SOLUTION: A mother is 30 years older than her daughter. Five years ago she was four times as old as her daughter. How old are they now?

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Question 91663: A mother is 30 years older than her daughter. Five years ago she was four times as old as her daughter. How old are they now?
Answer by Earlsdon(6294) About Me  (Show Source):
You can put this solution on YOUR website!
Start by assigning variables to the unknown quantities:
Let M = Mother's present age.
Let D = Daughter's present age.
From the problem description we can write:
Mother's age is (M) is (=) 30 years older than her daughter's age, so:
M = D+30
Five years ago, Mother's age (M-5) was (=) four times her daughter's age, so
M-5 = 4(D-5) Simplify.
M-5 = 4D-20 Rewrite this as: (add 5 to both sides)
M = 4D-15 now substitute this for the M in the first equation.
D+30 = 4D-15 Simplify and solve for D by adding 15 to both sides.
D+45 = 4D Now subtract D from both sides.
45 = 3D Finally, divide both sides by 3.
15 = D or D = 15 This is the daughter's present age.
M = D+30
M = 15+30
M = 45 This is the mother's present age.
Check:
M = D+30
M = 15+30
M = 45
Five years ago:
M-5 = 4(D-5)
45-5 = 4(15-5)
40 = 4(10)
40 = 40