logging in or signing up Differential Calculus aSGuest48673 Download Post to : URL : Related Presentations : Share Add to Flag Embed Email Send to Blogs and Networks Add to Channel Uploaded from authorPOINT lite Insert YouTube videos in PowerPont slides with aS Desktop Copy embed code: (To copy code, click on the text box) Embed: URL: Thumbnail: WordPress Embed Customize Embed The presentation is successfully added In Your Favorites. Views: 1386 Category: Education License: Some Rights Reserved Like it (2) Dislike it (0) Added: June 11, 2010 This Presentation is Public Favorites: 0 Presentation Description No description available. Comments Posting comment... Premium member Presentation Transcript Differential Calculus : © Annie Patton Differential Calculus Next Slide -6 -4 -2 2 4 6 8 -5 5 10 15 x y Aim of Lesson : © Annie Patton Aim of Lesson To introduce and see the meaning of Differential Calculus. Next Slide Differential Calculus : © Annie Patton Differential Calculus Based on the rate of change of one variable in comparison to another. For example if y=x3 , we talk about the rate of change of y in comparison to x. Another example if t=time and s= the distance travelled and s and t are related by the equation s=2t+4. We then talk about the rate of change of the distance in relation to time. Next Slide Slide 4: © Annie Patton -4 -3 -2 -1 1 2 3 4 5 10 x y The graph y=x2 (red graph) demonstrates how y changes in relation to x for this particular function. In Co-ordinate Geometry, we learned that the slope of a graph is the rate of change of the graph. When a Tangent (PURPLE LINE) is drawn from a point on a graph. The slope of the graph at that point equals the slope of the tangent at that point. Next Slide Slope of a Graph What is a tangent? Slide 5: © Annie Patton -6 -4 -2 2 4 6 8 -5 5 10 15 x y Note however the slope of each tangent is different. Next Slide Slopes of tangents So the slope of a tangent at a point is equal to the slope of the curve at that point. Slide 6: © Annie Patton -2 -1 1 2 3 -1 1 2 3 4 x y (x, f (x)) Take the point (x, f (x)) Take a new point (x + h, f (x+ h)), where h is a small change in x. (x+ h, f (x+ h)) h To find the slope of the curve y=f (x) Next Slide Slide 7: © Annie Patton Notice even, if written as a fraction it does not mean a fraction. Next Slide Slide 8: © Annie Patton -2 -1 1 2 3 -1 1 2 3 4 x y (x, x2) Take the point (x, x2) Take a new point x + h, where h is a small change in x. (x+ h, (x+h)2) h To find the slope of the curve y=x2 Next Slide Slope and derivative : © Annie Patton Click here to see how the slope and the derivative of a function are related. Move the T and see what happens. Slope and derivative Make sure you click Next at the bottom of the screen to see another example or click next. Next Slide How to calculate the derivative : © Annie Patton How to calculate the derivative Next Slide Click here to see how to calculate the derivative, but note ignore the reference to the Difference Quotient. Ignore the words Difference Quotient in next link. THE END : © Annie Patton THE END In this brief introduction you have been introduced to a very important aspect of mathematics. So have fun over the next weeks. You do not have the permission to view this presentation. In order to view it, please contact the author of the presentation.
Differential Calculus aSGuest48673 Download Post to : URL : Related Presentations : Share Add to Flag Embed Email Send to Blogs and Networks Add to Channel Uploaded from authorPOINT lite Insert YouTube videos in PowerPont slides with aS Desktop Copy embed code: (To copy code, click on the text box) Embed: URL: Thumbnail: WordPress Embed Customize Embed The presentation is successfully added In Your Favorites. Views: 1386 Category: Education License: Some Rights Reserved Like it (2) Dislike it (0) Added: June 11, 2010 This Presentation is Public Favorites: 0 Presentation Description No description available. Comments Posting comment... Premium member Presentation Transcript Differential Calculus : © Annie Patton Differential Calculus Next Slide -6 -4 -2 2 4 6 8 -5 5 10 15 x y Aim of Lesson : © Annie Patton Aim of Lesson To introduce and see the meaning of Differential Calculus. Next Slide Differential Calculus : © Annie Patton Differential Calculus Based on the rate of change of one variable in comparison to another. For example if y=x3 , we talk about the rate of change of y in comparison to x. Another example if t=time and s= the distance travelled and s and t are related by the equation s=2t+4. We then talk about the rate of change of the distance in relation to time. Next Slide Slide 4: © Annie Patton -4 -3 -2 -1 1 2 3 4 5 10 x y The graph y=x2 (red graph) demonstrates how y changes in relation to x for this particular function. In Co-ordinate Geometry, we learned that the slope of a graph is the rate of change of the graph. When a Tangent (PURPLE LINE) is drawn from a point on a graph. The slope of the graph at that point equals the slope of the tangent at that point. Next Slide Slope of a Graph What is a tangent? Slide 5: © Annie Patton -6 -4 -2 2 4 6 8 -5 5 10 15 x y Note however the slope of each tangent is different. Next Slide Slopes of tangents So the slope of a tangent at a point is equal to the slope of the curve at that point. Slide 6: © Annie Patton -2 -1 1 2 3 -1 1 2 3 4 x y (x, f (x)) Take the point (x, f (x)) Take a new point (x + h, f (x+ h)), where h is a small change in x. (x+ h, f (x+ h)) h To find the slope of the curve y=f (x) Next Slide Slide 7: © Annie Patton Notice even, if written as a fraction it does not mean a fraction. Next Slide Slide 8: © Annie Patton -2 -1 1 2 3 -1 1 2 3 4 x y (x, x2) Take the point (x, x2) Take a new point x + h, where h is a small change in x. (x+ h, (x+h)2) h To find the slope of the curve y=x2 Next Slide Slope and derivative : © Annie Patton Click here to see how the slope and the derivative of a function are related. Move the T and see what happens. Slope and derivative Make sure you click Next at the bottom of the screen to see another example or click next. Next Slide How to calculate the derivative : © Annie Patton How to calculate the derivative Next Slide Click here to see how to calculate the derivative, but note ignore the reference to the Difference Quotient. Ignore the words Difference Quotient in next link. THE END : © Annie Patton THE END In this brief introduction you have been introduced to a very important aspect of mathematics. So have fun over the next weeks.