How do you write ${5^x} = 25$ in log form?
Answer
Verified
440.1k+ views
Hint:The functions in which one term is raised to the power of another term are called exponential functions, in the given question, on the left-hand side, x is raised to the power of a thus it is an exponential function. The inverse of the exponential function is called logarithm function. A logarithm function is of the form ${\log _a}b$ where “a” is the base and b is the term whose logarithm we are finding, the answer to ${\log _a}b$ can be defined as the power to which a should be raised to get b as the answer. So, to convert an exponential function into a logarithm function, we first identify the base and move it to the other side of the equal sign and add the term “log”. This way we can find out the correct answer.
Complete step by step answer:
In ${a^x} = y$ , the base of the logarithm function will be “a”, moving the base to the other side of the equal to sign and writing the word “log”, we get:
${a^x} = y$
$ \Rightarrow x = {\log _a}y$
Hence, ${a^x} = y$ can be written in the log form as $x = {\log _a}y$.
Note:
The logarithm functions whose base is equal to “e” are called the natural logarithm functions and are denoted as $\ln \left( a \right)$ , they can be written in log form as ${\log _e}\left( a \right)$. e is an irrational and transcendental mathematical constant. Certain rules are obeyed by the logarithm functions. One of these laws tells us how to convert logarithm functions to exponential functions. In the given question, we had to convert the exponential function into the logarithm function, so we used the inverse of this law.
Complete step by step answer:
In ${a^x} = y$ , the base of the logarithm function will be “a”, moving the base to the other side of the equal to sign and writing the word “log”, we get:
${a^x} = y$
$ \Rightarrow x = {\log _a}y$
Hence, ${a^x} = y$ can be written in the log form as $x = {\log _a}y$.
Note:
The logarithm functions whose base is equal to “e” are called the natural logarithm functions and are denoted as $\ln \left( a \right)$ , they can be written in log form as ${\log _e}\left( a \right)$. e is an irrational and transcendental mathematical constant. Certain rules are obeyed by the logarithm functions. One of these laws tells us how to convert logarithm functions to exponential functions. In the given question, we had to convert the exponential function into the logarithm function, so we used the inverse of this law.
Recently Updated Pages
The correct geometry and hybridization for XeF4 are class 11 chemistry CBSE
Water softening by Clarks process uses ACalcium bicarbonate class 11 chemistry CBSE
With reference to graphite and diamond which of the class 11 chemistry CBSE
A certain household has consumed 250 units of energy class 11 physics CBSE
The lightest metal known is A beryllium B lithium C class 11 chemistry CBSE
What is the formula mass of the iodine molecule class 11 chemistry CBSE
Trending doubts
The reservoir of dam is called Govind Sagar A Jayakwadi class 11 social science CBSE
What problem did Carter face when he reached the mummy class 11 english CBSE
Proton was discovered by A Thomson B Rutherford C Chadwick class 11 chemistry CBSE
In China rose the flowers are A Zygomorphic epigynous class 11 biology CBSE
What is Environment class 11 chemistry CBSE
Nucleolus is present in which part of the cell class 11 biology CBSE