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Today in Pre-Calculus

Today in Pre-Calculus. Go over homework Notes: Finding Extrema You ’ ll need a graphing calculator Homework. decr: (- ∞ , 0 ) incr: (0 , ∞). incr: (- ∞ , ∞). decr: (- ∞ , 0 ) incr: (0 , ∞). decr: ( 3, ∞ ) incr: (-∞, 0 ) constant: (0, 3). decr: ( 3 , 5 ) incr: (-∞ , 3 )

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Today in Pre-Calculus

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  1. Today in Pre-Calculus • Go over homework • Notes: Finding Extrema • You’ll need a graphing calculator • Homework

  2. decr: (- ∞, 0 ) incr: (0, ∞) incr: (- ∞, ∞) decr: (- ∞, 0 ) incr: (0, ∞) decr: ( 3, ∞) incr: (-∞, 0 ) constant: (0, 3) decr: ( 3, 5 ) incr: (-∞, 3 ) constant: ( 5, ∞) decr: (- 1, 1) incr: (- ∞, -1 ), ( 1, ∞) decr: (- ∞, ∞) incr: (- ∞, 0) decr: (0, ∞) decr: (2,∞) incr: (-∞,-2) constant(-2,2) decr: (- ∞, -4) incr: ( 4, ∞) Inc(0,3) decr: (- ∞, 0) cons: (3, ∞) decr: ( - ∞, 7)υ (7, ∞)

  3. Extrema • Definition: The peaks and valleys where a graph changes from increasing to decreasing or vice versa. • Types: Minima and Maxima Local (relative) and absolute

  4. Local (or relative) extrema • A local maximum for a function f, is a value f(c) that is greater than or equal to the range values of f on some open interval containing c. • A local minimum for a function f, is a value f(c) that is less than or equal to the range values of f on some open interval containing c.

  5. Absolute extrema • An absolute maximum for a function f, is a value f(c) that is greater than or equal to ALL of the range values of f. • An absolute minimum for a function f, is a value f(c) that is less than or equal to ALL of the range values of f.

  6. Example Relative minimum of -10.75 at x = -2.56 Relative max of 38.6 at x = -0.40 Absolute min of -42.93 at x = 2.21

  7. Example 1 Absolute minimum of -1.688 at x = -1.500

  8. Example 2 Local maximum of 9.481 at x = -1.667 Local minimum of 0 at x = 1

  9. Example 3 Absolute minimum of -11.2 at x = -1.714 Local maximum of 0.459 at x = 0.312 Local minimum of -1.758 at x = 1.402

  10. Example 4 These are absolute because for the min, there are no values in the range less than -1 and for the max, there are no values in the range greater than 1.

  11. Example 5 Absolute minimum of -4 at x = 2 Relative minimum of -1 at x = -3 Relative maximum of 3 at x = 1

  12. Homework • Wkst.

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