Answer:
The two equations that can be used to find each of their ages are [tex]x=4 \times y[/tex] and [tex]x+y=60[/tex] .
Step-by-step explanation:
We are given that Mrs. Lang is 4 times as old as her daughter Jill. The sum of their ages is 60 years.
Let the age of Mrs. Lang be 'x years' and the age of her daughter Jill be 'y years'.
Now, according to the question;
[tex]x=4 \times y[/tex] ----------------- [equation 1]
[tex]x+y=60[/tex]
[tex]4y + y = 60[/tex] {using equation 1}
[tex]5y=60[/tex]
[tex]y=\frac{60}{5}[/tex]
y = 12 years
Now, putting the value of y in equation 1 we get;
[tex]x=4 \times y[/tex]
[tex]x= 4 \times 12[/tex] = 48 years
Hence, the age of Mrs. Lang is 48 years and her daughter Jill is 12 years old.
Answer:
Mrs. Lang is 48 and her daughter is 12 years old.
Step-by-step explanation:
