt3.51 KB
 10 - 13 - 10_073.12 What is the antiderivative of sine squared.txt2.83 KB
 10 - 14 - 10_074.13 What is a slope field.txt4.01 KB
 10 - 2 - 10_062.01 How do we handle the fact that there are many antiderivatives.txt3.99 KB
 10 - 3 - 10_063.02 What is the antiderivative of a sum.txt2.77 KB
 10 - 4 - 10_064.03 What is an antiderivative for x^n.txt5.02 KB
 10 - 5 - 10_065.04 What is the most general antiderivative of 1-x.txt3.26 KB
 10 - 1 - 10.00 What does it mean to antidifferentiate [220].mp410.46 MB
 10 - 10 - 10.09 What is the antiderivative of f(mxb) [518].mp422.45 MB
 10 - 11 - 10.10 Knowing my velocity what is my position [316].mp414 MB
 10 - 12 - 10.11 Knowing my acceleration what is my position [424].mp418.47 MB
 10 - 13 - 10.12 What is the antiderivative of sine squared [318].mp413.47 MB
 10 - 14 - 10.13 What is a slope field [456].mp422.71 MB
 10 - 2 - 10.01 How do we handle the fact that there are many antiderivatives [526].mp424.26 MB
 10 - 3 - 10.02 What is the antiderivative of a sum [342].mp414.5 MB
 10 - 4 - 10.03 What is an antiderivative for xn [736].mp431.31 MB
 10 - 5 - 10.04 What is the most general antiderivative of 1-x [414].mp418.9 MB
 11 - 1 - 11_047.00 If we are not differentiating, what are we going to do.srt3.88 KB
 11 - 10 - 11_056.09 What is the integral of x^2 from x = 0 to 1.srt9.75 KB
 11 - 11 - 11_057.10 What is the integral of x^3 from x = 1 to 2.srt9.85 KB
 11 - 12 - 11_058.11 When is the accumulation function increasing.srt6.34 KB
 11 - 13 - 11_059.12 What sorts of properties does the integral satisfy.srt6.09 KB
 11 - 14 - 11_060.13 What is the integral of sin x dx from -1 to 1.srt3.86 KB
 11 - 2 - 11_048.01 How can I write sums using a big Sigma.srt5.91 KB
 11 - 3 - 11.02 What is the sum 1 + 2 + .._049. + k.srt7.34 KB
 11 - 4 - 11_050.03 What is the sum of the first k odd numbers.srt4.57 KB
 11 - 5 - 11_051.04 What is the sum of the first k perfect squares.srt8.02 KB
 11 - 1 - 11_047.00 If we are not differentiating, what are we going to do.txt2.6 KB
 11 - 10 - 11_056.09 What is the integral of x^2 from x = 0 to 1.txt6.48 KB
 11 - 11 - 11_057.10 What is the integral of x^3 from x = 1 to 2.txt6.54 KB
 11 - 12 - 11_058.11 When is the accumulation function increasing.txt4.16 KB
 11 - 13 - 11_059.12 What sorts of properties does the integral satisfy.txt4.04 KB
 11 - 14 - 11_060.13 What is the integral of sin x dx from -1 to 1.txt2.57 KB
 11 - 2 - 11_048.01 How can I write sums using a big Sigma.txt3.76 KB
 11 - 3 - 11.02 What is the sum 1 + 2 + .._049. + k.txt4.73 KB
 11 - 4 - 11_050.03 What is the sum of the first k odd numbers.txt2.95 KB
 11 - 5 - 11_051.04 What is the sum of the first k perfect squares.txt5.17 KB
 11 - 1 - 11.00 If we are not differentiating what are we going to do [257].mp412.83 MB
 11 - 10 - 11.09 What is the integral of x2 from x 0 to 1 [808].mp433.15 MB
 11 - 11 - 11.10 What is the integral of x3 from x 1 to 2 [835].mp434.65 MB
 11 - 12 - 11.11 When is the accumulation function increasing Decreasing [444].mp419.41 MB
 11 - 13 - 11.12 What sorts of properties does the integral satisfy [442].mp420.31 MB
 11 - 14 - 11.13 What is the integral of sin x dx from -1 to 1 [315].mp413.41 MB
 11 - 2 - 11.01 How can I write sums using a big Sigma [510].mp422.93 MB
 11 - 3 - 11.02 What is the sum 1 2 ... k [611].mp428.26 MB
 11 - 4 - 11.03 What is the sum of the first k odd numbers [415].mp418.42 MB
 11 - 5 - 11.04 What is the sum of the first k perfect squares [647].mp427.85 MB
 12 - 1 - 12_034.00 What is the big deal about the fundamental theorem of calculus.srt3.11 KB
 12 - 10 - 12_043.09 In what way is summation like integration.srt3.16 KB
