How do you write log 212 1 in exponential form?

In exponential form is 212 0 = 1.

Log212(1) ▷ What is Log Base 212 of 1?

Table of Contents

Log ₂₁₂ (1) is the logarithm of 1 to the base 212:

Calculator

×log

Base 1

Exponent 1

Result: Result

Simply the Best Logarithm Calculator! Click To Tweet As you can see in our log calculator, log212 (1) = 0.

Calculate Log Base 212 of 1

To solve the equation log ₂₁₂ (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 = 212:
log ₂₁₂ (1) = log(1) / log(212)
Evaluate the term:
log(1) / log(212)
= 1.39794000867204 / 1.92427928606188
= 0
= Logarithm of 1 with base 212

Here’s the logarithm of 212 to the base 1.

Additional Information

From the definition of logarithm b ^y = x ⇔ y = log _b(x) follows that 212 ⁰ = 1
212 ⁰ = 1 is the exponential form of log212 (1)
212 is the logarithm base of log212 (1)
1 is the argument of log212 (1)
0 is the exponent or power of 212 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 log212 1?

Log212 (1) = 0.

How do you find the value of log ₂₁₂1?

Carry out the change of base logarithm operation.

What does log ₂₁₂ 1 mean?

It means the logarithm of 1 with base 212.

How do you solve log base 212 1?

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

What is the log base 212 of 1?

The value is 0.

How do you write log ₂₁₂ 1 in exponential form?

In exponential form is 212 ⁰ = 1.

What is log212 (1) equal to?

log base 212 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 212 of 1 = 0.

You now know everything about the logarithm with base 212, 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 Log212 (1).

Table

Our quick conversion table is easy to use:

