Question

How does one solve ${5^3} = {(x + 2)^3}$ ?

Answer 1

In the given question, we have been asked to find the value of ‘x’ and it is given that ${5^3} = {(x + 2)^3}$ . To solve this question, we need to get ‘x’ on one side of the “equals” sign, and all the other numbers on the other side. To solve this equation for a given variable ‘x’, we have to undo the mathematical operations such as addition, subtraction, multiplication, and division that have been done to the variables.

Complete step by step solution:
It is given that ,
${5^3} = {(x + 2)^3}$
We have to solve for $x$ .
Taking cube root both the side ,
$\Rightarrow \sqrt[3]{{{5^3}}} = \sqrt[3]{{{{(x + 2)}^3}}}$
We will get as follow ,
$\Rightarrow 5 = x + 2$
We can write it as ,
$\Rightarrow x + 2 = 5$
Subtract $2$ from both the side of the equation, we will get ,
$\Rightarrow x + 2 - 2 = 5 - 2 \\\ \Rightarrow x = 3 \\\$
Therefore, the value of $x$ is equal to $3$ .
It is the required answer.

Additional information: In the given question, mathematical operations such as addition, subtraction, multiplication and division is used. Use addition or subtraction properties of equality to gather variable terms on one side of the equation and constant on the other side of the equation. Use the multiplication or division properties of equality to form the coefficient of the variable term equivalent to one.

Note: The important thing to recollect about any equation is that the ‘equals’ sign represents a balance. What the sign says is that what’s on the left-hand side is strictly an equal to what’s on the right-hand side. It is the type of question where only mathematical operations such as addition, subtraction, multiplication and division is used.