The square of Mark's age 3 years ago is 6 times the age he will be in 9 years. What is his age now?

Question

The square of Mark's age 3 years ago is 6 times the age he will be in 9 years. What is his age now?

1 Answer

Impact of this question

3761 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2018-03-16T15:26:09

15 years old

Explanation:

If we denote Mark's age today by $x$ we can set up an equation to solve.

We know that $(x-3)^2$ , "the square of his age three years ago", is 6 times greater than "his age in 9 years", $(x+9)$ , so to make this problem solvable we must create an expression where these two equal each other.

Thus by multiplying $(x+9)$ by 6, we set "his age in 9" years to be equal to "the square of his age 3 years ago", creating the following expression:

$(x-3)^2=6(x+9)$

Which, when simplified, leads us to a quadratic equation:

$x^2-12x-45=0$

$0=(x-15)(x+3)$

Hence the two possible answers are:

$x_1=15$ and $x_2=-3$

Obviously, you cannot be -3 years old, so he must be 15 years old.

Science

Math

Humanities

... and beyond

The square of Mark's age 3 years ago is 6 times the age he will be in 9 years. What is his age now?

1 Answer

Explanation:

Related questions

Impact of this question