 12 - 11 - 12_044.10 What is the sum of n^4 for n = 1 to n = k.srt10.78 KB
 12 - 12 - 12_045.11 Physically, why is the fundamental theorem of calculus true.srt4.93 KB
 12 - 13 - 12_046.12 What is d-da integral f(x) dx from x = a to x = b.srt6.17 KB
 12 - 2 - 12_035.01 What is the fundamental theorem of calculus.srt6.9 KB
 12 - 3 - 12_036.02 How can I use the fundamental theorem of calculus to evaluate integrals.srt7.67 KB
 12 - 4 - 12_037.03 What is the integral of sin x dx from x = 0 to x = pi.srt4.32 KB
 12 - 5 - 12_038.04 What is the integral of x^4 dx from x = 0 to x = 1.srt5.35 KB
 12 - 6 - 12_039.05 What is the area between the graphs of y = sqrt(x) and y = x^2.srt7.76 KB
 12 - 1 - 12_034.00 What is the big deal about the fundamental theorem of calculus.txt2.03 KB
 12 - 10 - 12_043.09 In what way is summation like integration.txt2.04 KB
 12 - 11 - 12_044.10 What is the sum of n^4 for n = 1 to n = k.txt7.16 KB
 12 - 12 - 12_045.11 Physically, why is the fundamental theorem of calculus true.txt3.24 KB
 12 - 13 - 12_046.12 What is d-da integral f(x) dx from x = a to x = b.txt4.08 KB
 12 - 2 - 12_035.01 What is the fundamental theorem of calculus.txt4.5 KB
 12 - 3 - 12_036.02 How can I use the fundamental theorem of calculus to evaluate integrals.txt5.01 KB
 12 - 4 - 12_037.03 What is the integral of sin x dx from x = 0 to x = pi.txt2.81 KB
 12 - 5 - 12_038.04 What is the integral of x^4 dx from x = 0 to x = 1.txt3.55 KB
 12 - 6 - 12_039.05 What is the area between the graphs of y = sqrt(x) and y = x^2.txt5.09 KB
 12 - 1 - 12.00 What is the big deal about the fundamental theorem of calculus [213].mp47.98 MB
 12 - 10 - 12.09 In what way is summation like integration [231].mp411.11 MB
 12 - 11 - 12.10 What is the sum of n4 for n 1 to n k [924].mp435.64 MB
 12 - 12 - 12.11 Physically why is the fundamental theorem of calculus true [400].mp417.66 MB
 12 - 13 - 12.12 What is d-da integral f(x) dx from x a to x b [506].mp424.28 MB
 12 - 2 - 12.01 What is the fundamental theorem of calculus [532].mp423.05 MB
 12 - 3 - 12.02 How can I use the fundamental theorem of calculus to evaluate integrals [606].mp428.54 MB
 12 - 4 - 12.03 What is the integral of sin x dx from x 0 to x pi [332].mp415.91 MB
 12 - 5 - 12.04 What is the integral of x4 dx from x 0 to x 1 [415].mp420.05 MB
 12 - 6 - 12.05 What is the area between the graphs of y sqrt(x) and y x2 [626].mp421.27 MB
 13 - 1 - 13_022.00 How is this course structured.srt3.38 KB
 13 - 10 - 13_031.09 What is d-dx integral sin t dt from t = 0 to t = x^2.srt3.8 KB
 13 - 11 - 13_032.10 Formally, why is the fundamental theorem of calculus true.srt6.9 KB
 13 - 12 - 13_033.11 Without resorting to the fundamental theorem, why does substitution work.srt4.3 KB
 13 - 2 - 13_023.01 How does the chain rule help with antidifferentiation.srt6.79 KB
 13 - 3 - 13_024.02 When I do u-substitution, what should u be.srt8.24 KB
 13 - 4 - 13_025.03 How should I handle the endpoints when doing u-substitution.srt5.45 KB
 13 - 5 - 13_026.04 Might I want to do u-substitution more than once.srt5.38 KB
 13 - 6 - 13_027.05 What is the integral of dx - (x^2 + 4x + 7).srt9.92 KB
 13 - 7 - 13_028.06 What is the integral of (x+10)(x-1)^10 dx from x = 0 to x = 1.srt6.35 KB
 13 - 1 - 13_022.00 How is this course structured.txt2.24 KB
 13 - 10 - 13_031.09 What is d-dx integral sin t dt from t = 0 to t = x^2.txt2.5 KB
 13 - 11 - 13_032.10 Formally, why is the fundamental theorem of calculus true.txt4.64 KB
 13 - 12 - 13_033.11 Without resorting to the fundamental theorem, why does substitution work.txt2.86 KB
 13 - 2 - 13_023.01 How does the chain rule help with antidifferentiation.txt4.52 KB
