Question

Word problems are used to see whether you understand the algebraic concepts. Anyone can solve an equation. But if you encounter a problem and can then set up the equations to solve, that shows a deeper understanding.

So, guess what? In real life, no one hands you an equation; instead, you get a problem to solve.

So, here goes:

Let the candles start at height h. The units are not given, so I'll assume inches just to have a reference.

If candle x takes 6 hours to burn down, it burns at h/6 in/hr. So, at time t minutes, its height is

x = h - h/360 * t
The other candle, burning down at h/9 in/hr,
y = h - h/540 * t

When is the slow burner twice as tall as the fast burner?

h - h/9*t = 2(h - h/6*t)
you can divide all the h's out, giving

1 - t/9 = 2(1 - t/6)
1 - t/9 = 2 - t/3
2t/9 = 1
t = 9/2

So, after 4.5 hours,

x = h/2 (burned halfway)
y = t/4 (half as tall as x)

Oops cut/paste error. Left some units in minutes, but the final equations are the solution.