Log104(3) ▷ What is Log Base 104 of 3?

Q: How do you write log 104 3 in exponential form?

In exponential form is 104 0.23654604285596 = 3.

Table of Contents

Log ₁₀₄ (3) is the logarithm of 3 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 (3) = 0.23654604285596.

Calculate Log Base 104 of 3

To solve the equation log ₁₀₄ (3) = 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 = 3, a = 104:
log ₁₀₄ (3) = log(3) / log(104)
Evaluate the term:
log(3) / log(104)
= 1.39794000867204 / 1.92427928606188
= 0.23654604285596
= Logarithm of 3 with base 104

Here’s the logarithm of 104 to the base 3.

Additional Information

From the definition of logarithm b ^y = x ⇔ y = log _b(x) follows that 104 ^{0.23654604285596} = 3
104 ^{0.23654604285596} = 3 is the exponential form of log104 (3)
104 is the logarithm base of log104 (3)
3 is the argument of log104 (3)
0.23654604285596 is the exponent or power of 104 ^{0.23654604285596} = 3

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 3?

Log104 (3) = 0.23654604285596.

How do you find the value of log ₁₀₄3?

Carry out the change of base logarithm operation.

What does log ₁₀₄ 3 mean?

It means the logarithm of 3 with base 104.

How do you solve log base 104 3?

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

What is the log base 104 of 3?

The value is 0.23654604285596.

How do you write log ₁₀₄ 3 in exponential form?

In exponential form is 104 ^{0.23654604285596} = 3.

What is log104 (3) equal to?

log base 104 of 3 = 0.23654604285596.

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 3 = 0.23654604285596.

You now know everything about the logarithm with base 104, argument 3 and exponent 0.23654604285596.
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 (3).

Table

Our quick conversion table is easy to use:

