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Exponential arithmetic

Exponential notation is used to express very large and very small numbers as a product of two numbers. The first number of the product, the digit term , is usually a number not less than 1 and not greater than 10. The second number of the product, the exponential term , is written as 10 with an exponent. Some examples of exponential notation are:

1000 = 1 × 10 3 100 = 1 × 10 2 10 = 1 × 10 1 1 = 1 × 10 0 0.1 = 1 × 10 −1 0.001 = 1 × 10 −3 2386 = 2.386 × 1000 = 2.386 × 10 3 0.123 = 1.23 × 0.1 = 1.23 × 10 −1

The power (exponent) of 10 is equal to the number of places the decimal is shifted to give the digit number. The exponential method is particularly useful notation for every large and very small numbers. For example, 1,230,000,000 = 1.23 × 10 9 , and 0.00000000036 = 3.6 × 10 −10 .

Addition of exponentials

Convert all numbers to the same power of 10, add the digit terms of the numbers, and if appropriate, convert the digit term back to a number between 1 and 10 by adjusting the exponential term.

Adding exponentials

Add 5.00 × 10 −5 and 3.00 × 10 −3 .

Solution

3.00 × 10 −3 = 300 × 10 −5 ( 5.00 × 10 −5 ) + ( 300 × 10 −5 ) = 305 × 10 −5 = 3.05 × 10 −3
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Subtraction of exponentials

Convert all numbers to the same power of 10, take the difference of the digit terms, and if appropriate, convert the digit term back to a number between 1 and 10 by adjusting the exponential term.

Subtracting exponentials

Subtract 4.0 × 10 −7 from 5.0 × 10 −6 .

Solution

4.0 × 10 −7 = 0.40 × 10 −6 ( 5.0 × 10 −6 ) ( 0.40 × 10 −6 ) = 4.6 × 10 −6
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Multiplication of exponentials

Multiply the digit terms in the usual way and add the exponents of the exponential terms.

Multiplying exponentials

Multiply 4.2 × 10 −8 by 2.0 × 10 3 .

Solution

( 4.2 × 10 −8 ) × ( 2.0 × 10 3 ) = ( 4.2 × 2.0 ) × 10 ( −8 ) + ( +3 ) = 8.4 × 10 −5
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Division of exponentials

Divide the digit term of the numerator by the digit term of the denominator and subtract the exponents of the exponential terms.

Dividing exponentials

Divide 3.6 × 10 5 by 6.0 × 10 −4 .

Solution

3.6 × 10 −5 6.0 × 10 −4 = ( 3.6 6.0 ) × 10 ( −5 ) ( −4 ) = 0.60 × 10 −1 = 6.0 × 10 −2
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Squaring of exponentials

Square the digit term in the usual way and multiply the exponent of the exponential term by 2.

Squaring exponentials

Square the number 4.0 × 10 −6 .

Solution

( 4.0 × 10 −6 ) 2 = 4 × 4 × 10 2 × ( −6 ) = 16 × 10 −12 = 1.6 × 10 −11
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Cubing of exponentials

Cube the digit term in the usual way and multiply the exponent of the exponential term by 3.

Cubing exponentials

Cube the number 2 × 10 4 .

Solution

( 2 × 10 4 ) 3 = 2 × 2 × 2 × 10 3 × 4 = 8 × 10 12
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Taking square roots of exponentials

If necessary, decrease or increase the exponential term so that the power of 10 is evenly divisible by 2. Extract the square root of the digit term and divide the exponential term by 2.

Finding the square root of exponentials

Find the square root of 1.6 × 10 −7 .

Solution

1.6 × 10 −7 = 16 × 10 −8 16 × 10 −8 = 16 × 10 −8 = 16 × 10 8 2 = 4.0 × 10 −4
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Significant figures

A beekeeper reports that he has 525,341 bees. The last three figures of the number are obviously inaccurate, for during the time the keeper was counting the bees, some of them died and others hatched; this makes it quite difficult to determine the exact number of bees. It would have been more accurate if the beekeeper had reported the number 525,000. In other words, the last three figures are not significant, except to set the position of the decimal point. Their exact values have no meaning useful in this situation. In reporting any information as numbers, use only as many significant figures as the accuracy of the measurement warrants.

Questions & Answers

organic chemistry is a science or social science discuss it's important to our country development
Musa Reply
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Terhemba Reply
what is the difference between ph and poh?
Abagaro Reply
chemical bond that results from the attractive force between shared electrons and nonmetals nucleus is what?
Abagaro
what is chemistry
Ayok
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ISIYAKA Reply
what is oxidation
Chidiebube Reply
calculate molarity of NaOH solution when 25.0ml of NaOH titrated with 27.2ml of 0.2m H2SO4
Gasin Reply
what's Thermochemistry
rhoda Reply
the study of the heat energy which is associated with chemical reactions
Kaddija
How was CH4 and o2 was able to produce (Co2)and (H2o
Edafe Reply
explain please
Victory
First twenty elements with their valences
Martine Reply
what is chemistry
asue Reply
what is atom
asue
what is the best way to define periodic table for jamb
Damilola Reply
what is the change of matter from one state to another
Elijah Reply
what is isolation of organic compounds
IKyernum Reply
what is atomic radius
ThankGod Reply
Read Chapter 6, section 5
Dr
Read Chapter 6, section 5
Kareem
Atomic radius is the radius of the atom and is also called the orbital radius
Kareem
atomic radius is the distance between the nucleus of an atom and its valence shell
Amos
Read Chapter 6, section 5
paulino
Bohr's model of the theory atom
Ayom Reply
is there a question?
Dr
when a gas is compressed why it becomes hot?
ATOMIC
It has no oxygen then
Goldyei
read the chapter on thermochemistry...the sections on "PV" work and the First Law of Thermodynamics should help..
Dr

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Source:  OpenStax, Chemistry. OpenStax CNX. May 20, 2015 Download for free at http://legacy.cnx.org/content/col11760/1.9
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