What is Scientific Notation?

1. What is Scientific Notation? • Scientific notation is a way of expressing really big numbers or really small numbers. • It is most often used in “scientific” calculations where the analysis must be very precise. • For very large and very small numbers, scientific notation is more concise.

2. How Big Can Our Numbers Be in Chemistry??? • MOLES: 1 (one) Mole of any element contains 602000000000000000000000 pieces In a practical example if you had 1 mole of M & M’s you would have 602000000000000000000000 M & M’s

3. Because . . . . . . • The particles (atoms) that make up an element are so small they will always be in large numbers – • THEREFORE you MUST put numbers in scientific notation to be able to work with them

4. When using Scientific Notation, there are two kinds of exponents: positive and negative Positive Exponent: 2.35 x 10 8 Negative Exponent: 3.97 x 10 -7

5. Putting Numbers in Scientific Notation • A number between 1 and 10 • A power of 10 N x 10x

6. When changing from Standard Notation to Scientific Notation: 1) First, move the decimal after the first whole number: 3 2 5 8 2) Second, add your multiplication sign and your base (10). 3 . 2 5 8 x 10 3) Count how many spaces the decimal moved and this is the exponent. 3 . 2 5 8 x 10 3 3 2 1

7. When changing from Standard Notation to Scientific Notation: 4) See if the original number is greater than or less than one. • If the number is greater than one, the exponent will be positive. 348943 = 3.489 x 105 • If the number is less than one, the exponent will be negative. .0000000672 = 6.72 x 10-8

8. More Examples • Given: 289,800,000 • Use: 2.898 (moved 8 places) • Answer:2.898 x 108 • Given: 0.000567 • Use: 5.67 (moved 4 places) • Answer:5.67 x 10-4

9. To change scientific notation to standard form… • Simply move the decimal point to the right for positive exponent 10. • Move the decimal point to the left for negative exponent 10. (Use zeros to fill in places.)

10. Example • Given: 5.093 x 106 • Answer: 5,093,000 (moved 6 places to the right) • Given: 1.976 x 10-4 • Answer: 0.0001976 (moved 4 places to the left)

11. Learning Check • Express these numbers in Scientific Notation: • 405789 • 0.003872 • 3000000000 • 2 • 0.478260

12. Using numbers in scientific notation in a a calculator to evaluate: 4.5 x 10-5 1.6 x 10-2 Type 4.5 -5 1.6 - 2 You must include parentheses if you don’t use those buttons!! (4.5 x 10 -5) (1.6 x 10 -2) 0.0028125 Write in scientific notation. 2.8125 x 10-3

13. Use a calculator to evaluate: 7.2 x 10-9 1.2 x 102On the calculator, the answer is: 6.E -11 The answer in scientific notation is 6 x 10 -11 The answer in decimal notation is 0.00000000006

14. 6) Use a calculator to evaluate (0.0042)(330,000).On the calculator, the answer is 1386. The answer in decimal notation is 1386 The answer in scientific notation is 1.386 x 103

15. LA RULE • Left Add – if you move the decimal to the left you add to the exponent • If you move the decimal right you -??????

16. Using Numbers in Scientific notation: • Adding & Subtracting • Rule #1 – the exponents must be the same • Examples: 3.5 x 103 + 2.5 x 103 = 6 x 103 5.8 x 1010 - 4.5 x 1010 = 1.3 x 1010 IF THEY ARE NOT THE SAME . . . . . .

17. What if they do not have the same exponent? • Rule – If not in scientific notation you must change the exponents • Examples: 3.5 x 105 + 2.5 x 103 = (350 x 103 + 2.5 x 103 = 352.5 x 103) put in correct scientific notation – 3.525 x 105 5.8 x 1010 - 4.5 x 108 = (5.8 x 1010 - .045 x 1010 = 5.755 x 1010)

18. Using Numbers in Scientific notation: • Multiplying and Dividing Rule– if multiplying, add the exponents if dividing, subtract the exponents Examples: 2.2 x 103 x 1.0 x 103 = 2.2 x 106 4.5 x 104 / 5.6 x 103 = .80357 x 101 (8.0357 x 100)

19. Learning Check • Multiply or Divide: • (4.05789 x 103) (2.7 x 10-2) • (3.872 x 1010)/(1.55 x 103)