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Exponents. The mathematician’s shorthand. Objectives. TLW correctly identify the parts of an exponential expression TLW use exponent rules to simplify exponential expressions. Is there a simpler way to write 5 + 5 + 5 + 5? 4 · 5.
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Exponents The mathematician’s shorthand
Objectives • TLW correctly identify the parts of an exponential expression • TLW use exponent rules to simplify exponential expressions
Is there a simpler way to write5 + 5 + 5 + 5?4 · 5 Just as repeated addition can be simplified by multiplication, repeated multiplication can be simplified by using exponents. For example: 2 · 2 · 2 is the same as 2³, since there are three 2’s being multiplied together.
Likewise, 5 · 5 · 5 · 5 = 54, because there are four 5’s being multiplied together. Power – a number produced by raising a base to an exponent. (the term 27 is called a power.) Exponential form – a number written with a base and an exponent. (23) Exponent – the number that indicates how many times the base is used as a factor. (27) Base – when a number is being raised to a power, the number being used as a factor. (27)
Evaluating exponents is the second step in the order of operations. The sign rules for multiplication still apply.
Writing exponents 3 · 3 · 3 · 3 · 3 · 3 = 36How many times is 3 used as a factor? (-2)(-2)(-2)(-2) = (-2)4How many times is -2 used as a factor? x · x · x · x · x = x5How many times is x used as a factor? 12 = 121How many times is 12 used as a factor? 36 is read as “3 to the 6th power.”
Evaluating Powers 26 = 2 · 2 · 2 · 2 · 2 · 2 = 64 83 = 8 · 8 · 8 = 512 54 = 5 · 5 · 5 · 5 = 625 Always use parentheses to raise a negative number to a power. (-8)2 = (-8)(-8) = 64 (-5)3 = (-5)(-5)(-5) = -125 (-3)5 = (-3)(-3)(-3)(-3)(-3) = -243
When we multiply negative numbers together, we must use parentheses to switch to exponent notation. (-3)(-3)(-3)(-3)(-3)(-3) = (-3)6 = 729 You must be careful with negative signs! (-3)6 and -36mean something entirely different.
Note:When dealing with negative numbers, *if the exponent is an even number the answer will be positive.(-3)(-3)(-3)(-3) = (-3)4 = 81*if the exponent is an odd number the answer will be negative.(-3)(-3)(-3)(-3)(-3) = (-3)5 = -243
In general, the format for using exponents is:(base)exponentwhere the exponent tells you how many times the base is being multiplied together.Just a note about zero exponents: powers such as 20, 80are all equal to 1. You will learn more about zero powers in properties of exponents and algebra.
Simplifying Expressions Containing Powers • Simplify 50 – 2(3 · 23) 50 – 2(3 · 23) = 50 – 2(3 · 8) Evaluate the exponent. = 50 – 2(24) Multiply inside parentheses. = 50 – 48 Multiply from left to right. = 2 Subtract from left to right.
Problem Solving Many problems can be solved by using formulas that contain exponents. Solve the problem below: The distance in feet traveled by a falling object is given by the formula d = 16t2, where t is the time in seconds. Find the distance an object falls in 4 seconds.
(3 - 62) = 42 + (3 · 42) 27 + (2 · 52) (-3)5 2(53 + 102) Simplify and Solve
Properties of Exponents Multiplying, dividing powers and zero power.
The factors of a power, such as 74, can be grouped in different ways. Notice the relationship of the exponents in each product. 7 · 7 · 7 · 7 = 74 (7 · 7 · 7) · 7 = 73 · 71 = 74 (7 · 7) · (7 · 7) = 72· 72 = 74
Multiplying Powers with the Same Base • To multiply powers with the same base, keep the base and add the exponents. • 35 · 38 = 35+8 = 313 • am · an = a m+n
Multiply • 35 · 32 = 35+2 = 37 • a10 · a10 = a10+10 = a20 • 16 · 167 = 161+7 = 168 • 64 · 44 = Cannot combine; the bases are not the same.
Dividing Powers with the Same Base • To divide powers with the same base, keep the base and subtract the exponents. • 69 = 69-4 = 65 64 • bm = bm-n bn
Divide • 1009 = 1009-3 = 1006 1003 • x8 = Cannot combine; the bases are not the same. y5 When the numerator and denominator of a fraction have the same base and exponent, subtracting the exponents results in a 0 exponent. 1 = 42 = 42-2 = 40 = 1 42
The zero power of any number except 0 equals 1.1000 = 1(-7)0 = 1a0 = 1 if a ≠ 0
How much is a googol?10100Life comes at you fast, doesn’t it?
Negative Exponents Extremely small numbers
Negative exponents have a special meaning. The rule is as follows: Basenegative exponent = 1/Basepositiveexponent 4-1 = 1 41
Look for a pattern in the table below to extend what you know about exponents. Start with what you know about positive and zero exponents. 103 = 10 · 10 · 10 = 1000 102 = 10 · 10 = 100 101 = 10 = 10 100 = 1 = 1 10-1 = 1/10 10-2 = 1/10 · 10 = 1/100 10-3 = 1/10 · 10 · 10 = 1/1000
Example: 10-5 = 1/105 = 1/10·10·10·10·10 = 1/100,000 = 0.00001 So how long is 10-5 meters? 10-5 = 1/100,000 = “one hundred-thousandth of a meter. Negative exponent – a power with a negative exponent equals 1 ÷ that power with a positive exponent. 5-3 = 1/53 = 1/5·5·5 = 1/125
Evaluating negative exponents • (-2)-3 = 1/(-2)3 = 1/(-2)(-2)(-2) = -1/8 • 5-3 = 1/53 = 1/(5)(5)(5) = 1/ 125 • (-10)-3 = 1/(-10)3 = 1/(-10)(-10)(-10) = -1/1000 = 0.0001 • 3-4 · 35 = 3-4+5 = 31 = 3 Remember Properties of Exponents: multiply same base you keep the base and add the exponents.
Evaluate exponents:Get your pencil and calculator ready to solve these expressions. • 10-5 = • 105 = • (-6)-2 = • 124/126 = • 12-3 · 126 • x9/x2 = • (-2)-1 = • 23/25 =
Problem Solving using exponents The weight of 107 dust particles is 1 gram. How many dust particles are in 1 gram? As of 2001, only 106 rural homes in the US had broadband internet access. How many homes had broadband internet access? Atomic clocks measure time in microseconds. A microsecond is 0.000001 second. Write this number using a power of 10.
Exponents can be very useful for evaluating expressions, especially if you learn how to use your calculator to work with them.
