Question

How do you solve $4 - \dfrac{m}{2} = 10$?

Answer 1

Hint: In this question we have to solve the equation for \[m\], the given equation is a linear equation as the degree of the highest exponent of \[m\] is equal to 1. To solve the equation take all \[m\] terms to one side and all constants to the other side and solve for required \[m\].

Complete step by step solution:
Given equation is $4 - \dfrac{m}{2} = 10$, and we have to solve for \[m\],
Given equation is a linear equation as the highest degree of\[x\]will be equal to 1,
$ \Rightarrow 4 - \dfrac{m}{2} = 10$,
Now transform the equation by taking all \[m\] terms to one side and all constants to the other side,
Subtract 4 on both sides of the equation we get,
$ \Rightarrow 4 - \dfrac{m}{2} - 4 = 10 - 4$,
Now simplifying we get,
$ \Rightarrow - \dfrac{m}{2} = 6$,
Now multiply both sides with 2, we get,
\[ \Rightarrow - \dfrac{m}{2} \times 2 = 6 \times 2\],
Now simplifying we get,
\[ \Rightarrow - m = 12\],
Now take negative sign to the right hand side of the equation we get,
\[ \Rightarrow m = - 12\],
So the value of \[m\] will be $ - 12$, i.e., when we substitute the value of \[m\] in the equation $4 - \dfrac{m}{2} = 10$, then right hand side of the equation will be equal to left hand side of the equation, we get,
$ \Rightarrow $$4 - \dfrac{m}{2} = 10$,
Now substitute \[m = - 12\], we get,
\[ \Rightarrow 4 - \dfrac{{ - 12}}{2} = 10\],
Now simplifying we get,
\[ \Rightarrow 4 - \left( { - 6} \right) = 10\],
Now simplifying we get,
\[ \Rightarrow 4 + 6 = 10\],
Further simplifying we get,
\[ \Rightarrow 10 = 10\],
So R.H.S=L.H.S.

\[\therefore \] The value of \[m\] when the equation $4 - \dfrac{m}{2} = 10$ is solved will be equal to $ - 12$.

Note:
A linear equation is an equation of a straight line having a maximum of one variable. The degree of the variable will be equal to 1. To solve any equation in one variable, pit all the variable terms on the left hand side and all the numerical values on the right hand side to make the calculation solved easily.