How do you write log 320 320 in exponential form?

In exponential form is 320 1 = 320.

Log320(320) ▷ What is Log Base 320 of 320?

Table of Contents

Log ₃₂₀ (320) is the logarithm of 320 to the base 320:

Calculator

×log

Base 1

Exponent 1

Result: Result

Simply the Best Logarithm Calculator! Click To Tweet As you can see in our log calculator, log320 (320) = 1.

Calculate Log Base 320 of 320

To solve the equation log ₃₂₀ (320) = 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 = 320, a = 320:
log ₃₂₀ (320) = log(320) / log(320)
Evaluate the term:
log(320) / log(320)
= 1.39794000867204 / 1.92427928606188
= 1
= Logarithm of 320 with base 320

Here’s the logarithm of 320 to the base 320.

Additional Information

From the definition of logarithm b ^y = x ⇔ y = log _b(x) follows that 320 ¹ = 320
320 ¹ = 320 is the exponential form of log320 (320)
320 is the logarithm base of log320 (320)
320 is the argument of log320 (320)
1 is the exponent or power of 320 ¹ = 320

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

Frequently searched terms on our site include:

FAQs

What is the value of log320 320?

Log320 (320) = 1.

How do you find the value of log ₃₂₀320?

Carry out the change of base logarithm operation.

What does log ₃₂₀ 320 mean?

It means the logarithm of 320 with base 320.

How do you solve log base 320 320?

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

What is the log base 320 of 320?

The value is 1.

How do you write log ₃₂₀ 320 in exponential form?

In exponential form is 320 ¹ = 320.

What is log320 (320) equal to?

log base 320 of 320 = 1.

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 320 of 320 = 1.

You now know everything about the logarithm with base 320, argument 320 and exponent 1.
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 Log320 (320).

Table

Our quick conversion table is easy to use:

