Expand the logarithmic expression: log3 d/12
The answer should not be a number!(it should be a different expression).

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zrh2sfo zrh2sfo · Answer 1 · 2019-03-02T20:03:05+01:00

Answer:

log(base 3)(d/12) = log(base 3)d - log(base 3)12

Step-by-step explanation:

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isyllus isyllus · Answer 2 · 2019-03-14T22:27:01+01:00

Answer:

Expanded form: [tex]\Rightarrow \log_3d-2\log_32-1[/tex]

Step-by-step explanation:

Given: [tex]\log_3\dfrac{d}{12}[/tex]

Subtraction property of log: log a/b = log a - log b

Addition property of log: log(ab) = log a+ log b

[tex]\log_aa=1[/tex]

[tex]\log_ab^m=m\log_ab[/tex]

[tex]\log_3\dfrac{d}{12}=\log_3d-\log_312[/tex] (Subtraction property )

[tex]\Rightarrow \log_3d-\log_3(4\times 3)[/tex]

[tex]\Rightarrow \log_3d-(\log_34+\log_33)[/tex] (Addition Property)

[tex]\Rightarrow \log_3d-\log_34-\log_33[/tex] (Distributive property)

[tex]\Rightarrow \log_3d-\log_34-1[/tex] ([tex]\log_aa=1[/tex])

[tex]\Rightarrow \log_3d-2\log_32-1[/tex]

The expanded form of [tex]\log_3\dfrac{d}{12}[/tex] is

[tex]\Rightarrow \log_3d-2\log_32-1[/tex]

Hence, Expanded form: [tex]\Rightarrow \log_3d-2\log_32-1[/tex]