What are big numbers? IIIImagine the # 1. It represents one object IIIIncrease this by one zero (power of 10) to #10 It represents ten of those objects IIIIncrease this another zero to #100 It represents ten x ten objects (100) NNNNow imagine just how many objects the number 1,000,000 equals? It represents 10,000 times the number of dots above! It would take this computer 27 HOURS just to draw 1 million dots Now Imagine 100,000,000,000 (100 billion) dots! We would have to watch the computer draw that many dots for 317 YEARS In science, 100 billion is a tiny number. For example, your body alone has 1,000 x that number of cells (100,000,000,000,000)
Scientific Notation and the world of BIG numbers
Scientific Notation is a means of writing BIG numbers in a smaller way 2,461,000,000,000 is a big number. To use it in math and science is difficult. Some calculators don’t even accept it. This number can be written in a shortcut way - by Scientific Notation. 2,461,000,000,000 = 2.46 x 10 12
To convert a number into S.N. 1. Place a decimal point after the leftmost whole number > 0 Ex: 5, 3 4 5, 1 0 0, 0 0 0
To convert a number into S.N. 2. Count spaces you moved from the right end of the whole number to the decimal point Ex: equals 9 spaces moved
To convert a number into S.N. 3. Round the numbers to the right of the decimal point to 2 or more decimal places (whatever is asked for) Ex: rounds to
To convert a number into S.N. 4. Finally, insert your count of spaces as an exponent of x 10 ( here ) 5.3 5x10 9 Answer = 5,345,100,000 = 5.35 x 10 9 You counted 9 spaces before, so ….
S.N. step Summary 1) Place a decimal point after the leftmost whole number > 0 2) Count spaces from right end of the whole number to the decimal point 3) Round the whole numbers to 2 or more decimal places (whatever is required) 4) Insert your count of spaces as an exponent of x 10 ( here )
More examples Ex: 4,512 1. This becomes 2. There are 3 spaces in 3. This rounds to 4.51 4. The number becomes 4.51 x 10 3
More examples Ex: 8,867,890,000,000 ( to 3 decimal places) 1.This becomes There are 12 spaces in This rounds to The number becomes x 10 12
More examples Ex: 5,564,563,440 (to 4 decimal places) 1.This becomes There are 9 spaces in This rounds to The number becomes x 10 9
More examples Ex: (to 2 decimal places) 1.This becomes You moved 3 spaces in This rounds to The number becomes 8.18 x 10 3
Small fractional numbers have negative exponents Ex: Ex: (to 2 decimal places) 1. This becomes You had to move - 4 spaces to get to = = This rounds to The number becomes 5.43 x 10 -4
Another fractional example Ex: Ex: (to 2 decimal places) 1. This becomes You had to move - 3 spaces to get to = = This rounds to The number becomes 8.97 x 10 -3
Please Note The exponent is an exponent of 10, not of the number itself 136,700 = 1.37 x 10 5, NOT There is a BIG difference between these two numbers
To go in reverse, 1111. Write all the numbers you have, including the period (.) 2222. Add the spaces back using zeros 3333. Move the period (.) to the end & reset commas EEx: 6.73 x 10 8 11. Numbers are 6.73 22. Add 8 spaces back = 33. Move (.) and reset commas = 673,000,000.
More examples Ex: x 10 6 Numbers are spaces back becomes Move. and reset commas x 10 6 = 2,344, x 10 6 = 2,344,000.
More examples Ex: 3.99 x 10 4 Numbers are spaces back becomes Move. and reset commas = 39,900.
More examples Ex: 7.71 x Numbers are spaces back becomes Add a 0 in front of decimal point, and move (.) Commas are not needed =
More examples Ex: x Numbers are spaces back becomes Add a 0 in front of decimal point, and move (.) Commas are not needed =
Your turn! Complete parts 1 and 2 of Scientific Notation Worksheet
To enter big numbers in calculators Example: Enter 456,344,000,000 Convert to S.N. = x Enter EE 11 or EXP 11 or * (avoid)
More examples 75,679,012,000 10 spaces, so … Enter EE 10, or Enter Exp 10, or Enter * (avoid)
More examples 3 spaces to right, so … Enter EE +/- 3, or Enter EXP +/- 3, or Enter * (avoid)
Complete Parts 3 and 4 using your calculator To additional practice
To Multiply Numbers in S. Notation 1. Multiply the numbers you have 2. Add the exponents of 10 (if any) 3. Rewrite and convert the number into Scientific Notation and round as desired
Multiplication examples Ex: (5.2 x 10 3 ) x (2.344 x 10 6 ) 1.Multiply the numbers: 5.2 x = Add exponents: 10 3 * 10 6 = 10( 3+6 ) = Rewrite whole # in S. N. and round x 10 9 = 1.22 x 10 10
