How do you write log 260 1 in exponential form?

In exponential form is 260 0 = 1.

Log260(1) ▷ What is Log Base 260 of 1?

Table of Contents

Log ₂₆₀ (1) is the logarithm of 1 to the base 260:

Calculator

×log

Base 1

Exponent 1

Result: Result

Simply the Best Logarithm Calculator! Click To Tweet As you can see in our log calculator, log260 (1) = 0.

Calculate Log Base 260 of 1

To solve the equation log ₂₆₀ (1) = 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 = 1, a = 260:
log ₂₆₀ (1) = log(1) / log(260)
Evaluate the term:
log(1) / log(260)
= 1.39794000867204 / 1.92427928606188
= 0
= Logarithm of 1 with base 260

Here’s the logarithm of 260 to the base 1.

Additional Information

From the definition of logarithm b ^y = x ⇔ y = log _b(x) follows that 260 ⁰ = 1
260 ⁰ = 1 is the exponential form of log260 (1)
260 is the logarithm base of log260 (1)
1 is the argument of log260 (1)
0 is the exponent or power of 260 ⁰ = 1

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

Frequently searched terms on our site include:

FAQs

What is the value of log260 1?

Log260 (1) = 0.

How do you find the value of log ₂₆₀1?

Carry out the change of base logarithm operation.

What does log ₂₆₀ 1 mean?

It means the logarithm of 1 with base 260.

How do you solve log base 260 1?

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

What is the log base 260 of 1?

The value is 0.

How do you write log ₂₆₀ 1 in exponential form?

In exponential form is 260 ⁰ = 1.

What is log260 (1) equal to?

log base 260 of 1 = 0.

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 260 of 1 = 0.

You now know everything about the logarithm with base 260, argument 1 and exponent 0.
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 Log260 (1).

Table

Our quick conversion table is easy to use:

