How do you write log 242 1 in exponential form?

In exponential form is 242 0 = 1.

Log242(1) ▷ What is Log Base 242 of 1?

Table of Contents

Log ₂₄₂ (1) is the logarithm of 1 to the base 242:

Calculator

×log

Base 1

Exponent 1

Result: Result

Simply the Best Logarithm Calculator! Click To Tweet As you can see in our log calculator, log242 (1) = 0.

Calculate Log Base 242 of 1

To solve the equation log ₂₄₂ (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 = 242:
log ₂₄₂ (1) = log(1) / log(242)
Evaluate the term:
log(1) / log(242)
= 1.39794000867204 / 1.92427928606188
= 0
= Logarithm of 1 with base 242

Here’s the logarithm of 242 to the base 1.

Additional Information

From the definition of logarithm b ^y = x ⇔ y = log _b(x) follows that 242 ⁰ = 1
242 ⁰ = 1 is the exponential form of log242 (1)
242 is the logarithm base of log242 (1)
1 is the argument of log242 (1)
0 is the exponent or power of 242 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 log242 1?

Log242 (1) = 0.

How do you find the value of log ₂₄₂1?

Carry out the change of base logarithm operation.

What does log ₂₄₂ 1 mean?

It means the logarithm of 1 with base 242.

How do you solve log base 242 1?

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

What is the log base 242 of 1?

The value is 0.

How do you write log ₂₄₂ 1 in exponential form?

In exponential form is 242 ⁰ = 1.

What is log242 (1) equal to?

log base 242 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 242 of 1 = 0.

You now know everything about the logarithm with base 242, 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 Log242 (1).

Table

Our quick conversion table is easy to use:

