Georgia Gas Find & Compare Gas in Georgia  GasGeorgia
february 2018 by neerajsinghvns
https://www.gasgeorgia.com/ ;;;
tags: Georgia Gas  Find & Compare Gas in Georgia  GasGeorgia  compare natural gas naturalGas price prices ;;;
Georgia
Gas

Find
&
Compare
in

GasGeorgia

natural
naturalGas
price
prices
tags: Georgia Gas  Find & Compare Gas in Georgia  GasGeorgia  compare natural gas naturalGas price prices ;;;
february 2018 by neerajsinghvns
Types of Numbers
october 2017 by neerajsinghvns
Types of Numbers
There are many different types of numbers,
Natural, or counting numbers . These are the first numbers you learn about as a child, perhaps as someone had you count the number of apples in a bag (1, 2, 3, 4, 6, ...). We will refer to this set of numbers as the positive integers.
Whole numbers . This is just the number zero included with the counting numbers (0, 1, 2, 3, 4, ...). We will call this the set of nonnegative integers.
Integers . These are the whole numbers, extended to include negative number values (...3, 2, 1, 0, 1, 2, 3, ...).
Rational numbers . Any number that can be expressed as a ratio of integers, or if you prefer a fraction. This includes all integers and numbers like 2/3, 12/5, 782387/2478923, 0/432, etc.. All rational numbers have a decimal equivalent. For example 11/4 = 2.75, 4/3 = 1.333333..., and 1/7 = 0.14285714285714285... The decimal equivalent of rational numbers always end in a repeating digit, or series of digits. The the three examples just listed, the decimal equivalent of 11/4 ends with a repeating 0, 4/3 ends with a repeating 3, and 1/7 ends with the sequence 14285 repeating forever.
Irrational numbers . Numbers that have a decimal equivalent, however they don't have a repeating digit or series of digits. This also means that one cannot find a ratio of integers that is exactly equal to the number. Common examples of irrational numbers are the square root of 2 and π.
Real numbers . All the rationals plus all the irrationals.
Imaginary numbers . Any real number multiplied by the square root of 1. Often the square root of 1 is referred to as i or j. So an imaginary number can be written as 3.2i or 8.77j. It is OK to use irrational multiplying numbers, so πj is a perfectly reasonable imaginary number.
Complex numbers . Any real number added to any imaginary number, such a 2+3j.
Types
of
Numbers

natural
whole
integers
rational
irrational
real
imaginary
complex
There are many different types of numbers,
Natural, or counting numbers . These are the first numbers you learn about as a child, perhaps as someone had you count the number of apples in a bag (1, 2, 3, 4, 6, ...). We will refer to this set of numbers as the positive integers.
Whole numbers . This is just the number zero included with the counting numbers (0, 1, 2, 3, 4, ...). We will call this the set of nonnegative integers.
Integers . These are the whole numbers, extended to include negative number values (...3, 2, 1, 0, 1, 2, 3, ...).
Rational numbers . Any number that can be expressed as a ratio of integers, or if you prefer a fraction. This includes all integers and numbers like 2/3, 12/5, 782387/2478923, 0/432, etc.. All rational numbers have a decimal equivalent. For example 11/4 = 2.75, 4/3 = 1.333333..., and 1/7 = 0.14285714285714285... The decimal equivalent of rational numbers always end in a repeating digit, or series of digits. The the three examples just listed, the decimal equivalent of 11/4 ends with a repeating 0, 4/3 ends with a repeating 3, and 1/7 ends with the sequence 14285 repeating forever.
Irrational numbers . Numbers that have a decimal equivalent, however they don't have a repeating digit or series of digits. This also means that one cannot find a ratio of integers that is exactly equal to the number. Common examples of irrational numbers are the square root of 2 and π.
Real numbers . All the rationals plus all the irrationals.
Imaginary numbers . Any real number multiplied by the square root of 1. Often the square root of 1 is referred to as i or j. So an imaginary number can be written as 3.2i or 8.77j. It is OK to use irrational multiplying numbers, so πj is a perfectly reasonable imaginary number.
Complex numbers . Any real number added to any imaginary number, such a 2+3j.
october 2017 by neerajsinghvns
Natural logarithm rules  ln(x) rules
august 2017 by neerajsinghvns
http://www.rapidtables.com/math/algebra/Ln.htm#lngraph;;;
tags: Natural logarithm rules  ln(x) rules  log ;;;
Natural
logarithm
rules

ln(x)

log
neha
komal
tags: Natural logarithm rules  ln(x) rules  log ;;;
august 2017 by neerajsinghvns
Georgia Public Service Commission
august 2015 by neerajsinghvns
http://www.psc.state.ga.us/content.aspx?c=/gasmarketerpricing/;;; tags:compare,comparison,pricing,price,prices,utility,natural,gas,rate,rates,georgia,public,service,commission,;;;
compare
comparison
pricing
price
prices
utility
natural
gas
rate
rates
georgia
public
service
commission
august 2015 by neerajsinghvns
[untitled]
october 2013 by neerajsinghvns
http://www.psc.state.ga.us/gas/marketerpricing/pricecard13.asp  tags: compare comaparison pricing price utility natural gas
compare
comaparison
pricing
price
prices
utility
natural
gas
rate
rates
georgia
public
service
commission
october 2013 by neerajsinghvns
Natural Gas Prices in Georgia  www.clarkhoward.com
december 2012 by neerajsinghvns
20121204: $0.5150 per therm by Commerce Energy;;;
ga
price
howard
clark
natural
gas
utility
december 2012 by neerajsinghvns
Infinite Energy
january 2011 by neerajsinghvns
$0.73 per therm
Infinite
Energy
natural
gas
offer
utility
january 2011 by neerajsinghvns
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