you should include the definition of logarithms how to solve logarithmic equations how they are used in applications of math and everyday life how to graph logarithms explain how logarithms are the inverses of exponential how to graph exponentials importance of exponential functions(growth and decay ex.) pandemics, population)
common logarithms, natural logarithms, monatary calculations, etc.
Exponents can simplify very ugly math problems and their relation to logarithms makes them invaluable. FYI logarithms were invented before exponents.
Not much. In any case, you won't need advanced math (like trigonometry, algebra, calculus, logarithms...) which you only use in science and engineering careers.
the importance of aw
you should include the definition of logarithms how to solve logarithmic equations how they are used in applications of math and everyday life how to graph logarithms explain how logarithms are the inverses of exponential how to graph exponentials importance of exponential functions(growth and decay ex.) pandemics, population)
Logarithms
common logarithms, natural logarithms, monatary calculations, etc.
Exponents can simplify very ugly math problems and their relation to logarithms makes them invaluable. FYI logarithms were invented before exponents.
Logarithms were invented by John Napier who was a mathematician. He invented other things too, so there was no reason why he couldn't invent the logarithms. Logarithms were invented so people could take short cuts to multiplications! :)
The Table of Logarithms of the Natural Numbers from 1 to 108000.
you should just know about... -Trigonometric Identities-Logarithms, and Natural Logs-Limits-Derivatives
Not much. In any case, you won't need advanced math (like trigonometry, algebra, calculus, logarithms...) which you only use in science and engineering careers.
the importance of aw
In math, that may either refer to changing the base of the number system (for example, change from decimal (base 10) to binary (base 2)); or it may refer to changing logarithms, from one base to another - for example, common (base-10) logarithms to natural (base-e) logarithms.
Calculus -- instantaneous changes. Binomial theorem, logarithms, ellipses for orbits of planets, and many others.
to make a living