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| #First law If <math>log_a x = n </math> than <math>a^n = x </math> | | #First law If <math>log_a x = n </math> than <math>a^n = x </math> |
| #Second law If <math>log_A + log_B = log_(AB)</math> | | #Second law <math>log_n A + log_n B = log_(AB)</math> |
| | #Thirde law <math>log_A - log_B = log_({A \over B})</math> |
| | #law If "<math>{log_ x}^{log_ x} = {log_ x}^2 = n </math>" than "<math>{log_ x} = \sqrt[2]{n} </math>" |
| | #law if <math>log_ (x^n) = {log_ x}^n = n*{log_ x}</math> |
| | #law "<math>log_n (x) = {log_n (a)}</math>" than "x = a" |
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| <noinclude> | | <noinclude> |
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| ====example 3==== | | ====example 3==== |
| ex3: <math>log_a 25 =2 </math> find x. | | ex3: <math>log_a 25 =2 </math> find a. |
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| | <math>log_a x = n </math> |
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| | <math>a^n = x </math> |
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| | <math>a^2 = 25 </math> |
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| | a = 5 |
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| | ====example 4==== |
| | ex4: <math>log_a 25 =2 </math> find a. |
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| <math>log_a x = n </math> | | <math>log_a x = n </math> |
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| a = 5 | | a = 5 |
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| | ====example 5==== |
| | ex5: <math>log_4 x + log_4 (2x + 5)=2 </math> find x. |
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| | #Second law <math>log_A + log_B = log_(AB)</math>. |
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| | <math>log_4 x + log_4 (2x + 5)= log_4 (2x^2 + 4x) </math> |
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| | <math>log_4 (2x^2 + 4x) = 2 </math> |
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| | <math>4^2 = (2x^2 + 4x) </math> |
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| | <math>2x^2 + 4x - 16 = 0</math> |
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| | x= 2 and -4 |
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| | ====example 6==== |
| | ex6: <math>log_4 x + log_4 (x + 4) - log_4 (x^4 + 8x^3 + 16x^2) =2 </math> simplify |
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| | <math>log_4 x + log_4 (x + 4) - log_4 (x^4 + 8x^3 + 16x^2) = 2</math> |
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| | <math>log_4 x + log_4 (x + 4) = 2 + log_4 (x^4 + 8x^3 + 16x^2)</math> |
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| | #Second law <math>log_n A + log_n B = log_(AB)</math> |
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| | <math> log_4 x + log_4 (x + 4) = log_4 (x^2 + 4x)</math> |
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| | <math> log_4 (x^2 + 4x) - log_4 (x^4 + 8x^3 + 16x^2) = 2 </math> |
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| | #Thirde law <math>log_A - log_B = log_({A \over B})</math> |
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| | <math>(x^2 + 4x) = 16(x^4 + 8x^3 + 16x^2) </math> |
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| | <math> 16 (x^2 + 4)=0 </math> |
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| </noinclude> | | </noinclude> |
Latest revision as of 14:44, 6 October 2021
- First law If
than 
- Second law
- Thirde law
- law If "
" than "![{\displaystyle {log_{x}}={\sqrt[{2}]{n}}}](https://wikimedia.org/api/rest_v1/media/math/render/svg/03a3db55ccfbf87b90b6e7fce7072e741cd4bcd3)
"
- law if
- law "
" than "x = a"
examples
example 1
ex1: 
find n.
n=1
example 2
ex2: 
find x.
x = 16
example 3
ex3: 
find a.
a = 5
example 4
ex4: find a.
a = 5
example 5
ex5: 
find x.
- Second law
.
x= 2 and -4
example 6
ex6: 
simplify
- Second law
- Thirde law
