2. Scientific Notation
• Scientific notation is an expression of
numbers in the form of N x 10x.
• 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.
• Numbers expressed in scientific notation can
be used in a computation with far greater ease.
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The Andromeda Galaxy (the closest one to our Milky Way galaxy) contains at
least 200,000,000,000 stars. On the other hand, the weight of an alpha
particle, which is emitted in the radioactive decay of Plutonium-239, is
0.000,000,000,000,000,000,000,000,006,645 kilograms.
3. Scientific Notation
• In scientific notation, a number is written as
the product of two numbers.
– The first number is called the base, or coefficient.
• The base is a number between 1 & 10 and is
usually written with only one digit in front of
the decimal point.
– The second number is a power of ten.
• The small numeral 3 in 103 is called the
exponent. The exponent indicates how many
times the coefficient must be multiplied by 10 to
equal the number in question. 3
N x 10x
4. Converting Standard Form to
Scientific Notation
• Move the decimal point so that there is one
non-zero digit to the left of the decimal point.
• Remove the extra zeros at the end or
beginning of the number.
• Count the number of decimal places the
decimal point has “moved” from the original
number. This will be the exponent on the 10.
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5. Converting Standard Form to
Scientific Notation
• When numbers larger than 1 are expressed in
scientific notation, the power of ten is positive
(i.e., if the decimal is moved to the left).
• When numbers smaller than 1 are expressed
in scientific notation, the power of ten is
negative (i.e., if the decimal is moved to the
right).
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7. Converting Scientific Notation to
Standard Form
• Positive Exponent: Move the decimal point to
the right the same number of spots as the
exponent, then fill the empty spaces with
zeros.
• Negative Exponent: Move the decimal point to
the left the same number of spots as the
exponent, then fill the empty spaces with
zeros.
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8. Practice
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Example 3
Given: 5.093 x 106
Answer: 5,093,000 (moved 6 places to the right)
Example 4
Given: 1.976 x 10-4
Answer: 0.0001976 (moved 4 places to the left)
9. Multiplication in Scientific Notation
• To multiply numbers in scientific notation, use
two steps:
– Multiply the coefficients together.
– Add the exponents to which 10 is raised.
(2.5 x 102)(3.0 x 103) =
(2.5 x 3.0)(102+3) =
7.5 x 105
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10. Division in Scientific Notation
• To divide numbers in scientific notation, use
two steps:
• Divide the coefficients.
• Subtract the exponents to which 10 is raised.
(6.0 x 102) =
(3.0 x 10-4)
2.0 x 102 x 104 =
2.0 x 102-(-4) =
2.0 x 106
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12. Addition/Subtraction in
Scientific Notation
• If the numbers have different exponents, convert
both to standard notation and perform the
calculation.
(2.05 x 102) – (9.05 x 10-1) =
205 - 0.905 = 204.095
• OR convert one number so they have 10 raised to the
same power and perform the calculation.
(2.05 x 102) – (9.05 x 10-1) =
2.05 x 102
-0.00905 x 102
2.04095 x 102
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13. Using a Calculator!
• Scientific calculators can be used to calculate
numbers involving scientific notation! Watch this
youtube video to learn how (excuse the narrator’s
negativity…focus on the process)!
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