Log104(2) ▷ What is Log Base 104 of 2?

Q: How do you write log 104 2 in exponential form?

In exponential form is 104 0.14924393652741 = 2.

Table of Contents

Log ₁₀₄ (2) is the logarithm of 2 to the base 104:

Calculator

×log

Base 1

Exponent 1

Result: Result

Simply the Best Logarithm Calculator! Click To Tweet As you can see in our log calculator, log104 (2) = 0.14924393652741.

Calculate Log Base 104 of 2

To solve the equation log ₁₀₄ (2) = x carry out the following steps.

Apply the change of base rule:
log _a (x) = log _b (x) / log _b (a)
With b = 10:
log _a (x) = log(x) / log(a)
Substitute the variables:
With x = 2, a = 104:
log ₁₀₄ (2) = log(2) / log(104)
Evaluate the term:
log(2) / log(104)
= 1.39794000867204 / 1.92427928606188
= 0.14924393652741
= Logarithm of 2 with base 104

Here’s the logarithm of 104 to the base 2.

Additional Information

From the definition of logarithm b ^y = x ⇔ y = log _b(x) follows that 104 ^{0.14924393652741} = 2
104 ^{0.14924393652741} = 2 is the exponential form of log104 (2)
104 is the logarithm base of log104 (2)
2 is the argument of log104 (2)
0.14924393652741 is the exponent or power of 104 ^{0.14924393652741} = 2

BTW: Logarithmic equations have many uses in various contexts in science.

Frequently searched terms on our site include:

FAQs

What is the value of log104 2?

Log104 (2) = 0.14924393652741.

How do you find the value of log ₁₀₄2?

Carry out the change of base logarithm operation.

What does log ₁₀₄ 2 mean?

It means the logarithm of 2 with base 104.

How do you solve log base 104 2?

Apply the change of base rule, substitute the variables, and evaluate the term.

What is the log base 104 of 2?

The value is 0.14924393652741.

How do you write log ₁₀₄ 2 in exponential form?

In exponential form is 104 ^{0.14924393652741} = 2.

What is log104 (2) equal to?

log base 104 of 2 = 0.14924393652741.

For further questions about the logarithm equation, common logarithms, the exponential function or the exponential equation fill in the form at the bottom.

Summary

In conclusion, log base 104 of 2 = 0.14924393652741.

You now know everything about the logarithm with base 104, argument 2 and exponent 0.14924393652741.
Further information, particularly about the binary logarithm, natural logarithm and decadic logarithm can be located in our article logarithm.

Besides the types of logarithms, there, we also shed a light on the terms on the properties of logarithms and the logarithm function, just to name a few.
Thanks for visiting Log104 (2).

Table

Our quick conversion table is easy to use:

log ₁₀₄(x)		Value
log ₁₀₄(1.5)	=	0.087302106328544
log ₁₀₄(1.51)	=	0.088732765991558
log ₁₀₄(1.52)	=	0.090153982287665
log ₁₀₄(1.53)	=	0.091565879065641
log ₁₀₄(1.54)	=	0.092968577753729
log ₁₀₄(1.55)	=	0.094362197422309
log ₁₀₄(1.56)	=	0.095746854844552
log ₁₀₄(1.57)	=	0.097122664555132
log ₁₀₄(1.58)	=	0.098489738907085
log ₁₀₄(1.59)	=	0.099848188126859
log ₁₀₄(1.6)	=	0.10119812036765
log ₁₀₄(1.61)	=	0.10253964176108
log ₁₀₄(1.62)	=	0.10387285646725
log ₁₀₄(1.63)	=	0.10519786672328
log ₁₀₄(1.64)	=	0.10651477289036
log ₁₀₄(1.65)	=	0.10782367349938
log ₁₀₄(1.66)	=	0.10912466529511
log ₁₀₄(1.67)	=	0.11041784327918
log ₁₀₄(1.68)	=	0.11170330075168
log ₁₀₄(1.69)	=	0.11298112935153
log ₁₀₄(1.7)	=	0.11425141909572
log ₁₀₄(1.71)	=	0.11551425841734
log ₁₀₄(1.72)	=	0.11676973420252
log ₁₀₄(1.73)	=	0.11801793182633
log ₁₀₄(1.74)	=	0.11925893518757
log ₁₀₄(1.75)	=	0.12049282674266
log ₁₀₄(1.76)	=	0.12171968753848
log ₁₀₄(1.77)	=	0.12293959724434
log ₁₀₄(1.78)	=	0.12415263418301
log ₁₀₄(1.79)	=	0.12535887536088
log ₁₀₄(1.8)	=	0.12655839649733
log ₁₀₄(1.81)	=	0.12775127205323
log ₁₀₄(1.82)	=	0.12893757525867
log ₁₀₄(1.83)	=	0.13011737813995
log ₁₀₄(1.84)	=	0.13129075154583
log ₁₀₄(1.85)	=	0.13245776517303
log ₁₀₄(1.86)	=	0.13361848759109
log ₁₀₄(1.87)	=	0.13477298626656
log ₁₀₄(1.88)	=	0.13592132758648
log ₁₀₄(1.89)	=	0.13706357688136
log ₁₀₄(1.9)	=	0.13819979844743
log ₁₀₄(1.91)	=	0.13933005556836
log ₁₀₄(1.92)	=	0.14045441053644
log ₁₀₄(1.93)	=	0.14157292467315
log ₁₀₄(1.94)	=	0.14268565834925
log ₁₀₄(1.95)	=	0.14379267100431
log ₁₀₄(1.96)	=	0.1448940211658
log ₁₀₄(1.97)	=	0.1459897664676
log ₁₀₄(1.98)	=	0.14707996366816
log ₁₀₄(1.99)	=	0.1481646686681
log ₁₀₄(2)	=	0.14924393652741
log ₁₀₄(2.01)	=	0.15031782148226
log ₁₀₄(2.02)	=	0.15138637696131
log ₁₀₄(2.03)	=	0.15244965560168
log ₁₀₄(2.04)	=	0.15350770926451
log ₁₀₄(2.05)	=	0.15456058905012
log ₁₀₄(2.06)	=	0.15560834531286
log ₁₀₄(2.07)	=	0.15665102767551
log ₁₀₄(2.08)	=	0.15768868504342
log ₁₀₄(2.09)	=	0.15872136561826
log ₁₀₄(2.1)	=	0.15974911691144
log ₁₀₄(2.11)	=	0.16077198575727
log ₁₀₄(2.12)	=	0.16179001832573
log ₁₀₄(2.13)	=	0.16280326013496
log ₁₀₄(2.14)	=	0.16381175606352
log ₁₀₄(2.15)	=	0.16481555036228
log ₁₀₄(2.16)	=	0.16581468666611
log ₁₀₄(2.17)	=	0.16680920800521
log ₁₀₄(2.18)	=	0.16779915681625
log ₁₀₄(2.19)	=	0.16878457495327
log ₁₀₄(2.2)	=	0.16976550369824
log ₁₀₄(2.21)	=	0.17074198377149
log ₁₀₄(2.22)	=	0.17171405534182
log ₁₀₄(2.23)	=	0.17268175803641
log ₁₀₄(2.24)	=	0.17364513095055
log ₁₀₄(2.25)	=	0.17460421265709
log ₁₀₄(2.26)	=	0.1755590412157
log ₁₀₄(2.27)	=	0.17650965418196
log ₁₀₄(2.28)	=	0.17745608861621
log ₁₀₄(2.29)	=	0.1783983810922
log ₁₀₄(2.3)	=	0.17933656770559
log ₁₀₄(2.31)	=	0.18027068408227
log ₁₀₄(2.32)	=	0.18120076538644
log ₁₀₄(2.33)	=	0.18212684632854
log ₁₀₄(2.34)	=	0.1830489611731
log ₁₀₄(2.35)	=	0.18396714374624
log ₁₀₄(2.36)	=	0.18488142744321
log ₁₀₄(2.37)	=	0.18579184523563
log ₁₀₄(2.38)	=	0.18669842967862
log ₁₀₄(2.39)	=	0.18760121291782
log ₁₀₄(2.4)	=	0.1885002266962
log ₁₀₄(2.41)	=	0.18939550236075
log ₁₀₄(2.42)	=	0.19028707086907
log ₁₀₄(2.43)	=	0.19117496279579
log ₁₀₄(2.44)	=	0.19205920833882
log ₁₀₄(2.45)	=	0.19293983732556
log ₁₀₄(2.46)	=	0.19381687921891
log ₁₀₄(2.47)	=	0.19469036312319
log ₁₀₄(2.48)	=	0.19556031778996
log ₁₀₄(2.49)	=	0.19642677162365
log ₁₀₄(2.5)	=	0.19728975268717
log ₁₀₄(2.51)	=	0.19814928870734

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Log 104 (2)