log ₂₁₂(x)		Value
log ₂₁₂(0.5)	=	-0.12940091786394
log ₂₁₂(0.51)	=	-0.12570404334708
log ₂₁₂(0.52)	=	-0.12207895735735
log ₂₁₂(0.53)	=	-0.11852292484075
log ₂₁₂(0.54)	=	-0.1150333641292
log ₂₁₂(0.55)	=	-0.11160783568117
log ₂₁₂(0.56)	=	-0.10824403183695
log ₂₁₂(0.57)	=	-0.10493976748054
log ₂₁₂(0.58)	=	-0.10169297151384
log ₂₁₂(0.59)	=	-0.09850167905952
log ₂₁₂(0.6)	=	-0.095364024319251
log ₂₁₂(0.61)	=	-0.092278234022292
log ₂₁₂(0.62)	=	-0.089242621406722
log ₂₁₂(0.63)	=	-0.086255580682279
log ₂₁₂(0.64)	=	-0.083315581929229
log ₂₁₂(0.65)	=	-0.080421166392738
log ₂₁₂(0.66)	=	-0.077570942136484
log ₂₁₂(0.67)	=	-0.074763580023108
log ₂₁₂(0.68)	=	-0.071997809992447
log ₂₁₂(0.69)	=	-0.069272417611448
log ₂₁₂(0.7)	=	-0.066586240872331
log ₂₁₂(0.71)	=	-0.063938167217842
log ₂₁₂(0.72)	=	-0.061327130774562
log ₂₁₂(0.73)	=	-0.058752109777037
log ₂₁₂(0.74)	=	-0.056212124167151
log ₂₁₂(0.75)	=	-0.053706233354637
log ₂₁₂(0.76)	=	-0.051233534125904
log ₂₁₂(0.77)	=	-0.048793158689563
log ₂₁₂(0.78)	=	-0.046384272848049
log ₂₁₂(0.79)	=	-0.044006074285717
log ₂₁₂(0.8)	=	-0.041657790964614
log ₂₁₂(0.81)	=	-0.039338679619896
log ₂₁₂(0.82)	=	-0.037048024347557
log ₂₁₂(0.83)	=	-0.034785135277766
log ₂₁₂(0.84)	=	-0.032549347327642
log ₂₁₂(0.85)	=	-0.030340019027832
log ₂₁₂(0.86)	=	-0.02815653141773
log ₂₁₂(0.87)	=	-0.025998287004541
log ₂₁₂(0.88)	=	-0.023864708781847
log ₂₁₂(0.89)	=	-0.021755239303615
log ₂₁₂(0.9)	=	-0.019669339809948
log ₂₁₂(0.91)	=	-0.017606489401128
log ₂₁₂(0.92)	=	-0.015566184256811
log ₂₁₂(0.93)	=	-0.013547936897419
log ₂₁₂(0.94)	=	-0.011551275485034
log ₂₁₂(0.95)	=	-0.0095757431612899
log ₂₁₂(0.96)	=	-0.0076208974199252
log ₂₁₂(0.97)	=	-0.0056863095118492
log ₂₁₂(0.98)	=	-0.003771563880721
log ₂₁₂(0.99)	=	-0.00187625762718
log ₂₁₂(1)	=	8.2905265980665E-17
log ₂₁₂(1.01)	=	0.0018575880874387
log ₂₁₂(1.02)	=	0.0036968745168569
log ₂₁₂(1.03)	=	0.0055182164023588
log ₂₁₂(1.04)	=	0.0073219605065884
log ₂₁₂(1.05)	=	0.0091084436369729
log ₂₁₂(1.06)	=	0.010877993023186
log ₂₁₂(1.07)	=	0.01263092667689
log ₂₁₂(1.08)	=	0.014367553734741
log ₂₁₂(1.09)	=	0.016088174785597
log ₂₁₂(1.1)	=	0.017793082182768
log ₂₁₂(1.11)	=	0.019482560342152
log ₂₁₂(1.12)	=	0.021156886026995
log ₂₁₂(1.13)	=	0.022816328619991
log ₂₁₂(1.14)	=	0.024461150383399
log ₂₁₂(1.15)	=	0.026091606707803
log ₂₁₂(1.16)	=	0.027707946350096
log ₂₁₂(1.17)	=	0.029310411661255
log ₂₁₂(1.18)	=	0.030899238804421
log ₂₁₂(1.19)	=	0.032474657963777
log ₂₁₂(1.2)	=	0.034036893544689
log ₂₁₂(1.21)	=	0.035586164365536
log ₂₁₂(1.22)	=	0.037122683841649
log ₂₁₂(1.23)	=	0.038646660161747
log ₂₁₂(1.24)	=	0.040158296457218
log ₂₁₂(1.25)	=	0.041657790964615
log ₂₁₂(1.26)	=	0.043145337181662
log ₂₁₂(1.27)	=	0.044621124017112
log ₂₁₂(1.28)	=	0.046085335934712
log ₂₁₂(1.29)	=	0.047538153091574
log ₂₁₂(1.3)	=	0.048979751471203
log ₂₁₂(1.31)	=	0.050410303011426
log ₂₁₂(1.32)	=	0.051829975727457
log ₂₁₂(1.33)	=	0.05323893383032
log ₂₁₂(1.34)	=	0.054637337840832
log ₂₁₂(1.35)	=	0.056025344699356
log ₂₁₂(1.36)	=	0.057403107871494
log ₂₁₂(1.37)	=	0.058770777449918
log ₂₁₂(1.38)	=	0.060128500252492
log ₂₁₂(1.39)	=	0.061476419916855
log ₂₁₂(1.4)	=	0.06281467699161
log ₂₁₂(1.41)	=	0.06414340902427
log ₂₁₂(1.42)	=	0.065462750646099
log ₂₁₂(1.43)	=	0.066772833653971
log ₂₁₂(1.44)	=	0.068073787089379
log ₂₁₂(1.45)	=	0.069365737314711
log ₂₁₂(1.46)	=	0.070648808086904
log ₂₁₂(1.47)	=	0.071923120628583
log ₂₁₂(1.48)	=	0.07318879369679
log ₂₁₂(1.49)	=	0.074445943649397
log ₂₁₂(1.5)	=	0.075694684509304

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Log 212 (1)