Question

log values from 1 to 10​

Answer 1

Log 1 = 0, log 2= 0.3010 log 3=0.4771 log 4= 0.6020 log 5= 0.6989 log 6=0.7781 log 7= 0.8450 log 8= 0.9030 log 9= 0.9542 log 10=1 Answer

Answer 2

Answer:

$log 1 = 0, \\log 2= 0.3010 \\log 3=0.4771 \\log 4= 0.6020 \\log 5= 0.6989 \\log 6=0.7781 \\log 7= 0.8450 \\log 8= 0.9030 \\log 9= 0.9542 \\log 10=1$

Step-by-step explanation:

By changing the operations from multiplication to addition and division to subtraction, og functions can solve a variety of complicated problems quickly and with less complexity. For both common and natural logarithmic functions, we will learn about and assess the value of log 1 in this article.

Functions of the Logarithm

The logarithm can be divided into two categories in general. It is they

• Common Logarithmic Function (represented as log)
• Function of Natural Logarithm (represented as Ln)

The natural logarithmic function is the name given to the log function with base e, whereas the common logarithmic function is given to the log function with base 10.

Additionally defined by, the logarithmic function is

$log_{a} b = x,$ then

$a^{x} =b$

Where x is defined as the logarithm of a number ‘b’ and ‘a’ is the base of the log function that could have any base value, but usually, we consider it as ‘e’ or ‘10’ in terms of the logarithm. The value of the variable ‘a’ can be any positive number but not equal to 1 or negative number.

From the logarithm definition, we have the value of a = 10 and b = 1. Such that,

$log_{10} x = 1$

By the logarithm rule, we can rewrite the above expression as;

$10^{x} =1$

Thus, 10 raised to the power 0 makes the above expression true.

$10^{0} =1$

Therefore,

$log 1 = 0, \\log 2= 0.3010 \\log 3=0.4771 \\log 4= 0.6020 \\log 5= 0.6989 \\log 6=0.7781 \\log 7= 0.8450 \\log 8= 0.9030 \\log 9= 0.9542 \\log 10=1$

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