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Tangents, Velocities, and Other Rates of Change

Tangents, Velocities, and Other Rates of Change. Definition The tangent line to the curve y = f(x) at the point P(a, f(a)) is the line through P with slope m = provided that this limit exists. Tangents, Velocities, and Other Rates of Change. Example 1:

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Tangents, Velocities, and Other Rates of Change

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  1. Tangents, Velocities, and Other Rates of Change Definition The tangent line to the curve y = f(x) at the point P(a, f(a)) is the line through P with slope m = provided that this limit exists.

  2. Tangents, Velocities, and Other Rates of Change Example 1: Find an equation of the tangent line to the parabola y = x2at the point P(1, 1).

  3. Tangents, Velocities, and Other Rates of Change If we let: h = x – a Then: x = a + h So the slope of the secant line PQ is mpq =

  4. Tangents, Velocities, and Other Rates of Change Look at figure 3 on page 144. Notice that as x approaches a, h approaches 0 (because h = x – a) and so the expression for the slope of the tangent line in Definition 1 becomes…

  5. Tangents, Velocities, and Other Rates of Change Example: Find an equation of the tangent line to the hyperbola y = 3/x at the point (3, 1) Look at figure 4 for the graph of the hyperbola and the tangent at point (3, 1).

  6. Tangents, Velocities, and Other Rates of Change Velocities In general, suppose an object moves along a straight line according to an equation of motion s =f(t), where s is the displacement (directed distance) of the object from the origin at time t. The function f that describes the motion is called the position function of the object.

  7. Tangents, Velocities, and Other Rates of Change In the time interval from t = a to t = a+h the change in position is f(a + h) – f(a). The average velocity over this time interval is average velocity = which is the same as the slope of the secant line PQ.

  8. Tangents, Velocities, and Other Rates of Change If we compute the average velocities over shorter and shorter time intervals, then h is approaching zero. This gives us the instantaneous velocityv(a) at time t = a to be the limit of these average velocities: This means that the velocity at time t = a is equal to the slope of the tangent line at P

  9. Tangents, Velocities, and Other Rates of Change Example: Suppose that a ball is dropped from the upper observation deck of the CN Tower, 450m above the ground. • What is the velocity of the ball after 5 seconds? • How fast is the ball traveling when it hits the ground?

  10. Tangents, Velocities, and Other Rates of Change ASSIGNMENT: P. 148 (1, 3, 5, 8, 9, 13, 15, 16, 17)

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