Answer:
Alex is 14 years old and Uncle Joe is 56 years old.
Step-by-step explanation:
We can arm a system of two equations with two unknowns.
J= uncle joe's age.
A=alex's age.
[tex]\left \{ {{J+A=70} \atop {J=A.4}} \right.[/tex]
A system of two equations can be resolved using various methods. I will resolve it using the substitution method, where I will be replacing the value of J=A.4 on the first equation. Then I get:
[tex]A.4+A=70\\5A=70\\A=70:5\\A=14[/tex]
Now I know that Alex is 14 years old. If the Uncle joe's age is four times Alex's age, then we know that:
[tex]J=14.4=56[/tex]