log ₂₄₂(x)		Value
log ₂₄₂(0.5)	=	-0.1262807514206
log ₂₄₂(0.51)	=	-0.12267301741374
log ₂₄₂(0.52)	=	-0.11913534094047
log ₂₄₂(0.53)	=	-0.11566505289549
log ₂₄₂(0.54)	=	-0.11225963386093
log ₂₄₂(0.55)	=	-0.10891670311848
log ₂₄₂(0.56)	=	-0.1056340086516
log ₂₄₂(0.57)	=	-0.10240941803272
log ₂₄₂(0.58)	=	-0.099240910102853
log ₂₄₂(0.59)	=	-0.096126567362573
log ₂₄₂(0.6)	=	-0.093064569002437
log ₂₄₂(0.61)	=	-0.090053184509507
log ₂₄₂(0.62)	=	-0.087090767793738
log ₂₄₂(0.63)	=	-0.084175751784321
log ₂₄₂(0.64)	=	-0.081306643451557
log ₂₄₂(0.65)	=	-0.078482019214688
log ₂₄₂(0.66)	=	-0.075700520700315
log ₂₄₂(0.67)	=	-0.07296085081977
log ₂₄₂(0.68)	=	-0.070261770137083
log ₂₄₂(0.69)	=	-0.067602093502097
log ₂₄₂(0.7)	=	-0.064980686925824
log ₂₄₂(0.71)	=	-0.062396464677435
log ₂₄₂(0.72)	=	-0.059848386584275
log ₂₄₂(0.73)	=	-0.057335455518104
log ₂₄₂(0.74)	=	-0.054856715052359
log ₂₄₂(0.75)	=	-0.052411247276659
log ₂₄₂(0.76)	=	-0.04999817075606
log ₂₄₂(0.77)	=	-0.047616638623702
log ₂₄₂(0.78)	=	-0.045265836796525
log ₂₄₂(0.79)	=	-0.04294498230464
log ₂₄₂(0.8)	=	-0.040653321725778
log ₂₄₂(0.81)	=	-0.038390129716993
log ₂₄₂(0.82)	=	-0.036154707636443
log ₂₄₂(0.83)	=	-0.033946382248712
log ₂₄₂(0.84)	=	-0.031764504507662
log ₂₄₂(0.85)	=	-0.029608448411305
log ₂₄₂(0.86)	=	-0.027477609923658
log ₂₄₂(0.87)	=	-0.025371405958912
log ₂₄₂(0.88)	=	-0.023289273423656
log ₂₄₂(0.89)	=	-0.02123066831322
log ₂₄₂(0.9)	=	-0.019195064858497
log ₂₄₂(0.91)	=	-0.017181954719912
log ₂₄₂(0.92)	=	-0.015190846225438
log ₂₄₂(0.93)	=	-0.013221263649797
log ₂₄₂(0.94)	=	-0.011272746532217
log ₂₄₂(0.95)	=	-0.0093448490302814
log ₂₄₂(0.96)	=	-0.0074371393076157
log ₂₄₂(0.97)	=	-0.0055491989532983
log ₂₄₂(0.98)	=	-0.0036806224310482
log ₂₄₂(0.99)	=	-0.0018310165563744
log ₂₄₂(1)	=	8.0906221204483E-17
log ₂₄₂(1.01)	=	0.0018127971840073
log ₂₄₂(1.02)	=	0.0036077340068578
log ₂₄₂(1.03)	=	0.0053851589717783
log ₂₄₂(1.04)	=	0.0071454104801338
log ₂₄₂(1.05)	=	0.0088888172181168
log ₂₄₂(1.06)	=	0.010615698525109
log ₂₄₂(1.07)	=	0.012326364744748
log ₂₄₂(1.08)	=	0.014021117559666
log ₂₄₂(1.09)	=	0.0157002503108
log ₂₄₂(1.1)	=	0.017364048302122
log ₂₄₂(1.11)	=	0.019012789091582
log ₂₄₂(1.12)	=	0.020646742768998
log ₂₄₂(1.13)	=	0.022266172221601
log ₂₄₂(1.14)	=	0.023871333387881
log ₂₄₂(1.15)	=	0.02546247550034
log ₂₄₂(1.16)	=	0.027039841317747
log ₂₄₂(1.17)	=	0.028603667347416
log ₂₄₂(1.18)	=	0.030154184058026
log ₂₄₂(1.19)	=	0.031691616083471
log ₂₄₂(1.2)	=	0.033216182418163
log ₂₄₂(1.21)	=	0.034728096604244
log ₂₄₂(1.22)	=	0.036227566911093
log ₂₄₂(1.23)	=	0.037714796507498
log ₂₄₂(1.24)	=	0.039189983626862
log ₂₄₂(1.25)	=	0.040653321725778
log ₂₄₂(1.26)	=	0.042104999636279
log ₂₄₂(1.27)	=	0.043545201712073
log ₂₄₂(1.28)	=	0.044974107969043
log ₂₄₂(1.29)	=	0.046391894220283
log ₂₄₂(1.3)	=	0.047798732205912
log ₂₄₂(1.31)	=	0.049194789717924
log ₂₄₂(1.32)	=	0.050580230720285
log ₂₄₂(1.33)	=	0.051955215464494
log ₂₄₂(1.34)	=	0.05331990060083
log ₂₄₂(1.35)	=	0.054674439285444
log ₂₄₂(1.36)	=	0.056018981283517
log ₂₄₂(1.37)	=	0.057353673068625
log ₂₄₂(1.38)	=	0.058678657918503
log ₂₄₂(1.39)	=	0.05999407600734
log ₂₄₂(1.4)	=	0.061300064494776
log ₂₄₂(1.41)	=	0.062596757611724
log ₂₄₂(1.42)	=	0.063884286743165
log ₂₄₂(1.43)	=	0.065162780508034
log ₂₄₂(1.44)	=	0.066432364836325
log ₂₄₂(1.45)	=	0.067693163043526
log ₂₄₂(1.46)	=	0.068945295902496
log ₂₄₂(1.47)	=	0.070188881712893
log ₂₄₂(1.48)	=	0.071424036368241
log ₂₄₂(1.49)	=	0.072650873420746
log ₂₄₂(1.5)	=	0.073869504143941

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Log 242 (1)