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Moving on to Sec. 2.2… HW: p. 189-190 1-21 odd, 41,43. Power Functions. Definition: Power Function. Any function that can be written in the form. where k and a are nonzero constants,. is a power function. The constant a is the power , and k is the constant of
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Moving on to Sec. 2.2…HW: p. 189-190 1-21 odd, 41,43 Power Functions
Definition: Power Function Any function that can be written in the form where k and a are nonzero constants, is a power function. The constant a is the power, and k is the constant of variation, or constant of proportion. We say that f (x) varies as the a-th power of x, or f (x) is proportional to the a-th power of x. Which of our twelve basic functions are power functions??? Identity Function, Squaring Function, Cubing Function, Reciprocal Function, Square Root Function
Some Examples… Power = 5/3, Constant = 9 Power = 0, Constant = 13 Power = 5, Constant = k/2 Power = 3, Constant = 4 /3
More Definitions Statements of direct variation – power function formulas with positive powers. Statements of inverse variation – power function formulas with negative powers. Circumference Power = 1, Constant = The circumference of a circle varies directly as its radius. Force of gravity Power = –2, Constant = The force of gravity acting on an object is inversely proportional to the square of the distance from the object to the center of the Earth.
More Definitions Statements of direct variation – power function formulas with positive powers. Statements of inverse variation – power function formulas with negative powers. Ex. from physics: The period of time (T) for the full swing of a pendulum varies as the square root of the pendulum’s length (L). Express this relationship as a power function.
Analyzing Power Functions State the power and constant of variation for the given function, graph it, and analyze it. Domain: All reals Extrema: None Range: All reals Asymptotes: None Continuity: Continuous End Behavior: Inc/Dec: Inc. for all x Symmetry: Origin (odd func.) Boundedness: Not Bounded
Analyzing Power Functions State the power and constant of variation for the given function, graph it, and analyze it. Boundedness: Below Domain: Extrema: None Range: Asymptotes: H.A.: y = 0 V.A.: x = 0 Continuity: Continuous on its domain (discont. at x = 0) End Behavior: Inc/Dec: Inc. on Dec. on Symmetry: y-axis (even func.)
Guided Practice Write the given statement as a power function equation. Use k for the constant of variation if one is not given. The volume V of a circular cylinder with fixed height is proportional to the square of its radius r. Charles’s Law states the volume V of an enclosed ideal gas at a constant pressure varies directly as the absolute temperature T.
Guided Practice Write the given statement as a power function equation. Use k for the constant of variation if one is not given. The speed p of a free-falling object that has been dropped from rest varies as the square root of the distance traveled d, with a constant of variation
Definition: Monomial Function Any function that can be written as or where k is a constant and n is a positive integer, is a monomial function.
…an “Exploration”: is even if n is even and odd if n is odd The graphs of , for n = 1, 2,…, 6 (1, 1) (0, 0) [0, 1] by [0, 1]
Guided Practice Describe how to obtain the graph of the given function from the graph of with the same power n. Sketch the graph by hand and support your answer with a grapher. Vertically stretch the graph of by a factor of 2. Both functions are odd.
Guided Practice Describe how to obtain the graph of the given function from the graph of with the same power n. Sketch the graph by hand and support your answer with a grapher. Vertically shrink the graph of by a factor of 2/3, and reflect it across the x-axis. Both functions are even.
More Truths About Graphs of Power Functions The general shapes that are possible for power functions Of the form for positive x-values. In all cases, the graph of f contains the point (1, k). a < 0 a > 1 k < 0 a = 1 (1, k) 0 < a < 1 0 < a < 1 (1, k) a = 1 a > 1 a < 0 k > 0
More Guided Practice Observe the values of the constants k and a. Describe the portion of the graph that lies in Quadrant I or IV. Determine whether f is even, odd, or undefined for x < 0. Describe the rest of the curve, if any. Graph the function to see whether it matches the description. Because k is positive and a is negative, the graph passes through (1, 2) and is asymptotic to both axes. The graph is decreasing in the first quadrant. The function is odd because f (–x) = –f (x).
More Guided Practice Observe the values of the constants k and a. Describe the portion of the graph that lies in Quadrant I or IV. Determine whether f is even, odd, or undefined for x < 0. Describe the rest of the curve, if any. Graph the function to see whether it matches the description. Because k is negative and a > 1, the graph contains (0, 0) and passes through (1, – 0.4). In the fourth quadrant, it is decreasing. The function is undefined for x < 0 (Why???).
More Guided Practice Observe the values of the constants k and a. Describe the portion of the graph that lies in Quadrant I or IV. Determine whether f is even, odd, or undefined for x < 0. Describe the rest of the curve, if any. Graph the function to see whether it matches the description. Because k is negative and 0 < a < 1, the graph contains (0, 0) and passes through (1, –1). In the fourth quadrant, it is decreasing. The function is even because f (–x) = f (x).
Modeling with power Functions: Average distances and orbit periods for the six innermost planets. Average Distance from Sun (Gm) Period of Orbit (days) Planet Mercury 57.9 88 Venus 108.2 225 Earth 149.6 365.2 Mars 227.9 687 Jupiter 778.3 4332 Saturn 1427 10760
Use the data from the previous slide to obtain a power function model for orbital period as a function of average distance from the Sun. Then use the model to predict the orbital period for Neptune, which is 4497 Gm from the Sun on average. Use your calculator to find power regression for the data… How well does this model fit the data? For Neptune: It takes Neptune about 60,313 days to orbit the Sun, or about 165 years.
More Quality Practice Problems Charles’s Law. The volume of an enclosed gas (at a constant pressure) varies directly as the absolute temperature. If the pressure of a 3.46-L sample of neon gas at 302 degrees Kelvin is 0.926 atm, what would the volume be at a temperature of 338 degrees Kelvin if the pressure does not change? First, write the general equation: Next, solve for k:
More Quality Practice Problems Charles’s Law. The volume of an enclosed gas (at a constant pressure) varies directly as the absolute temperature. If the pressure of a 3.46-L sample of neon gas at 302 degrees Kelvin is 0.926 atm, what would the volume be at a temperature of 338 degrees Kelvin if the pressure does not change? Now, use our equation to solve for V at the new T: