How do you write log 32 1 in exponential form?

In exponential form is 32 0 = 1.

Log32(1) ▷ What is Log Base 32 of 1?

Table of Contents

Log ₃₂ (1) is the logarithm of 1 to the base 32:

Calculator

×log

Base 1

Exponent 1

Result: Result

Simply the Best Logarithm Calculator! Click To Tweet As you can see in our log calculator, log32 (1) = 0.

Calculate Log Base 32 of 1

To solve the equation log ₃₂ (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 = 32:
log ₃₂ (1) = log(1) / log(32)
Evaluate the term:
log(1) / log(32)
= 1.39794000867204 / 1.92427928606188
= 0
= Logarithm of 1 with base 32

Here’s the logarithm of 32 to the base 1.

Additional Information

From the definition of logarithm b ^y = x ⇔ y = log _b(x) follows that 32 ⁰ = 1
32 ⁰ = 1 is the exponential form of log32 (1)
32 is the logarithm base of log32 (1)
1 is the argument of log32 (1)
0 is the exponent or power of 32 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 log32 1?

Log32 (1) = 0.

How do you find the value of log ₃₂1?

Carry out the change of base logarithm operation.

What does log ₃₂ 1 mean?

It means the logarithm of 1 with base 32.

How do you solve log base 32 1?

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

What is the log base 32 of 1?

The value is 0.

How do you write log ₃₂ 1 in exponential form?

In exponential form is 32 ⁰ = 1.

What is log32 (1) equal to?

log base 32 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 32 of 1 = 0.

You now know everything about the logarithm with base 32, 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 Log32 (1).

Table

Our quick conversion table is easy to use:

log ₃₂(x)		Value
log ₃₂(0.5)	=	-0.2
log ₃₂(0.51)	=	-0.19428616956065
log ₃₂(0.52)	=	-0.18868329432673
log ₃₂(0.53)	=	-0.18318714704231
log ₃₂(0.54)	=	-0.17779373752225
log ₃₂(0.55)	=	-0.17249929525001
log ₃₂(0.56)	=	-0.16730025354342
log ₃₂(0.57)	=	-0.162193235122
log ₃₂(0.58)	=	-0.15717503892943
log ₃₂(0.59)	=	-0.15224262808258
log ₃₂(0.6)	=	-0.14739311883324
log ₃₂(0.61)	=	-0.14262377044237
log ₃₂(0.62)	=	-0.13793197587757
log ₃₂(0.63)	=	-0.13331525325496
log ₃₂(0.64)	=	-0.12877123795494
log ₃₂(0.65)	=	-0.12429767534925
log ₃₂(0.66)	=	-0.11989241408325
log ₃₂(0.67)	=	-0.11555339986339
log ₃₂(0.68)	=	-0.11127866970488
log ₃₂(0.69)	=	-0.10706634659931
log ₃₂(0.7)	=	-0.10291463456595
log ₃₂(0.71)	=	-0.098821814054008
log ₃₂(0.72)	=	-0.094786237666482
log ₃₂(0.73)	=	-0.090806326178941
log ₃₂(0.74)	=	-0.086880564829155
log ₃₂(0.75)	=	-0.083007499855769
log ₃₂(0.76)	=	-0.079185735266228
log ₃₂(0.77)	=	-0.075413929815965
log ₃₂(0.78)	=	-0.071690794182495
log ₃₂(0.79)	=	-0.068015088319524
log ₃₂(0.8)	=	-0.064385618977472
log ₃₂(0.81)	=	-0.06080123737802
log ₃₂(0.82)	=	-0.057260837031328
log ₃₂(0.83)	=	-0.05376335168556
log ₃₂(0.84)	=	-0.050307753399193
log ₃₂(0.85)	=	-0.046893050727404
log ₃₂(0.86)	=	-0.043518287014525
log ₃₂(0.87)	=	-0.040182538785199
log ₃₂(0.88)	=	-0.036884914227485
log ₃₂(0.89)	=	-0.033624551761665
log ₃₂(0.9)	=	-0.03040061868901
log ₃₂(0.91)	=	-0.027212309915206
log ₃₂(0.92)	=	-0.024058846743542
log ₃₂(0.93)	=	-0.020939475733339
log ₃₂(0.94)	=	-0.017853467619417
log ₃₂(0.95)	=	-0.014800116288755
log ₃₂(0.96)	=	-0.011778737810714
log ₃₂(0.97)	=	-0.0087886695175193
log ₃₂(0.98)	=	-0.0058292691319032
log ₃₂(0.99)	=	-0.0028999139390229
log ₃₂(1)	=	1.281370601526E-16
log ₃₂(1.01)	=	0.0028710585954141
log ₃₂(1.02)	=	0.0057138304393543
log ₃₂(1.03)	=	0.0085288674816989
log ₃₂(1.04)	=	0.011316705673274
log ₃₂(1.05)	=	0.01407786557828
log ₃₂(1.06)	=	0.016812852957695
log ₃₂(1.07)	=	0.019522159325285
log ₃₂(1.08)	=	0.022206262477749
log ₃₂(1.09)	=	0.02486562700044
log ₃₂(1.1)	=	0.027500704749987
log ₃₂(1.11)	=	0.030111935315076
log ₃₂(1.12)	=	0.032699746456576
log ₃₂(1.13)	=	0.035264554528093
log ₃₂(1.14)	=	0.037806764878004
log ₃₂(1.15)	=	0.04032677223393
log ₃₂(1.16)	=	0.04282496107057
log ₃₂(1.17)	=	0.045301705961736
log ₃₂(1.18)	=	0.047757371917423
log ₃₂(1.19)	=	0.050192314706644
log ₃₂(1.2)	=	0.052606881166759
log ₃₂(1.21)	=	0.055001409499974
log ₃₂(1.22)	=	0.057376229557632
log ₃₂(1.23)	=	0.059731663112903
log ₃₂(1.24)	=	0.06206802412243
log ₃₂(1.25)	=	0.064385618977473
log ₃₂(1.26)	=	0.066684746745039
log ₃₂(1.27)	=	0.068965699399488
log ₃₂(1.28)	=	0.071228762045055
log ₃₂(1.29)	=	0.073474213129706
log ₃₂(1.3)	=	0.075702324650746
log ₃₂(1.31)	=	0.077913362352545
log ₃₂(1.32)	=	0.080107585916746
log ₃₂(1.33)	=	0.082285249145293
log ₃₂(1.34)	=	0.08444660013661
log ₃₂(1.35)	=	0.086591881455221
log ₃₂(1.36)	=	0.088721330295123
log ₃₂(1.37)	=	0.090835178637161
log ₃₂(1.38)	=	0.092933653400689
log ₃₂(1.39)	=	0.095016976589757
log ₃₂(1.4)	=	0.097085365434049
log ₃₂(1.41)	=	0.099139032524814
log ₃₂(1.42)	=	0.10117818594599
log ₃₂(1.43)	=	0.10320302940073
log ₃₂(1.44)	=	0.10521376233352
log ₃₂(1.45)	=	0.10721058004804
log ₃₂(1.46)	=	0.10919367382106
log ₃₂(1.47)	=	0.11116323101233
log ₃₂(1.48)	=	0.11311943517085
log ₃₂(1.49)	=	0.11506246613749
log ₃₂(1.5)	=	0.11699250014423

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Log 32 (1)