How do you write log 213 1 in exponential form?

In exponential form is 213 0 = 1.

Log213(1) ▷ What is Log Base 213 of 1?

Table of Contents

Log ₂₁₃ (1) is the logarithm of 1 to the base 213:

Calculator

×log

Base 1

Exponent 1

Result: Result

Simply the Best Logarithm Calculator! Click To Tweet As you can see in our log calculator, log213 (1) = 0.

Calculate Log Base 213 of 1

To solve the equation log ₂₁₃ (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 = 213:
log ₂₁₃ (1) = log(1) / log(213)
Evaluate the term:
log(1) / log(213)
= 1.39794000867204 / 1.92427928606188
= 0
= Logarithm of 1 with base 213

Here’s the logarithm of 213 to the base 1.

Additional Information

From the definition of logarithm b ^y = x ⇔ y = log _b(x) follows that 213 ⁰ = 1
213 ⁰ = 1 is the exponential form of log213 (1)
213 is the logarithm base of log213 (1)
1 is the argument of log213 (1)
0 is the exponent or power of 213 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 log213 1?

Log213 (1) = 0.

How do you find the value of log ₂₁₃1?

Carry out the change of base logarithm operation.

What does log ₂₁₃ 1 mean?

It means the logarithm of 1 with base 213.

How do you solve log base 213 1?

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

What is the log base 213 of 1?

The value is 0.

How do you write log ₂₁₃ 1 in exponential form?

In exponential form is 213 ⁰ = 1.

What is log213 (1) equal to?

log base 213 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 213 of 1 = 0.

You now know everything about the logarithm with base 213, 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 Log213 (1).

Table

Our quick conversion table is easy to use:

log ₂₁₃(x)		Value
log ₂₁₃(0.5)	=	-0.12928733580186
log ₂₁₃(0.51)	=	-0.12559370622822
log ₂₁₃(0.52)	=	-0.1219718021691
log ₂₁₃(0.53)	=	-0.11841889097121
log ₂₁₃(0.54)	=	-0.11493239323253
log ₂₁₃(0.55)	=	-0.11150987155286
log ₂₁₃(0.56)	=	-0.10814902029802
log ₂₁₃(0.57)	=	-0.10484765627004
log ₂₁₃(0.58)	=	-0.1016037101887
log ₂₁₃(0.59)	=	-0.098415218901347
log ₂₁₃(0.6)	=	-0.095280318247382
log ₂₁₃(0.61)	=	-0.092197236512548
log ₂₁₃(0.62)	=	-0.089164288415486
log ₂₁₃(0.63)	=	-0.08617986957542
log ₂₁₃(0.64)	=	-0.08324245141551
log ₂₁₃(0.65)	=	-0.080350576461347
log ₂₁₃(0.66)	=	-0.077502853998386
log ₂₁₃(0.67)	=	-0.074697956055923
log ₂₁₃(0.68)	=	-0.071934613688592
log ₂₁₃(0.69)	=	-0.069211613529316
log ₂₁₃(0.7)	=	-0.066527794590268
log ₂₁₃(0.71)	=	-0.063882045290747
log ₂₁₃(0.72)	=	-0.061273300692906
log ₂₁₃(0.73)	=	-0.058700539928149
log ₂₁₃(0.74)	=	-0.05616278379861
log ₂₁₃(0.75)	=	-0.053659092539627
log ₂₁₃(0.76)	=	-0.051188563730409
log ₂₁₃(0.77)	=	-0.048750330341272
log ₂₁₃(0.78)	=	-0.046343558906871
log ₂₁₃(0.79)	=	-0.043967447815797
log ₂₁₃(0.8)	=	-0.041621225707755
log ₂₁₃(0.81)	=	-0.039304149970303
log ₂₁₃(0.82)	=	-0.037015505327824
log ₂₁₃(0.83)	=	-0.034754602516022
log ₂₁₃(0.84)	=	-0.032520777035793
log ₂₁₃(0.85)	=	-0.030313387980838
log ₂₁₃(0.86)	=	-0.028131816933843
log ₂₁₃(0.87)	=	-0.025975466926466
log ₂₁₃(0.88)	=	-0.023843761458758
log ₂₁₃(0.89)	=	-0.021736143573987
log ₂₁₃(0.9)	=	-0.019652074985151
log ₂₁₃(0.91)	=	-0.017591035249757
log ₂₁₃(0.92)	=	-0.015552520989689
log ₂₁₃(0.93)	=	-0.013536045153255
log ₂₁₃(0.94)	=	-0.011541136316696
log ₂₁₃(0.95)	=	-0.0095673380226542
log ₂₁₃(0.96)	=	-0.0076142081532788
log ₂₁₃(0.97)	=	-0.0056813183358153
log ₂₁₃(0.98)	=	-0.0037682533786789
log ₂₁₃(0.99)	=	-0.0018746107361547
log ₂₁₃(1)	=	8.2832495623058E-17
log ₂₁₃(1.01)	=	0.0018559575836606
log ₂₁₃(1.02)	=	0.0036936295736384
log ₂₁₃(1.03)	=	0.0055133727705797
log ₂₁₃(1.04)	=	0.0073155336327566
log ₂₁₃(1.05)	=	0.0091004486719623
log ₂₁₃(1.06)	=	0.010868444830644
log ₂₁₃(1.07)	=	0.012619839841327
log ₂₁₃(1.08)	=	0.014354942569325
log ₂₁₃(1.09)	=	0.016074053339648
log ₂₁₃(1.1)	=	0.017777464248997
log ₂₁₃(1.11)	=	0.019465459463621
log ₂₁₃(1.12)	=	0.021138315503835
log ₂₁₃(1.13)	=	0.022796301515882
log ₂₁₃(1.14)	=	0.024439679531822
log ₂₁₃(1.15)	=	0.026068704718066
log ₂₁₃(1.16)	=	0.027683625613161
log ₂₁₃(1.17)	=	0.02928468435536
log ₂₁₃(1.18)	=	0.030872116900511
log ₂₁₃(1.19)	=	0.032446153230752
log ₂₁₃(1.2)	=	0.034007017554476
log ₂₁₃(1.21)	=	0.035554928497993
log ₂₁₃(1.22)	=	0.037090099289311
log ₂₁₃(1.23)	=	0.038612737934407
log ₂₁₃(1.24)	=	0.040123047386372
log ₂₁₃(1.25)	=	0.041621225707755
log ₂₁₃(1.26)	=	0.043107466226438
log ₂₁₃(1.27)	=	0.044581957685358
log ₂₁₃(1.28)	=	0.046044884386348
log ₂₁₃(1.29)	=	0.047496426328388
log ₂₁₃(1.3)	=	0.048936759340511
log ₂₁₃(1.31)	=	0.050366055209627
log ₂₁₃(1.32)	=	0.051784481803473
log ₂₁₃(1.33)	=	0.053192203188935
log ₂₁₃(1.34)	=	0.054589379745935
log ₂₁₃(1.35)	=	0.055976168277079
log ₂₁₃(1.36)	=	0.057352722113266
log ₂₁₃(1.37)	=	0.058719191215422
log ₂₁₃(1.38)	=	0.060075722272542
log ₂₁₃(1.39)	=	0.061422458796186
log ₂₁₃(1.4)	=	0.06275954121159
log ₂₁₃(1.41)	=	0.064087106945535
log ₂₁₃(1.42)	=	0.065405290511111
log ₂₁₃(1.43)	=	0.066714223589508
log ₂₁₃(1.44)	=	0.068014035108952
log ₂₁₃(1.45)	=	0.069304851320916
log ₂₁₃(1.46)	=	0.070586795873709
log ₂₁₃(1.47)	=	0.071859989883552
log ₂₁₃(1.48)	=	0.073124552003248
log ₂₁₃(1.49)	=	0.074380598488536
log ₂₁₃(1.5)	=	0.075628243262231

Base 2 Logarithm Quiz

Take our free base 2 logarithm quiz practice to test your knowledge of the binary logarithm.

Take Base 2 Logarithm Quiz Now!

Log 213 (1)