 13 - 3 - 13_024.02 When I do u-substitution, what should u be.txt5.42 KB
 13 - 4 - 13_025.03 How should I handle the endpoints when doing u-substitution.txt3.58 KB
 13 - 5 - 13_026.04 Might I want to do u-substitution more than once.txt3.55 KB
 13 - 6 - 13_027.05 What is the integral of dx - (x^2 + 4x + 7).txt6.5 KB
 13 - 7 - 13_028.06 What is the integral of (x+10)(x-1)^10 dx from x = 0 to x = 1.txt4.16 KB
 13 - 1 - 13.00 How is this course structured.mp47.08 MB
 13 - 10 - 13.09 What is d_dx integral sin t dt from t 0 to t x2 [351].mp418.06 MB
 13 - 11 - 13.10 Formally why is the fundamental theorem of calculus true [631].mp428.06 MB
 13 - 12 - 13.11 Without resorting to the fundamental theorem why does substitution work [347].mp417.01 MB
 13 - 2 - 13.01 How does the chain rule help with antidifferentiation [531].mp427.47 MB
 13 - 3 - 13.02 When I do u-substitution what should u be [709].mp431.95 MB
 13 - 4 - 13.03 How should I handle the endpoints when doing u-substitution [513].mp421.35 MB
 13 - 5 - 13.04 Might I want to do u-substitution more than once [422].mp419.54 MB
 13 - 6 - 13.05 What is the integral of dx _ (x2 4x 7) [904].mp440.77 MB
 13 - 7 - 13.06 What is the integral of (x10)(x-1)10 dx from x 0 to x 1 [536].mp426.18 MB
 14 - 1 - 14_012.00 What remains to be done.srt2.03 KB
 14 - 10 - 14_021.09 Why is pi _ 22-7.srt9.87 KB
 14 - 2 - 14_013.01 What antidifferentiation rule corresponds to the product rule in reverse.srt5.63 KB
 14 - 3 - 14_014.02 What is an antiderivative of x e^x.srt5.15 KB
 14 - 4 - 14_015.03 How does parts help when antidifferentiating log x.srt2.06 KB
 14 - 5 - 14_016.04 What is an antiderivative of e^x cos x.srt7.06 KB
 14 - 6 - 14_017.05 What is an antiderivative of e^(sqrt(x)).srt3.94 KB
 14 - 7 - 14_018.06 What is an antiderivative of sin^(2n+1) x cos^(2n) x dx.srt5.81 KB
 14 - 8 - 14_019.07 What is the integral of sin^(2n) x dx from x = 0 to x = pi.srt8.7 KB
 14 - 9 - 14_020.08 What is the integral of sin^n x dx in terms of sin^(n-2) x dx.srt11.83 KB
 14 - 1 - 14_012.00 What remains to be done.txt1.32 KB
 14 - 10 - 14_021.09 Why is pi _ 22-7.txt6.52 KB
 14 - 2 - 14_013.01 What antidifferentiation rule corresponds to the product rule in reverse.txt3.73 KB
 14 - 3 - 14_014.02 What is an antiderivative of x e^x.txt3.38 KB
 14 - 4 - 14_015.03 How does parts help when antidifferentiating log x.txt1.34 KB
 14 - 5 - 14_016.04 What is an antiderivative of e^x cos x.txt4.69 KB
 14 - 6 - 14_017.05 What is an antiderivative of e^(sqrt(x)).txt2.55 KB
 14 - 7 - 14_018.06 What is an antiderivative of sin^(2n+1) x cos^(2n) x dx.txt3.81 KB
 14 - 8 - 14_019.07 What is the integral of sin^(2n) x dx from x = 0 to x = pi.txt5.77 KB
 14 - 9 - 14_020.08 What is the integral of sin^n x dx in terms of sin^(n-2) x dx.txt7.9 KB
 14 - 1 - 14.00 What remains to be done [129].mp45.3 MB
 14 - 10 - 14.09 Why is pi 22_7 [825].mp436.48 MB
 14 - 2 - 14.01 What antidifferentiation rule corresponds to the product rule in reverse [504].mp421.52 MB
 14 - 3 - 14.02 What is an antiderivative of x ex [413].mp418.64 MB
 14 - 4 - 14.03 How does parts help when antidifferentiating log x [202].mp48.19 MB
 14 - 5 - 14.04 What is an antiderivative of ex cos x [612].mp428.4 MB
 14 - 6 - 14.05 What is an antiderivative of e(sqrt(x)) [324].mp413.13 MB
 14 - 7 - 14.06 What is an antiderivative of sin(2n1) x cos(2n) x dx [550].mp422.33 MB
 14 - 8 - 14.07 What is the integral of sin(2n) x dx from x 0 to x pi [801].mp430.59 MB
 14 - 9 - 14.08 What is the integral of sinn x dx in terms of sin(n-2) x dx [1133].mp446.84 MB
 15 - 1 - 15_001.00 What application of integration will we consider.srt2.36 KB
