Factor M on the right hand side:
[tex]I = M\left(\dfrac{R^2}{4}+\dfrac{l^2}{12}\right)[/tex]
We can rewrite the parenthesis as
[tex]I = M\left(\dfrac{3R^2}{12}+\dfrac{l^2}{12}\right) \iff I = M\left(\dfrac{3R^2+l^2}{12}\right)[/tex]
Now we can divide both sides by the parenthesis, and we have
[tex]I = M\left(\dfrac{3R^2}{12}+\dfrac{l^2}{12}\right) \iff I = M\left(\dfrac{3R^2+l^2}{12}\right) \iff I\left(\dfrac{12}{3R^2+l^2}\right) = M \iff M=\dfrac{12I}{3R^2+l^2}[/tex]
