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Ch. 2 – Limits and Continuity 2.4 – Rates of Change and Tangent Lines.

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Presentation on theme: "Ch. 2 – Limits and Continuity 2.4 – Rates of Change and Tangent Lines."— Presentation transcript:

1 Ch. 2 – Limits and Continuity 2.4 – Rates of Change and Tangent Lines

2 Ex: Find the average rate of change of f(x) = x 3 – x over the interval [1, 3]. –Average rate of change = slope! –The 12 signifies the slope of the secant line through (1, f(1)) and (3, f(3)). Secant lines pass through a curve at two specific points Tangent lines pass through a curve at one specific point –Slopes of tangent lines represent INSTANTANEOUS SLOPE at any point on the curve! –Instantaneous slope = rate of change

3 (x, f(x)) To find the slope of the tangent line, consider secant lines that have almost the same slope as the tangent line: xx+h (x+h, f(x+h)) As h approaches zero, we approach the true slope of the tangent line: HOW TO FIND INSTANTANEOUS SLOPE This is the def’n of a derivative!

4 Ex: Find the slope of the graph of f(x) = x 2 at the point (3, 9), and then write an equation for the tangent line at that point. –Use the limit of the difference quotient from the last slide to find slope! –We know the slope is 6 and the line passes thru (3, 9), so…

5 Ex: Find the general equation for the instantaneous slope of any point on f(x) = 2x 2 – x. –Since we don’t have a specific point, use (x, f(x)) for your point! At what x-value will the slope be 15? –If the slope is always 4x – 1, then…

6 A normal line is the line perpendicular to a tangent line at a point on the curve. Ex: Find the equation for the normal line to the curve f(x) = 1/x at the point (2, ½). –That’s the slope of the tangent line…the slope of the normal would be 4 (the opposite reciprocal). Multiply by 2(2+h)

7 Ex: Does the following curve have a tangent line at x = 0? –The slopes determined from each piece should be equal at x = 0! –Answer: Yes, because the slopes from the left and from the right are both -1. –Work:

8 Ex: Find the derivative of and use it to write an equation of the tangent line through (4, 2). –Now evaluate at x=4 to find slope… –Slope = ¼ –The tangent line has a slope of ¼ and passes through (4. 2), so write an equation… –I’ll use point slope form: (Multiply by conjugate of numerator)

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