 15 - 10 - 15_010.09 On the graph of y^2 = x^3, what is the length of a certain arc.srt4.18 KB
 15 - 11 - 15.10 This title is missing a question mark. [1_15]_011.srt1.46 KB
 15 - 2 - 15_002.01 What happens when I use thin horizontal rectangles to compute area.srt7.88 KB
 15 - 3 - 15_003.02 When should I use horizontal as opposed to vertical pieces.srt7.05 KB
 15 - 4 - 15_004.03 What does _volume_ even mean.srt6.03 KB
 15 - 5 - 15_005.04 What is the volume of a sphere.srt6.78 KB
 15 - 6 - 15_006.05 How do washers help to compute the volume of a solid of revolution.srt6.46 KB
 15 - 7 - 15_007.06 What is the volume of a thin shell.srt9.48 KB
 15 - 8 - 15_008.07 What is the volume of a sphere with a hole drilled in it.srt8.68 KB
 15 - 9 - 15_009.08 What does _length_ even mean.srt5.3 KB
 15 - 1 - 15_001.00 What application of integration will we consider.txt1.54 KB
 15 - 10 - 15_010.09 On the graph of y^2 = x^3, what is the length of a certain arc.txt2.76 KB
 15 - 11 - 15.10 This title is missing a question mark. [1_15]_011.txt964 bytes
 15 - 2 - 15_002.01 What happens when I use thin horizontal rectangles to compute area.txt5.2 KB
 15 - 3 - 15_003.02 When should I use horizontal as opposed to vertical pieces.txt4.64 KB
 15 - 4 - 15_004.03 What does _volume_ even mean.txt3.95 KB
 15 - 5 - 15_005.04 What is the volume of a sphere.txt4.4 KB
 15 - 6 - 15_006.05 How do washers help to compute the volume of a solid of revolution.txt4.25 KB
 15 - 7 - 15_007.06 What is the volume of a thin shell.txt6.17 KB
 15 - 8 - 15_008.07 What is the volume of a sphere with a hole drilled in it.txt5.8 KB
 15 - 9 - 15_009.08 What does _length_ even mean.txt3.48 KB
 15 - 1 - 15.00 What application of integration will we consider [145].mp47.41 MB
 15 - 10 - 15.09 On the graph of y2 x3 what is the length of a certain arc [414].mp416.56 MB
 15 - 11 - 15.10 This title is missing a question mark. [115].mp44.6 MB
 15 - 2 - 15.01 What happens when I use thin horizontal rectangles to compute area [637].mp427.88 MB
 15 - 3 - 15.02 When should I use horizontal as opposed to vertical pieces [545].mp424.65 MB
 15 - 4 - 15.03 What does volume even mean [447].mp422.76 MB
 15 - 5 - 15.04 What is the volume of a sphere [603].mp427.02 MB
 15 - 6 - 15.05 How do washers help to compute the volume of a solid of revolution [519].mp422.7 MB
 15 - 7 - 15.06 What is the volume of a thin shell [748].mp436.16 MB
 15 - 8 - 15.07 What is the volume of a sphere with a hole drilled in it [737].mp432.55 MB
 15 - 9 - 15.08 What does length even mean [416].mp419.94 MB
 Calculus One Intro Video.webm8.29 MB


Description

Calculus is about the very large, the very small, and how things change. The surprise is that something seemingly so abstract ends up explaining the real world. Calculus plays a starring role in the biological, physical, and social sciences. By focusing outside of the classroom, we will see examples of calculus appearing in daily life.

This course is a first and friendly introduction to calculus, suitable for someone who has never seen the subject before, or for someone who has seen some calculus but wants to review the concepts and practice applying those concepts to solve problems. One learns calculus by doing calculus, and so this course encourages you to participate by providing you with:

* instant feedback on practice problems
* interactive graphs and games for you to play
* calculus projects and demos you can try at home
* opportunities for you to explain your thought process

https://www.coursera.org/course/calc1

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Coursera / The Ohio State University - Calculus One

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