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Zero and negative exponent properties Lesson 5
exponents Zero and negative exponent properties Lesson 5
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a m • a n = a m + n = a m – n a m a n Review
What do we do when we want to multiply terms with the same base? What do we do when we want to divide terms with the same base? a m • a n = a m + n = a m – n a m a n
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4 7 4 9 = 4 7−9 4 7 4 9 Practice The exponent is negative?!!!
= 4 7−9 =4 −2 Subtracted Exponents The exponent is negative?!!! Let’s come back to this problem in a few minutes...
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Where do we Use negative exponents?
The diameter of a human hair is about 10 −3 inches. 10 −3 is the same as or or 1 1,000
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Where do we use negative exponents?
Chameleons and geckos can climb smooth, vertical surfaces because of tiny hairs on their feet that are 10 −4 meters long. 10 −4 is the same as or ,000 or
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Negative and zero exponents
So what would we do with the 4 −2 we got in our earlier problem? Let’s find out…
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Negative and zero exponents
So how should we correctly write 4 −2 using only positive exponents? 4 −2 = = 1 16
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Negative Exponent Property
For any integer a, and any exponent n≠0, 𝑎 −𝑛 = 1 𝑎 𝑛 or 𝑎 −𝑛 = 𝑎 𝑛 Algebra Numbers 𝑎 −𝑛 = 1 𝑎 𝑛 or 𝑎 −𝑛 = 𝑎 𝑛 Words Negative Exponent Property 3 −8 = or −8 = 3 8
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5 2 ∙ 5 −5 = 5 2+(−5) Product of Powers Property
practice 5 2 ∙ 5 −5 5 2 ∙ 5 −5 = 5 2+(−5) Product of Powers Property = 5 −3 Adding Powers = Definition of Negative Exponent = Simplifying
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4 𝑛 −11 4 𝑛 −11 =4∙ 𝑛 −11 Rewriting the Expression
Practice 4 𝑛 −11 4 𝑛 −11 =4∙ 𝑛 −11 Rewriting the Expression = 4 1 ∙ 1 𝑛 Definition of Negative Exponents = 4 𝑛 Multiplying
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1 49 1 16 1 −16 100 7 −2 −2 −4 − 2 −4 10 −5 ∙ 10 7 Come to the board!
7 − −2 −4 − 2 − −5 ∙ 10 7 1 3 2 4 −
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Come to the board! 5 𝑥 4 𝑥 𝑎 −4 𝑎 𝑏 2 ∙ 𝑏 −2 6∙ 6 −3 1 3 2 4 5 𝑥 𝑎
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