log ₁₀₄(x)		Value
log ₁₀₄(2.5)	=	0.19728975268717
log ₁₀₄(2.51)	=	0.19814928870734
log ₁₀₄(2.52)	=	0.19900540708023
log ₁₀₄(2.53)	=	0.19985813487642
log ₁₀₄(2.54)	=	0.20070749884614
log ₁₀₄(2.55)	=	0.20155352542427
log ₁₀₄(2.56)	=	0.2023962407353
log ₁₀₄(2.57)	=	0.20323567059819
log ₁₀₄(2.58)	=	0.20407184053107
log ₁₀₄(2.59)	=	0.20490477575593
log ₁₀₄(2.6)	=	0.20573450120318
log ₁₀₄(2.61)	=	0.20656104151611
log ₁₀₄(2.62)	=	0.20738442105531
log ₁₀₄(2.63)	=	0.20820466390295
log ₁₀₄(2.64)	=	0.20902179386703
log ₁₀₄(2.65)	=	0.20983583448549
log ₁₀₄(2.66)	=	0.21064680903032
log ₁₀₄(2.67)	=	0.21145474051155
log ₁₀₄(2.68)	=	0.21225965168113
log ₁₀₄(2.69)	=	0.2130615650368
log ₁₀₄(2.7)	=	0.21386050282587
log ₁₀₄(2.71)	=	0.21465648704891
log ₁₀₄(2.72)	=	0.21544953946338
log ₁₀₄(2.73)	=	0.21623968158721
log ₁₀₄(2.74)	=	0.21702693470231
log ₁₀₄(2.75)	=	0.217811319858
log ₁₀₄(2.76)	=	0.21859285787438
log ₁₀₄(2.77)	=	0.21937156934564
log ₁₀₄(2.78)	=	0.22014747464335
log ₁₀₄(2.79)	=	0.22092059391964
log ₁₀₄(2.8)	=	0.22169094711031
log ₁₀₄(2.81)	=	0.22245855393797
log ₁₀₄(2.82)	=	0.22322343391502
log ₁₀₄(2.83)	=	0.22398560634667
log ₁₀₄(2.84)	=	0.22474509033382
log ₁₀₄(2.85)	=	0.22550190477597
log ₁₀₄(2.86)	=	0.22625606837401
log ₁₀₄(2.87)	=	0.22700759963302
log ₁₀₄(2.88)	=	0.22775651686498
log ₁₀₄(2.89)	=	0.22850283819145
log ₁₀₄(2.9)	=	0.2292465815462
log ₁₀₄(2.91)	=	0.22998776467779
log ₁₀₄(2.92)	=	0.23072640515214
log ₁₀₄(2.93)	=	0.23146252035498
log ₁₀₄(2.94)	=	0.23219612749434
log ₁₀₄(2.95)	=	0.23292724360297
log ₁₀₄(2.96)	=	0.23365588554068
log ₁₀₄(2.97)	=	0.2343820699967
log ₁₀₄(2.98)	=	0.23510581349196
log ₁₀₄(2.99)	=	0.23582713238136
log ₁₀₄(3)	=	0.23654604285596
log ₁₀₄(3.01)	=	0.23726256094518
log ₁₀₄(3.02)	=	0.23797670251897
log ₁₀₄(3.03)	=	0.23868848328986
log ₁₀₄(3.04)	=	0.23939791881508
log ₁₀₄(3.05)	=	0.24010502449858
log ₁₀₄(3.06)	=	0.24080981559305
log ₁₀₄(3.07)	=	0.24151230720189
log ₁₀₄(3.08)	=	0.24221251428114
log ₁₀₄(3.09)	=	0.2429104516414
log ₁₀₄(3.1)	=	0.24360613394972
log ₁₀₄(3.11)	=	0.24429957573143
log ₁₀₄(3.12)	=	0.24499079137196
log ₁₀₄(3.13)	=	0.24567979511867
log ₁₀₄(3.14)	=	0.24636660108254
log ₁₀₄(3.15)	=	0.24705122323999
log ₁₀₄(3.16)	=	0.2477336754345
log ₁₀₄(3.17)	=	0.24841397137835
log ₁₀₄(3.18)	=	0.24909212465427
log ₁₀₄(3.19)	=	0.24976814871703
log ₁₀₄(3.2)	=	0.25044205689506
log ₁₀₄(3.21)	=	0.25111386239206
log ₁₀₄(3.22)	=	0.25178357828849
log ₁₀₄(3.23)	=	0.25245121754315
log ₁₀₄(3.24)	=	0.25311679299466
log ₁₀₄(3.25)	=	0.25378031736294
log ₁₀₄(3.26)	=	0.25444180325069
log ₁₀₄(3.27)	=	0.2551012631448
log ₁₀₄(3.28)	=	0.25575870941777
log ₁₀₄(3.29)	=	0.25641415432914
log ₁₀₄(3.3)	=	0.25706761002679
log ₁₀₄(3.31)	=	0.25771908854835
log ₁₀₄(3.32)	=	0.25836860182252
log ₁₀₄(3.33)	=	0.25901616167036
log ₁₀₄(3.34)	=	0.2596617798066
log ₁₀₄(3.35)	=	0.26030546784089
log ₁₀₄(3.36)	=	0.26094723727909
log ₁₀₄(3.37)	=	0.26158709952448
log ₁₀₄(3.38)	=	0.26222506587895
log ₁₀₄(3.39)	=	0.26286114754425
log ₁₀₄(3.4)	=	0.26349535562314
log ₁₀₄(3.41)	=	0.26412770112055
log ₁₀₄(3.42)	=	0.26475819494475
log ₁₀₄(3.43)	=	0.26538684790845
log ₁₀₄(3.44)	=	0.26601367072994
log ₁₀₄(3.45)	=	0.26663867403414
log ₁₀₄(3.46)	=	0.26726186835374
log ₁₀₄(3.47)	=	0.26788326413024
log ₁₀₄(3.48)	=	0.26850287171498
log ₁₀₄(3.49)	=	0.26912070137021
log ₁₀₄(3.5)	=	0.26973676327007
log ₁₀₄(3.51)	=	0.27035106750164

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Log 104 (3)