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RATIONAL EXPONENTS Algebra One.

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Presentation on theme: "RATIONAL EXPONENTS Algebra One."— Presentation transcript:

1 RATIONAL EXPONENTS Algebra One

2 Explore in your Notebook…
Evaluate the following: b) c) – d) e) f) g) h) What is an irrational number? What is a rational number? How can we predict/determine when a square root is irrational or rational? List the first 15 perfect squares.

3 Perfect Squares It’s important to know your perfect squares – they can be useful for estimating values for irrational square roots. Estimate the following square roots without a calculator:

4 SQUARING and SQUARE-ROOTING are INVERSE OPERATIONS.
IMPORTANT FACT SQUARING and SQUARE-ROOTING are INVERSE OPERATIONS.

5 Can we take roots other than “square roots”?
Yes we can take any kind of root – for example: The cube root of 8 is noted as The fifth root of 32 is noted as

6

7 SQUARE ROOTS & Nth ROOTS
Yes we can take any kind of root – for example: The square root of any number: The nth root of any number: *the “index” of the radical tells you what root you are taking, if you don’t see an “n” then it is square root.

8 What does this have to do with EXPONENTS?
Consider… roots and powers are inverse operations square root squaring Cube root cubing Fourth root fourth power Nth root nth power

9 If you could turn a “root” into a power, what would it look like?
Remember – inverse operations “cancel” out. so is the same as so is the same as

10 RATIONAL EXPONENTS The nth root of a positive number can be written as a power with base “a” and exponent “1/n”

11 RATIONAL EXPONENTS This makes nth roots very easy to evaluate on our calculator, just remember to put parentheses around the full exponent.

12 Get comfortable going back & forth between radical & exponential notation for nth roots.
Write the following using rational exponent notation: a) b) Write the following using radical notation. c) d) 61/ e) Seventh root(s) of 13

13 What about Rational Exponents that do NOT have a numerator of ONE?
What does this mean? /4 consider reversing the power of a power property 163/4 = 1631/4 = (163)1/4 So what does that numerator represent?

14 RATIONAL EXPONENTS The nth of a positive number can be written as a power with base “a” and exponent “1/n”

15 This makes it quite easy to evaluate on your calculator if you remember how to rewrite them!

16 Cool Down – THINK ABOUT IT…
What is the meaning of a negative rational exponent? 8-4/3

17 Homework Worksheet – Radicals & Rational Exponents

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