log ₂₆₀(x)		Value
log ₂₆₀(0.5)	=	-0.12465147738252
log ₂₆₀(0.51)	=	-0.12109029035363
log ₂₆₀(0.52)	=	-0.11759825697614
log ₂₆₀(0.53)	=	-0.11417274258156
log ₂₆₀(0.54)	=	-0.11081126025755
log ₂₆₀(0.55)	=	-0.10751146000179
log ₂₆₀(0.56)	=	-0.10427111885329
log ₂₆₀(0.57)	=	-0.10108813189704
log ₂₆₀(0.58)	=	-0.097960504051046
log ₂₆₀(0.59)	=	-0.094886342555456
log ₂₆₀(0.6)	=	-0.091863850092907
log ₂₆₀(0.61)	=	-0.088891318477535
log ₂₆₀(0.62)	=	-0.085967122857148
log ₂₆₀(0.63)	=	-0.083089716379281
log ₂₆₀(0.64)	=	-0.080257625277302
log ₂₆₀(0.65)	=	-0.077469444337489
log ₂₆₀(0.66)	=	-0.074723832712174
log ₂₆₀(0.67)	=	-0.072019510047725
log ₂₆₀(0.68)	=	-0.069355252899374
log ₂₆₀(0.69)	=	-0.066729891407767
log ₂₆₀(0.7)	=	-0.064142306214642
log ₂₆₀(0.71)	=	-0.061591425597266
log ₂₆₀(0.72)	=	-0.05907622280329
log ₂₆₀(0.73)	=	-0.056595713569422
log ₂₆₀(0.74)	=	-0.054148953808911
log ₂₆₀(0.75)	=	-0.051735037454256
log ₂₆₀(0.76)	=	-0.049353094442783
log ₂₆₀(0.77)	=	-0.04700228883391
log ₂₆₀(0.78)	=	-0.044681817047872
log ₂₆₀(0.79)	=	-0.042390906216658
log ₂₆₀(0.8)	=	-0.040128812638651
log ₂₆₀(0.81)	=	-0.037894820329278
log ₂₆₀(0.82)	=	-0.035688239660575
log ₂₆₀(0.83)	=	-0.033508406083206
log ₂₆₀(0.84)	=	-0.031354678925025
log ₂₆₀(0.85)	=	-0.029226440260723
log ₂₆₀(0.86)	=	-0.027123093847586
log ₂₆₀(0.87)	=	-0.025044064122778
log ₂₆₀(0.88)	=	-0.022988795257919
log ₂₆₀(0.89)	=	-0.020956750267084
log ₂₆₀(0.9)	=	-0.018947410164639
log ₂₆₀(0.91)	=	-0.016960273169607
log ₂₆₀(0.92)	=	-0.014994853953511
log ₂₆₀(0.93)	=	-0.013050682928881
log ₂₆₀(0.94)	=	-0.011127305575807
log ₂₆₀(0.95)	=	-0.0092242818041325
log ₂₆₀(0.96)	=	-0.0073411853490342
log ₂₆₀(0.97)	=	-0.0054776031979276
log ₂₆₀(0.98)	=	-0.0036331350467603
log ₂₆₀(0.99)	=	-0.0018073927839069
log ₂₆₀(1)	=	7.9862369277372E-17
log ₂₆₀(1.01)	=	0.0017894084778508
log ₂₆₀(1.02)	=	0.0035611870288937
log ₂₆₀(1.03)	=	0.0053156796599676
log ₂₆₀(1.04)	=	0.0070532204063837
log ₂₆₀(1.05)	=	0.0087741337136257
log ₂₆₀(1.06)	=	0.010478734800959
log ₂₆₀(1.07)	=	0.012167330007969
log ₂₆₀(1.08)	=	0.013840217124977
log ₂₆₀(1.09)	=	0.015497685708238
log ₂₆₀(1.1)	=	0.017140017380732
log ₂₆₀(1.11)	=	0.018767486119356
log ₂₆₀(1.12)	=	0.020380358529231
log ₂₆₀(1.13)	=	0.021978894105817
log ₂₆₀(1.14)	=	0.023563345485484
log ₂₆₀(1.15)	=	0.02513395868514
log ₂₆₀(1.16)	=	0.026690973331478
log ₂₆₀(1.17)	=	0.028234622880395
log ₂₆₀(1.18)	=	0.029765134827067
log ₂₆₀(1.19)	=	0.031282730907159
log ₂₆₀(1.2)	=	0.032787627289617
log ₂₆₀(1.21)	=	0.034280034761465
log ₂₆₀(1.22)	=	0.035760158904988
log ₂₆₀(1.23)	=	0.037228200267693
log ₂₆₀(1.24)	=	0.038684354525375
log ₂₆₀(1.25)	=	0.040128812638651
log ₂₆₀(1.26)	=	0.041561761003242
log ₂₆₀(1.27)	=	0.042983381594326
log ₂₆₀(1.28)	=	0.044393852105222
log ₂₆₀(1.29)	=	0.045793346080681
log ₂₆₀(1.3)	=	0.047182033045035
log ₂₆₀(1.31)	=	0.048560078625423
log ₂₆₀(1.32)	=	0.049927644670349
log ₂₆₀(1.33)	=	0.051284889363749
log ₂₆₀(1.34)	=	0.052631967334798
log ₂₆₀(1.35)	=	0.053969029763628
log ₂₆₀(1.36)	=	0.05529622448315
log ₂₆₀(1.37)	=	0.056613696077137
log ₂₆₀(1.38)	=	0.057921585974756
log ₂₆₀(1.39)	=	0.059220032541669
log ₂₆₀(1.4)	=	0.060509171167882
log ₂₆₀(1.41)	=	0.06178913435246
log ₂₆₀(1.42)	=	0.063060051785258
log ₂₆₀(1.43)	=	0.064322050425767
log ₂₆₀(1.44)	=	0.065575254579233
log ₂₆₀(1.45)	=	0.066819785970129
log ₂₆₀(1.46)	=	0.068055763813102
log ₂₆₀(1.47)	=	0.069283304881507
log ₂₆₀(1.48)	=	0.070502523573612
log ₂₆₀(1.49)	=	0.071713531976572
log ₂₆₀(1.5)	=	0.072916439928268

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Log 260 (1)