Adding/Subtracting/Multiplying/Dividing Numbers in Scientific Notation
A number is expressed in scientific notation when it is in the form a x 10n where a is between 1 and 10 and n is an integer
An easy way to remember this is: If an exponent is positive, the number gets larger, so move the decimal to the right. If an exponent is negative, the number gets smaller, so move the decimal to the left.
Adding/Subtracting when Exponents are Equal When the exponents are the same for all the numbers you are working with, add/subtract the base numbers then simply put the given exponent on the 10.
General Formulas (N X 10x) + (M X 10x) = (N + M) X 10x (N X 10y) - (M X 10y) = (N-M) X 10y
Example 1 Given: 2.56 X 103 + 6.964 X 103 Add: 2.56 + 6.964 = 9.524 Answer: 9.524 X 103
Example 2 Given: 9.49 X 105 – 4.863 X 105 Subtract: 9.49 – 4.863 = 4.627 Answer: 4.627 X 105
Adding With the Same Exponent (3.45 x 103) + (6.11 x 103) 3.45 + 6.11 = 9.56 9.56 x 103
Subtracting With the Same Exponent (8.96 x 107) – (3.41 x 107) 8.96 – 3.41 = 5.55 5.55 x 107
Adding/Subtracting when the Exponents are Different
When adding or subtracting numbers in scientific notation, the exponents must be the same. If they are different, you must move the decimal either right or left so that they will have the same exponent.
Moving the Decimal For each move of the decimal to the right you have to add -1 to the exponent. For each move of the decimal to the left you have to add +1 to the exponent.
Continued… It does not matter which number you decide to move the decimal on, but remember that in the end both numbers have to have the same exponent on the 10.
Example 1 Given: 2.46 X 106 + 3.476 X 103 Shift decimal 3 places to the left for 103. Move: .003476 X 103+3 Add: 2.46 X 106 + .003476 X 106 Answer: 2.463 X 106
Example 2 Given: 5.762 X 103 – 2.65 X 10-1 Shift decimal 4 places to the right for 10-1. Move: .000265 X 10(-1+4) Subtract: 5.762 X 103-.000265 X 103 Answer: 5.762 X 103
(4.12 x 106) + (3.94 x 104) (412 x 104) + (3.94 x 104) 412 + 3.94 = 415.94 415.94 x 104 Express in proper form: 4.15 x 106
Subtracting With Different Exponents (4.23 x 103) – (9.56 x 102) (42.3 x 102) – (9.56 x 102) 42.3 – 9.56 = 32.74 32.74 x 102 Express in proper form: 3.27 x 103
Multiplying… The general format for multiplying is as follows… (N x 10x)(M x 10y) = (N)(M) x 10x+y First multiply the N and M numbers together and express an answer. Secondly multiply the exponential parts together by adding the exponents together.
Multiplying… Finally multiply the two results for the final answer. (2.41 x 104)(3.09 x 102) 2.41 x 3.09 = 7.45 4 + 2 = 6 7.45 x 106
7) evaluate (3,600,000,000)(23). The answer in scientific notation is 8.28 x 10 10 The answer in decimal notation is 82,800,000,000
6) evaluate (0.0042)(330,000). The answer in decimal notation is 1386 The answer in scientific notation is 1.386 x 103
Write (2.8 x 103)(5.1 x 10-7) in scientific notation.
Dividing… The general format for dividing is as follows… (N x 10x)/(M x 10y) = (N/M) x 10x-y First divide the N number by the M number and express as an answer. Secondly divide the exponential parts by subtracting the exponent from the exponent in the upper number.
Dividing… Finally divide the two results together to get the final answer. (4.89 x 107)/(2.74 x 104) 4.89 / 2.74 = 1.78 7 – 4 = 3 1.78 x 103
5) evaluate: 7.2 x 10-9 1.2 x 102 : The answer in scientific notation is 6 x 10 -11 The answer in decimal notation is 0.00000000006
0.0028125 Write in scientific notation. 2.8125 x 10-3 4) Evaluate: 4.5 x 10-5 1.6 x 10-2 0.0028125 Write in scientific notation. 2.8125 x 10-3