8-7 Powers and Roots Course 2 Warm Up Warm Up Problem of the Day Problem of the Day Lesson Presentation Lesson Presentation
Warm Up Simplify Course Powers and Roots 225
Problem of the Day The square of two whole numbers are 16 units apart on a number line. What are the two numbers? 3 and 5 Course Powers and Roots
Learn to express and evaluate numbers using powers and roots. Course Powers and Roots
Vocabulary perfect square square root radical sign Insert Lesson Title Here Course 2 Powers and Roots 8-7
Course 2 Powers and Roots Exponent Base Recall that a power is a number represented by a base and an exponent. The exponent tells you how many times to use the base as a repeated factor. A square with sides that measure 3 units each has an area of 3 · 3, or 3 2. Notice that the area of the square is represented by a power in which the base is the side length and the exponent is 2. A power in which the exponent is 2 is called a square.
Model each power using a square. Then evaluate the power. Additional Example 1A & 1B: Finding Squares Course Powers and Roots A A = lw A = 12 · 12 A = 144 The square of 12 is 144. Substitute. Multiply. B. (3.6) 2 A = lw A = 3.6 · 3.6 A = The square of 3.6 is Substitute. Multiply
Try This: Example 1A &1B Insert Lesson Title Here Course Powers and Roots A A = lw A = 10 · 10 A = 100 The square of 10 is 100. Substitute. Multiply. B. (5.2) 2 A = lw A = 5.2 · 5.2 A = The square of 5.2 is Substitute. Multiply. Model each power using a square. Then evaluate the power
Course Powers and Roots A perfect square is the square of a whole number. The number 49 is a perfect square because 49 =7 2 and 7 is a whole number. The number 6.25 is not a perfect square. The square root of a number is one of the two equal factors of the number. Four is a square root of 16 because 4 · 4 = 16. The symbol for a square root is √, which is called a radical sign.
Course Powers and Roots √16 = 4 is read as “The square root of 16 is 4.” Reading Math Most calculators have square-root keys that you can use to quickly find approximate square roots of nonperfect squares. You can also use perfect squares to estimate the square roots of nonperfect squares.
Estimate each square root to the nearest whole number. Use a calculator to check your answer. Additional Example 2A: Estimating Square Roots Course Powers and Roots 36 < 40 < 49 Check Find the perfect squares nearest 40. Find the square roots of 36 and is nearer in value to 36 than to is a reasonable estimate. √36 < √40 < 49 √ 6 < 40< 7 √ 40 6 √ 40 √ Use a calculator to approximate √40. A. √40
Additional Example 2B: Estimating Square Roots Course Powers and Roots Estimate each square root to the nearest whole number. Use a calculator to check your answer. 64 < 79 < 81 Check Find the perfect squares nearest 79. Find the square roots of 64 and is nearer in value to 81 than to 64. B. √79 79 9 √ 79 √ 8 < 79< 9 √ √64 < √79 < 81 √ Use a calculator to approximate √79. 9 is a reasonable estimate.
Try This: Example 2A Insert Lesson Title Here Course Powers and Roots Estimate each square root to the nearest whole number. Use a calculator to check your answer. A. √22 16 < 22 < 25 Check Find the perfect squares nearest 22. Find the square roots of 16 and is nearer in value to 25 than to < 22< 5 √ 22 5 √ 22 √ √16 < √22 < 25 √ Use a calculator to approximate√22. 5 is a reasonable estimate.
Try This: Example 2B Insert Lesson Title Here Course Powers and Roots B. √53 49 < 53 < 64 Check Find the perfect squares nearest 53. Find the square roots of 49 and is nearer in value to 49 than to < 53< 8 √ 53 7 √ 53 √ √49 < √53 < 64 √ Use a calculator to approximate √53. Estimate each square root to the nearest whole number. Use a calculator to check your answer. 7 is a reasonable estimate.
A Coast Guard boat searching for a lost sailboat covers a square area of 125 mi 2. What is the approximate length of each side of the square area? Round your answer to the nearest mile. Additional Example 3: Recreation Application Course Powers and Roots 121 < 125 < 144 Find the perfect squares nearest 125. Find the square roots of 121 and 144. Each side of the search area is about 11 miles long. 125 is nearer in value to 121 than to 144. The length of each side of the square is √125. < < √125√121 √ < < 12√125 √125 11
Try This: Example 3 A tent was advertised in the newspaper as having an enclosed square area of 168 ft 2. What is the approximate length of the sides of the square area? Round your answer to the nearest foot. Insert Lesson Title Here Course Powers and Roots The length of each side of the square is √ < 168 < 169 Find the perfect squares nearest 168. Find the square roots of 144 and 169. < < √168√144 √ < < 13√168 √168 13 Each side of the tent is about 13 feet long. 168 is nearer in value to 169 than to 144.
Lesson Quiz Evaluate each power (3.5) 2 Estimate each square root to the nearest whole number. Use a calculator to check the reasonableness of your answers A square dining room table has an area of 20 ft 2. What is the length of each side of the table, to the nearest tenth? Insert Lesson Title Here 4 7 Course Powers and Roots √15 4. √ ft