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Perfect Squares and Square Roots You will learn: 1. that a perfect square is a whole number whose square root is a whole number (for example is 5, thus, 25 is a perfect square.) 2. to identify the perfect squares from 0 to 100 by squaring the whole numbers from 0 to 10; 3. the square root of a number is that number which when multiplied by itself equals the number; 4. that any whole number other than a perfect square has a square root that lies between two consecutive whole numbers; 5. to identify the two consecutive whole numbers between which the square root of a given whole number from 0 to 100 lies; 6. that the square root of a whole number that is not a perfect square is an irrational number; (for example 2 is an irrational number.) (An irrational number cannot be expressed exactly as a ratio.) 7. To use a calculator to find square roots. Vocabulary 1. Perfect squares are the squares of the whole numbers. 2. The opposite of squaring a number is finding its square root. 3. A radical sign ( ) is the symbol for square root. 4. Irrational numbers are numbers that can not be represented by a ratio of two integers. Irrational numbers can be represented by decimals that do not end and are not repeating. For example, 0.34334334… is an irrational number. Team Activity 1: Use 9 tiles to make a square. What did you discover? Try 16 tiles. Is your conclusion the same? EXAMPLE 1: Square 1: = 1 x 1 = 1 a perfect square Square 2: = 2 x 2 = 4 a perfect square List the other perfect squares. Write answers on this paper. 1 12 1x1 1 2 22 2x2 4 3 32 3x3 9 4 5 6 7 8 9 10 You can square a number using a calculator. Find Perfect Squares Using a Calculator. EXAMPLE 2: Find Perfect Squares Using a Calculator. 12 13 Finding the Square Root of a Perfect Square Find the square root of each integer. Using the calculator… 1. Enter 100 2. Press the square root key. 14 100 100 81 81 64 64 36 36 16 16 4 4 25 25 49 49 9 9 1 1 Example: Find the square root of 36 . 100 10 36 36 is the same as . The square root of a fraction is the same as the square 100 100 root of the numerator over the square root of the denominator. 1. Find the square root of the numerator. 36 = 6. 2. Find the square root of the denominator. 100 = 10 6 3 3. Write and simplify it. = 10 5 Try it 2. Find the square root of 9 and 36 16 . 64 Estimating Square Roots that are Not Perfect Squares EXAMPLE: Between what two consecutive whole numbers does 12 lie? 1. Find the perfect square numbers it lies between. 2. 12 lies between 9 and 16. 3. The square root of 9 = 3 and the square root of 16 = 4 lies between the two consecutive whole numbers 3 and 4. Try it 1. Between what two consecutive whole numbers does each number lie? 72 5 54
