Answer
Verified
399.9k+ views
Hint:Use logarithm property ${x^n} = y$ to get the answer
To solve this type of problem, we will have to use special logarithmic properties otherwise we won't be able to solve them. This is because operations in log are not done like the conventional way. So, in order to solve this question, we will use the property ${\log _x}y = n \to {x^n} = y$to solve. Doing this we will get ${3^4} = x$ which will in the end give $x = 81$as the answer.
Complete step by step solution:
The given question we have is ${\log _3}x = 4$
To solve this problem, we will use a special property of logarithm, which states that:-
If there exists a log with base x and argument y. And if the value of that log y base x is equal to another number which may be a constant or variable lets say “n”. Then this particular equation can be written as x raised to the power n equals to y. If we represent it mathematically, it will look like:-
$
{\log _x}y = n \\
\to {x^n} = y \\
$
Both the steps are the same and you can use any one of it anytime.
So therefore, when we use this step on our given equation, we will get:-
$
{\log _3}x = 4 \\
\to {3^4} = x \\
$
Now, we know that.
${3^4} = 3 \times 3 \times 3 \times 3$
Which equals to 81
Therefore, $x = 81$
And this is our solution for the question.
Note: Please remember the base of the log is always the base of the number which is raised to the power. The argument of the log is the value which is equal to the raised value of the base. So, in any case, don’t confuse yourself by exchanging the positions of base and argument. In that case you will get a wrong answer.
To solve this type of problem, we will have to use special logarithmic properties otherwise we won't be able to solve them. This is because operations in log are not done like the conventional way. So, in order to solve this question, we will use the property ${\log _x}y = n \to {x^n} = y$to solve. Doing this we will get ${3^4} = x$ which will in the end give $x = 81$as the answer.
Complete step by step solution:
The given question we have is ${\log _3}x = 4$
To solve this problem, we will use a special property of logarithm, which states that:-
If there exists a log with base x and argument y. And if the value of that log y base x is equal to another number which may be a constant or variable lets say “n”. Then this particular equation can be written as x raised to the power n equals to y. If we represent it mathematically, it will look like:-
$
{\log _x}y = n \\
\to {x^n} = y \\
$
Both the steps are the same and you can use any one of it anytime.
So therefore, when we use this step on our given equation, we will get:-
$
{\log _3}x = 4 \\
\to {3^4} = x \\
$
Now, we know that.
${3^4} = 3 \times 3 \times 3 \times 3$
Which equals to 81
Therefore, $x = 81$
And this is our solution for the question.
Note: Please remember the base of the log is always the base of the number which is raised to the power. The argument of the log is the value which is equal to the raised value of the base. So, in any case, don’t confuse yourself by exchanging the positions of base and argument. In that case you will get a wrong answer.
Recently Updated Pages
How many sigma and pi bonds are present in HCequiv class 11 chemistry CBSE
Mark and label the given geoinformation on the outline class 11 social science CBSE
When people say No pun intended what does that mea class 8 english CBSE
Name the states which share their boundary with Indias class 9 social science CBSE
Give an account of the Northern Plains of India class 9 social science CBSE
Change the following sentences into negative and interrogative class 10 english CBSE
Trending doubts
Difference between Prokaryotic cell and Eukaryotic class 11 biology CBSE
Fill the blanks with the suitable prepositions 1 The class 9 english CBSE
Differentiate between homogeneous and heterogeneous class 12 chemistry CBSE
Which are the Top 10 Largest Countries of the World?
Difference Between Plant Cell and Animal Cell
The Equation xxx + 2 is Satisfied when x is Equal to Class 10 Maths
Give 10 examples for herbs , shrubs , climbers , creepers
Change the following sentences into negative and interrogative class 10 english CBSE
Write a letter to the principal requesting him to grant class 10 english CBSE