Log25(104) ▷ What is Log Base 25 of 104?

Q: How do you write log 25 104 in exponential form?

In exponential form is 25 1.4428611576936 = 104.

Table of Contents

Log ₂₅ (104) is the logarithm of 104 to the base 25:

Calculator

×log

Base 1

Exponent 1

Result: Result

Simply the Best Logarithm Calculator! Click To Tweet As you can see in our log calculator, log25 (104) = 1.4428611576936.

Calculate Log Base 25 of 104

To solve the equation log ₂₅ (104) = 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 = 104, a = 25:
log ₂₅ (104) = log(104) / log(25)
Evaluate the term:
log(104) / log(25)
= 1.39794000867204 / 1.92427928606188
= 1.4428611576936
= Logarithm of 104 with base 25

Here’s the logarithm of 25 to the base 104.

Additional Information

From the definition of logarithm b ^y = x ⇔ y = log _b(x) follows that 25 ^{1.4428611576936} = 104
25 ^{1.4428611576936} = 104 is the exponential form of log25 (104)
25 is the logarithm base of log25 (104)
104 is the argument of log25 (104)
1.4428611576936 is the exponent or power of 25 ^{1.4428611576936} = 104

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

Frequently searched terms on our site include:

FAQs

What is the value of log25 104?

Log25 (104) = 1.4428611576936.

How do you find the value of log ₂₅104?

Carry out the change of base logarithm operation.

What does log ₂₅ 104 mean?

It means the logarithm of 104 with base 25.

How do you solve log base 25 104?

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

What is the log base 25 of 104?

The value is 1.4428611576936.

How do you write log ₂₅ 104 in exponential form?

In exponential form is 25 ^{1.4428611576936} = 104.

What is log25 (104) equal to?

log base 25 of 104 = 1.4428611576936.

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 25 of 104 = 1.4428611576936.

You now know everything about the logarithm with base 25, argument 104 and exponent 1.4428611576936.
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 Log25 (104).

Table

Our quick conversion table is easy to use:

log ₂₅(x)		Value
log ₂₅(103.5)	=	1.4413639621825
log ₂₅(103.51)	=	1.4413939769129
log ₂₅(103.52)	=	1.4414239887438
log ₂₅(103.53)	=	1.4414539976757
log ₂₅(103.54)	=	1.4414840037092
log ₂₅(103.55)	=	1.4415140068448
log ₂₅(103.56)	=	1.4415440070831
log ₂₅(103.57)	=	1.4415740044246
log ₂₅(103.58)	=	1.4416039988699
log ₂₅(103.59)	=	1.4416339904196
log ₂₅(103.6)	=	1.4416639790742
log ₂₅(103.61)	=	1.4416939648343
log ₂₅(103.62)	=	1.4417239477005
log ₂₅(103.63)	=	1.4417539276732
log ₂₅(103.64)	=	1.4417839047531
log ₂₅(103.65)	=	1.4418138789407
log ₂₅(103.66)	=	1.4418438502366
log ₂₅(103.67)	=	1.4418738186413
log ₂₅(103.68)	=	1.4419037841555
log ₂₅(103.69)	=	1.4419337467795
log ₂₅(103.7)	=	1.4419637065141
log ₂₅(103.71)	=	1.4419936633597
log ₂₅(103.72)	=	1.4420236173169
log ₂₅(103.73)	=	1.4420535683863
log ₂₅(103.74)	=	1.4420835165685
log ₂₅(103.75)	=	1.4421134618639
log ₂₅(103.76)	=	1.4421434042732
log ₂₅(103.77)	=	1.4421733437969
log ₂₅(103.78)	=	1.4422032804355
log ₂₅(103.79)	=	1.4422332141897
log ₂₅(103.8)	=	1.4422631450599
log ₂₅(103.81)	=	1.4422930730468
log ₂₅(103.82)	=	1.4423229981508
log ₂₅(103.83)	=	1.4423529203726
log ₂₅(103.84)	=	1.4423828397126
log ₂₅(103.85)	=	1.4424127561716
log ₂₅(103.86)	=	1.4424426697499
log ₂₅(103.87)	=	1.4424725804481
log ₂₅(103.88)	=	1.4425024882669
log ₂₅(103.89)	=	1.4425323932067
log ₂₅(103.9)	=	1.4425622952682
log ₂₅(103.91)	=	1.4425921944518
log ₂₅(103.92)	=	1.4426220907582
log ₂₅(103.93)	=	1.4426519841878
log ₂₅(103.94)	=	1.4426818747413
log ₂₅(103.95)	=	1.4427117624192
log ₂₅(103.96)	=	1.442741647222
log ₂₅(103.97)	=	1.4427715291503
log ₂₅(103.98)	=	1.4428014082046
log ₂₅(103.99)	=	1.4428312843855
log ₂₅(104)	=	1.4428611576936
log ₂₅(104.01)	=	1.4428910281294
log ₂₅(104.02)	=	1.4429208956935
log ₂₅(104.03)	=	1.4429507603863
log ₂₅(104.04)	=	1.4429806222086
log ₂₅(104.05)	=	1.4430104811607
log ₂₅(104.06)	=	1.4430403372433
log ₂₅(104.07)	=	1.4430701904569
log ₂₅(104.08)	=	1.4431000408021
log ₂₅(104.09)	=	1.4431298882794
log ₂₅(104.1)	=	1.4431597328894
log ₂₅(104.11)	=	1.4431895746326
log ₂₅(104.12)	=	1.4432194135096
log ₂₅(104.13)	=	1.4432492495208
log ₂₅(104.14)	=	1.443279082667
log ₂₅(104.15)	=	1.4433089129486
log ₂₅(104.16)	=	1.4433387403661
log ₂₅(104.17)	=	1.4433685649202
log ₂₅(104.18)	=	1.4433983866114
log ₂₅(104.19)	=	1.4434282054401
log ₂₅(104.2)	=	1.4434580214071
log ₂₅(104.21)	=	1.4434878345127
log ₂₅(104.22)	=	1.4435176447576
log ₂₅(104.23)	=	1.4435474521424
log ₂₅(104.24)	=	1.4435772566675
log ₂₅(104.25)	=	1.4436070583335
log ₂₅(104.26)	=	1.443636857141
log ₂₅(104.27)	=	1.4436666530905
log ₂₅(104.28)	=	1.4436964461826
log ₂₅(104.29)	=	1.4437262364178
log ₂₅(104.3)	=	1.4437560237966
log ₂₅(104.31)	=	1.4437858083196
log ₂₅(104.32)	=	1.4438155899874
log ₂₅(104.33)	=	1.4438453688005
log ₂₅(104.34)	=	1.4438751447594
log ₂₅(104.35)	=	1.4439049178648
log ₂₅(104.36)	=	1.443934688117
log ₂₅(104.37)	=	1.4439644555168
log ₂₅(104.38)	=	1.4439942200646
log ₂₅(104.39)	=	1.4440239817609
log ₂₅(104.4)	=	1.4440537406064
log ₂₅(104.41)	=	1.4440834966016
log ₂₅(104.42)	=	1.444113249747
log ₂₅(104.43)	=	1.4441430000431
log ₂₅(104.44)	=	1.4441727474906
log ₂₅(104.45)	=	1.4442024920899
log ₂₅(104.46)	=	1.4442322338416
log ₂₅(104.47)	=	1.4442619727463
log ₂₅(104.48)	=	1.4442917088044
log ₂₅(104.49)	=	1.4443214420166
log ₂₅(104.5)	=	1.4443511723834

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Log 25 (104)