Survey
* Your assessment is very important for improving the workof artificial intelligence, which forms the content of this project
Download Scientific Notation
Document related concepts
History of logarithms wikipedia , lookup
Mechanical calculator wikipedia , lookup
Location arithmetic wikipedia , lookup
Principia Mathematica wikipedia , lookup
Bra–ket notation wikipedia , lookup
Abuse of notation wikipedia , lookup
Approximations of π wikipedia , lookup
Large numbers wikipedia , lookup
Elementary mathematics wikipedia , lookup
Musical notation wikipedia , lookup
History of mathematical notation wikipedia , lookup
Transcript
Scientific Notation Cartoon courtesy of NearingZero.net Scientific Notation In science, we deal with some very LARGE numbers: 1 mole = 602000000000000000000000 In science, we deal with some very SMALL numbers: Mass of an electron = 0.000000000000000000000000000000091 kg Imagine the difficulty of calculating the mass of 1 mole of electrons! 0.000000000000000000000000000000091 kg x 602000000000000000000000 ??????????????????????????????????? Scientific Notation: A method of representing very large or very small numbers in the form: M x 10n M is a number between 1 and 9 n is an integer equal to the number of decimal places moved . 2 500 000 000 9 8 7 6 5 4 3 2 1 Step #1: Insert an understood decimal point Step #2: Decide where the decimal must end up so that one number is to its left Step #3: Count how many places you bounce the decimal point Step #4: Re-write in the form M x 10n 2.5 x 9 10 The exponent is the number of places we moved the decimal. 0.0000579 1 2 3 4 5 Step #2: Decide where the decimal must end up so that one number is to its left Step #3: Count how many places you bounce the decimal point Step #4: Re-write in the form M x 10n 5.79 x -5 10 The exponent is negative because the number we started with was less than 1. PERFORMING CALCULATIONS IN SCIENTIFIC NOTATION ADDITION AND SUBTRACTION Review: Scientific notation expresses a number in the form: M x 1 M 10 n 10 n is an integer 4 x 106 6 + 3 x 10 7 x 106 IF the exponents are the same, we simply add or subtract the numbers in front and bring the exponent down unchanged. 106 4 x + 3 x 105 If the exponents are NOT the same, we must move a decimal to make them the same. 6 10 4.00 x 4.00 x 6 5 + .30 x 10 + 3.00 x 10 6 4.30 x 10 Move the decimal on the smaller number! 6 10 A Problem for you… -6 10 2.37 x -4 + 3.48 x 10 Solution… -6 002.37 2.37 x 10 -4 + 3.48 x 10 Solution… -4 0.0237 x 10 -4 + 3.48 x 10 -4 3.5037 x 10 Scientific Notation and your calculator To enter a number in scientific notation on your calculator follow these steps: #1 Type in the decimal number - ex 6.022 #2 For most TI calculators press 2nd and then the EE button (usually above the x2 or x-1 buttons) - This represents x 10n in calculator language DO NOT TYPE IN x 10^n YOU WILL GET THE WRONG ANSWER! List the value of the following exponential terms __________ 1) 1.0 x 103 __________ 2) 1.0 x 100 __________ 5) 1.0 x 10-3 Put the following numbers into scientific notation. __________ 6) 588.762 __________ 7) 0.00000722 __________ 8) 4,310,000 __________ 9) 0.004100 Take the following numbers out of scientific notation ____________________ 10)3.67 x 105 ____________________ 11)2.099 x 103 ____________________ 12)3.1 x 10-1 ____________________ 13)5.04 x 10-5 ____________________ 14)2.00 x 100 Put the following numbers into correct scientific notation f sig figs indicated ________ 15) 30,000 (3 sig figs) ________ 16) 115,000,000 (2 sig figs) ________ 17) 106,000 (4 sig figs) ________ 18) 0.0412 (3 sig figs) ________ 19) 0.0233006 (2 sig figs) ________ 20) 0.00149999999 (3 sig figs) Solve the following problems. Put the answers into correct scientific notation form. (Yes, sig figs matter.) ________ 21) 1.50 x 102 / 2.39 x 10-1 ________ 22) 3.29 x 105 / 2.1 x 106 ________ 23) 1.50 x 104 * ________ 24) 8.000 x 10-3 ________ 25) 2.60 x 106 * 2.3 x 10-3 * 2.67 x 101 1.50 x 10-2