log ₃₂₀(x)		Value
log ₃₂₀(319.5)	=	0.99972891210851
log ₃₂₀(319.51)	=	0.9997343380227
log ₃₂₀(319.52)	=	0.99973976376707
log ₃₂₀(319.53)	=	0.99974518934164
log ₃₂₀(319.54)	=	0.99975061474641
log ₃₂₀(319.55)	=	0.99975603998139
log ₃₂₀(319.56)	=	0.9997614650466
log ₃₂₀(319.57)	=	0.99976688994204
log ₃₂₀(319.58)	=	0.99977231466774
log ₃₂₀(319.59)	=	0.99977773922369
log ₃₂₀(319.6)	=	0.9997831636099
log ₃₂₀(319.61)	=	0.9997885878264
log ₃₂₀(319.62)	=	0.99979401187318
log ₃₂₀(319.63)	=	0.99979943575027
log ₃₂₀(319.64)	=	0.99980485945766
log ₃₂₀(319.65)	=	0.99981028299538
log ₃₂₀(319.66)	=	0.99981570636342
log ₃₂₀(319.67)	=	0.99982112956181
log ₃₂₀(319.68)	=	0.99982655259055
log ₃₂₀(319.69)	=	0.99983197544966
log ₃₂₀(319.7)	=	0.99983739813914
log ₃₂₀(319.71)	=	0.999842820659
log ₃₂₀(319.72)	=	0.99984824300926
log ₃₂₀(319.73)	=	0.99985366518992
log ₃₂₀(319.74)	=	0.999859087201
log ₃₂₀(319.75)	=	0.99986450904251
log ₃₂₀(319.76)	=	0.99986993071446
log ₃₂₀(319.77)	=	0.99987535221685
log ₃₂₀(319.78)	=	0.9998807735497
log ₃₂₀(319.79)	=	0.99988619471303
log ₃₂₀(319.8)	=	0.99989161570683
log ₃₂₀(319.81)	=	0.99989703653112
log ₃₂₀(319.82)	=	0.99990245718591
log ₃₂₀(319.83)	=	0.99990787767122
log ₃₂₀(319.84)	=	0.99991329798705
log ₃₂₀(319.85)	=	0.99991871813341
log ₃₂₀(319.86)	=	0.99992413811032
log ₃₂₀(319.87)	=	0.99992955791777
log ₃₂₀(319.88)	=	0.9999349775558
log ₃₂₀(319.89)	=	0.9999403970244
log ₃₂₀(319.9)	=	0.99994581632358
log ₃₂₀(319.91)	=	0.99995123545337
log ₃₂₀(319.92)	=	0.99995665441376
log ₃₂₀(319.93)	=	0.99996207320476
log ₃₂₀(319.94)	=	0.9999674918264
log ₃₂₀(319.95)	=	0.99997291027867
log ₃₂₀(319.96)	=	0.9999783285616
log ₃₂₀(319.97)	=	0.99998374667518
log ₃₂₀(319.98)	=	0.99998916461944
log ₃₂₀(319.99)	=	0.99999458239437
log ₃₂₀(320)	=	1
log ₃₂₀(320.01)	=	1.0000054174363
log ₃₂₀(320.02)	=	1.0000108347034
log ₃₂₀(320.03)	=	1.0000162518011
log ₃₂₀(320.04)	=	1.0000216687296
log ₃₂₀(320.05)	=	1.0000270854889
log ₃₂₀(320.06)	=	1.0000325020789
log ₃₂₀(320.07)	=	1.0000379184997
log ₃₂₀(320.08)	=	1.0000433347512
log ₃₂₀(320.09)	=	1.0000487508335
log ₃₂₀(320.1)	=	1.0000541667467
log ₃₂₀(320.11)	=	1.0000595824906
log ₃₂₀(320.12)	=	1.0000649980654
log ₃₂₀(320.13)	=	1.0000704134709
log ₃₂₀(320.14)	=	1.0000758287074
log ₃₂₀(320.15)	=	1.0000812437746
log ₃₂₀(320.16)	=	1.0000866586728
log ₃₂₀(320.17)	=	1.0000920734018
log ₃₂₀(320.18)	=	1.0000974879617
log ₃₂₀(320.19)	=	1.0001029023525
log ₃₂₀(320.2)	=	1.0001083165741
log ₃₂₀(320.21)	=	1.0001137306267
log ₃₂₀(320.22)	=	1.0001191445103
log ₃₂₀(320.23)	=	1.0001245582247
log ₃₂₀(320.24)	=	1.0001299717701
log ₃₂₀(320.25)	=	1.0001353851465
log ₃₂₀(320.26)	=	1.0001407983538
log ₃₂₀(320.27)	=	1.0001462113921
log ₃₂₀(320.28)	=	1.0001516242614
log ₃₂₀(320.29)	=	1.0001570369617
log ₃₂₀(320.3)	=	1.000162449493
log ₃₂₀(320.31)	=	1.0001678618553
log ₃₂₀(320.32)	=	1.0001732740487
log ₃₂₀(320.33)	=	1.0001786860731
log ₃₂₀(320.34)	=	1.0001840979285
log ₃₂₀(320.35)	=	1.000189509615
log ₃₂₀(320.36)	=	1.0001949211326
log ₃₂₀(320.37)	=	1.0002003324813
log ₃₂₀(320.38)	=	1.000205743661
log ₃₂₀(320.39)	=	1.0002111546719
log ₃₂₀(320.4)	=	1.0002165655138
log ₃₂₀(320.41)	=	1.0002219761869
log ₃₂₀(320.42)	=	1.0002273866912
log ₃₂₀(320.43)	=	1.0002327970265
log ₃₂₀(320.44)	=	1.0002382071931
log ₃₂₀(320.45)	=	1.0002436171908
log ₃₂₀(320.46)	=	1.0002490270196
log ₃₂₀(320.47)	=	1.0002544366797
log ₃₂₀(320.48)	=	1.000259846171
log ₃₂₀(320.49)	=	1.0002652554935
log ₃₂₀(320.5)	=	1.0002706646471
log ₃₂₀(320.51)	=	1.0002760736321

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Log 320 (320)