Multiplication examples Ex: ( 1.81 x 10 5 ) * ( 8.7 x 10 4 ) 1.Multiply the numbers: 1.81 * 8.7 = Add exponents : 10 5 * 10 4 = 10 ( ) = Rewrite whole # in S. N. and round x 10 9 = 1.57 x 10 10
Multiplication examples Ex: 74.4 * ( 6.6 x 10 3 ) 1.Multiply the numbers: 74.4 * 6.6 = Add exponents: _ = Rewrite whole # in S. N. and round x 10 3 = 4.91 x 10 5
Multiplication examples Ex: * (16.4 x 10 8 ) * ( 4.6 x 10 5 ) 1. Multiply the numbers: * 16.4 * 4.6 = Add exponents : _ = Rewrite whole # in S. N. and round x = 1.72 x 10 17
To Divide Numbers in S. Notation 1. Divide the numbers 2. Subtract the exponents of 10 (if any) 3. Rewrite # in S.N. and round if needed
Division examples Ex: ( 8.7 x 10 5 ) / ( 2.2 x 10 3 ) or 8.7 x x 10 3 Divide the numbers: 8.7 / 2.2 = Subtract exponents: 10 5 /10 3 = 10 ( 5-3 ) =10 2 Rewrite # and round: x 10 2 = 3.95 x 10 2
Division examples Ex: ( x 10 6 ) / 52 or x Divide the numbers: / 52 = Subtract exponents: _ = 10 6 Rewrite # and round: x 10 6 = 4.51 x 10 4
Division examples Ex: ( 9.23 x 10 3 ) / 4.55 x 10 7 Divide the numbers: 9.23 / 4.55 = Subtract exponents: 10 ( ) = Rewrite # and round: x = 2.03 x 10 -4
Division examples Ex: ( x 10 4 ) / 9.32 x 10 8 Divide the numbers: / 9.32 = Subtract exponents: 10 ( ) = x = x Rewrite # and round: x = x 10 -5
To Add Numbers in S. Notation Convert both numbers to Scientific Notation first Raise exponent of the smaller number by moving spaces to the left to match the exponent of the larger # Add the numbers & carry exponents Round as needed
Addition examples Ex: ( x 10 6 ) + 8,640 8,640 = 8.64 x 10 3 Convert all to S.N: 8,640 = 8.64 x x 10 3 = x 10 6 Raise small # to big one by moving spaces left: 8.64 x 10 3 = x = Add the numbers: = x 10 6 = 2.35 x 10 6 Round: x 10 6 = 2.35 x 10 6
Addition examples Ex: ( 3.59 x 10 3 ) + ( 9.10 x 10 9 ) Convert all to S.N: already done 3.59 x 10 3 = x 10 9 Raise small # to big one by moving spaces left: 3.59 x 10 3 = x 10 9 Add the numbers: = = x 10 9 = 9.10 x 10 9 Round: x 10 9 = 9.10 x 10 9 Notice that this number is the same as the original. It did not change
To Subtract Numbers in S. Notation 1. Convert both numbers to Scientific Notation first. 2. Adjust the exponent of the smaller number to match the exponent of the bigger # by moving spaces left. 3. Subtract the numbers & carry the exponents 4. Round.
Subtraction examples Ex : ( x 10 6 ) - 128,310 (to 3 places) = x 10 5 Convert all to S.N: = x x 10 5 = x 10 6 Raise small # to big one by moving spaces left: x 10 5 = x – = Subtract the numbers: – = Round x 10 6 = x x 10 6 = x 10 6
Subtraction examples Ex: 2,334,561, x ( to 2 places) 2,334,561,000 = 2.33 x 10 9 Convert to S.N: 2,334,561,000 = 2.33 x x 10 9 = x Raise small # to big one by moving spaces left: 2.33 x 10 9 = x – 4.2 = Subtract the numbers: – 4.2 = Round: - watch the signs x = x x = x 10 11
Multiplication practice (show full answer, then round to 2 places) Multiplication practice (show full answer, then round to 2 places) (complete on page 2 of worksheet) Ex: x 8.7 x x 10 7 = 3.00 x x 10 7 = 3.00 x 10 11
Ex: 4.53 x 10 4 x 2.91 x x = 1.32 x x = 1.32 x Multiplication practice (show full answer, then round to 2 places) Multiplication practice (show full answer, then round to 2 places) (complete on page 3 of worksheet)
Ex: 6.44 x 10 4 / 3.72 x x 10 2 = 1.73 x x 10 2 = 1.73 x 10 2 Division practice (show full answer, then round to 2 places) Division practice (show full answer, then round to 2 places) (complete on page 3 of worksheet)
Ex: 5.45 x 10 3 / 6.79 x x = 8.03 x x = 8.03 x Division practice (show full answer, then round to 2 places) Division practice (show full answer, then round to 2 places) (complete on page 3 of worksheet)
Ex: x x x 10 8 = 5.54 x 10 8 Addition practice (show full answer, then round to 2 places) Addition practice (show full answer, then round to 2 places) (complete on page 3 of worksheet)
Ex: x ,322, x 10 6 = 4.39 x 10 6 Addition practice (show full answer, then round to 2 places) Addition practice (show full answer, then round to 2 places) (complete on page 3 of worksheet)
Ex: x ,322, x 10 6 = x x 10 6 = x 10 6 Subtraction practice (show full answer, then round to 2 places) Subtraction practice (show full answer, then round to 2 places) (complete on page 3 of worksheet)
Ex: 8.93 x x x 10 7 = 8.93 x x 10 7 = 8.93 x 10 7 Subtraction practice (show full answer, then round to 2 places) Subtraction practice (show full answer, then round to 2 places) (complete on page 3 of worksheet)
Your turn! Complete Parts 3 and 4 of worksheet