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Real Exponents Chapter 11 Section 1
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2 of 19 Pre-Calculus Chapter 11 Sections 1 & 2 Scientific Notation A number is in scientific notation when it is in the form a x 10 n where 1 < a < 10 and n is a n integer. A number is in scientific notation when it is in the form a x 10 n where 1 < a < 10 and n is a n integer. For any real number b and a positive integer n, the following definitions hold. For any real number b and a positive integer n, the following definitions hold.
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3 of 19 Pre-Calculus Chapter 11 Sections 1 & 2 Example 1 The volume of the planet Jupiter is 1.521 x 10 15 km 3. a.Write this value in standard form. 1.521 x 10 15 = 1,521,000,000,000,000 b. If the volume of Venus is 9.868 x 10 11 km 3, how many times larger is Jupiter than Venus?
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4 of 19 Pre-Calculus Chapter 11 Sections 1 & 2 Properties of Exponents
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5 of 19 Pre-Calculus Chapter 11 Sections 1 & 2 Example 2 Evaluate each expression Simplify each expression
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6 of 19 Pre-Calculus Chapter 11 Sections 1 & 2 Rational Exponents
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7 of 19 Pre-Calculus Chapter 11 Sections 1 & 2 Example 3 Evaluate each expression Simplify each expression
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8 of 19 Pre-Calculus Chapter 11 Sections 1 & 2 Rational Exponents Evaluate each expression
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9 of 19 Pre-Calculus Chapter 11 Sections 1 & 2 Example 5 Simplify Simplify Solve Solve
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Exponential Functions Chapter 11 Section 2
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11 of 19 Pre-Calculus Chapter 11 Sections 1 & 2 Exponential Function You have evaluated functions in which the variable is the base and the exponent is a real number, this is known as a power function. You have evaluated functions in which the variable is the base and the exponent is a real number, this is known as a power function. Functions in the form of y = b x, in which the base b is a positive real number and the exponent is a variable are known as exponential function. Functions in the form of y = b x, in which the base b is a positive real number and the exponent is a variable are known as exponential function.
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12 of 19 Pre-Calculus Chapter 11 Sections 1 & 2 Graph an Exponential Function a. Consider the graph y = 2 x. x 2x2x2x2xy -2 2 -2 1/4 -12 -1 1/2 02010201 12121212 22242224 32383238 -3 -2 -1 1 2 3 4 8765432187654321
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13 of 19 Pre-Calculus Chapter 11 Sections 1 & 2 Characteristics of graphs
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14 of 19 Pre-Calculus Chapter 11 Sections 1 & 2 Graph an Exponential Function Graph y = 2 x, y = 2 x + 3, and y = 2 x – 2 and compare and contrast.
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15 of 19 Pre-Calculus Chapter 11 Sections 1 & 2 Graph an Exponential Function Decreasing, continuous, and one-to-one. Same domain and horizontal asymptote. No vertical asymptote or x- intercept. Different y-intercepts
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16 of 19 Pre-Calculus Chapter 11 Sections 1 & 2 Exponential Functions In general, an equation of the form, y = ab x, where a ≠ 0, b > 0, and b ≠ 1, is called an exponential function with base b. In general, an equation of the form, y = ab x, where a ≠ 0, b > 0, and b ≠ 1, is called an exponential function with base b. There are two types of exponential functions: exponential growth and exponential decay. There are two types of exponential functions: exponential growth and exponential decay. The base of an exponential growth is a number greater than 1. The base of an exponential growth is a number greater than 1. The base of an exponential decay is a number between 0 and 1. The base of an exponential decay is a number between 0 and 1.
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17 of 19 Pre-Calculus Chapter 11 Sections 1 & 2 Exponential Functions
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18 of 19 Pre-Calculus Chapter 11 Sections 1 & 2Example Determine the amount of money in a money market account providing an annual rate of 5% compounded daily if Marcus invested $2000 and left it in the account for 7 years.
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19 of 19 Pre-Calculus Chapter 11 Sections 1 & 2 Daily Assignment Chapter 11 Sections 1 & 2 Text Book Pg 700 – 701 #21 – 59 Odd Pg 708 – 709 #10 – 14 All; # #19 – 21 All;
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