Log220(9) ▷ What is Log Base 220 of 9?

Q: How do you write log 220 9 in exponential form?

In exponential form is 220 0.40737417599815 = 9.

Table of Contents

Log ₂₂₀ (9) is the logarithm of 9 to the base 220:

Calculator

×log

Base 1

Exponent 1

Result: Result

Simply the Best Logarithm Calculator! Click To Tweet As you can see in our log calculator, log220 (9) = 0.40737417599815.

Calculate Log Base 220 of 9

To solve the equation log ₂₂₀ (9) = 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 = 9, a = 220:
log ₂₂₀ (9) = log(9) / log(220)
Evaluate the term:
log(9) / log(220)
= 1.39794000867204 / 1.92427928606188
= 0.40737417599815
= Logarithm of 9 with base 220

Here’s the logarithm of 220 to the base 9.

Additional Information

From the definition of logarithm b ^y = x ⇔ y = log _b(x) follows that 220 ^{0.40737417599815} = 9
220 ^{0.40737417599815} = 9 is the exponential form of log220 (9)
220 is the logarithm base of log220 (9)
9 is the argument of log220 (9)
0.40737417599815 is the exponent or power of 220 ^{0.40737417599815} = 9

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

Frequently searched terms on our site include:

FAQs

What is the value of log220 9?

Log220 (9) = 0.40737417599815.

How do you find the value of log ₂₂₀9?

Carry out the change of base logarithm operation.

What does log ₂₂₀ 9 mean?

It means the logarithm of 9 with base 220.

How do you solve log base 220 9?

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

What is the log base 220 of 9?

The value is 0.40737417599815.

How do you write log ₂₂₀ 9 in exponential form?

In exponential form is 220 ^{0.40737417599815} = 9.

What is log220 (9) equal to?

log base 220 of 9 = 0.40737417599815.

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 220 of 9 = 0.40737417599815.

You now know everything about the logarithm with base 220, argument 9 and exponent 0.40737417599815.
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 Log220 (9).

Table

Our quick conversion table is easy to use:

log ₂₂₀(x)		Value
log ₂₂₀(8.5)	=	0.39677677872725
log ₂₂₀(8.51)	=	0.39699477284696
log ₂₂₀(8.52)	=	0.39721251095473
log ₂₂₀(8.53)	=	0.39742999365117
log ₂₂₀(8.54)	=	0.39764722153478
log ₂₂₀(8.55)	=	0.39786419520197
log ₂₂₀(8.56)	=	0.39808091524705
log ₂₂₀(8.57)	=	0.39829738226225
log ₂₂₀(8.58)	=	0.39851359683772
log ₂₂₀(8.59)	=	0.39872955956156
log ₂₂₀(8.6)	=	0.39894527101981
log ₂₂₀(8.61)	=	0.39916073179648
log ₂₂₀(8.62)	=	0.39937594247352
log ₂₂₀(8.63)	=	0.39959090363088
log ₂₂₀(8.64)	=	0.39980561584648
log ₂₂₀(8.65)	=	0.40002007969625
log ₂₂₀(8.66)	=	0.40023429575412
log ₂₂₀(8.67)	=	0.40044826459201
log ₂₂₀(8.68)	=	0.40066198677989
log ₂₂₀(8.69)	=	0.40087546288574
log ₂₂₀(8.7)	=	0.40108869347561
log ₂₂₀(8.71)	=	0.40130167911357
log ₂₂₀(8.72)	=	0.40151442036176
log ₂₂₀(8.73)	=	0.40172691778038
log ₂₂₀(8.74)	=	0.40193917192773
log ₂₂₀(8.75)	=	0.40215118336015
log ₂₂₀(8.76)	=	0.40236295263212
log ₂₂₀(8.77)	=	0.4025744802962
log ₂₂₀(8.78)	=	0.40278576690306
log ₂₂₀(8.79)	=	0.4029968130015
log ₂₂₀(8.8)	=	0.40320761913842
log ₂₂₀(8.81)	=	0.40341818585891
log ₂₂₀(8.82)	=	0.40362851370614
log ₂₂₀(8.83)	=	0.40383860322149
log ₂₂₀(8.84)	=	0.40404845494446
log ₂₂₀(8.85)	=	0.40425806941275
log ₂₂₀(8.86)	=	0.40446744716222
log ₂₂₀(8.87)	=	0.40467658872693
log ₂₂₀(8.88)	=	0.40488549463912
log ₂₂₀(8.89)	=	0.40509416542925
log ₂₂₀(8.9)	=	0.40530260162597
log ₂₂₀(8.91)	=	0.40551080375616
log ₂₂₀(8.92)	=	0.40571877234494
log ₂₂₀(8.93)	=	0.40592650791564
log ₂₂₀(8.94)	=	0.40613401098985
log ₂₂₀(8.95)	=	0.4063412820874
log ₂₂₀(8.96)	=	0.4065483217264
log ₂₂₀(8.97)	=	0.4067551304232
log ₂₂₀(8.98)	=	0.40696170869243
log ₂₂₀(8.99)	=	0.40716805704701
log ₂₂₀(9)	=	0.40737417599815
log ₂₂₀(9.01)	=	0.40758006605535
log ₂₂₀(9.02)	=	0.40778572772641
log ₂₂₀(9.03)	=	0.40799116151746
log ₂₂₀(9.04)	=	0.40819636793294
log ₂₂₀(9.05)	=	0.4084013474756
log ₂₂₀(9.06)	=	0.40860610064656
log ₂₂₀(9.07)	=	0.40881062794524
log ₂₂₀(9.08)	=	0.40901492986944
log ₂₂₀(9.09)	=	0.40921900691531
log ₂₂₀(9.1)	=	0.40942285957736
log ₂₂₀(9.11)	=	0.40962648834846
log ₂₂₀(9.12)	=	0.40982989371989
log ₂₂₀(9.13)	=	0.41003307618127
log ₂₂₀(9.14)	=	0.41023603622064
log ₂₂₀(9.15)	=	0.41043877432445
log ₂₂₀(9.16)	=	0.41064129097752
log ₂₂₀(9.17)	=	0.41084358666311
log ₂₂₀(9.18)	=	0.4110456618629
log ₂₂₀(9.19)	=	0.41124751705699
log ₂₂₀(9.2)	=	0.4114491527239
log ₂₂₀(9.21)	=	0.41165056934062
log ₂₂₀(9.22)	=	0.41185176738256
log ₂₂₀(9.23)	=	0.4120527473236
log ₂₂₀(9.24)	=	0.41225350963608
log ₂₂₀(9.25)	=	0.41245405479079
log ₂₂₀(9.26)	=	0.41265438325702
log ₂₂₀(9.27)	=	0.41285449550251
log ₂₂₀(9.28)	=	0.41305439199353
log ₂₂₀(9.29)	=	0.41325407319479
log ₂₂₀(9.3)	=	0.41345353956955
log ₂₂₀(9.31)	=	0.41365279157954
log ₂₂₀(9.32)	=	0.41385182968503
log ₂₂₀(9.33)	=	0.41405065434478
log ₂₂₀(9.34)	=	0.41424926601611
log ₂₂₀(9.35)	=	0.41444766515485
log ₂₂₀(9.36)	=	0.41464585221536
log ₂₂₀(9.37)	=	0.41484382765056
log ₂₂₀(9.38)	=	0.41504159191193
log ₂₂₀(9.39)	=	0.41523914544949
log ₂₂₀(9.4)	=	0.41543648871182
log ₂₂₀(9.41)	=	0.41563362214608
log ₂₂₀(9.42)	=	0.415830546198
log ₂₂₀(9.43)	=	0.41602726131189
log ₂₂₀(9.44)	=	0.41622376793066
log ₂₂₀(9.45)	=	0.4164200664958
log ₂₂₀(9.46)	=	0.4166161574474
log ₂₂₀(9.47)	=	0.41681204122416
log ₂₂₀(9.48)	=	0.41700771826338
log ₂₂₀(9.49)	=	0.417203189001
log ₂₂₀(9.5)	=	0.41739845387155
log ₂₂₀(9.51)	=	0.41759351330822

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Log 220 (9)