possible Angelo's kayak travels \( 15 \mathrm{~km} / \mathrm{h} \) in still water. If the river's current flows at a rate of \( 3 \mathrm{~km} / \mathrm{h} \), how long will it take to travel 33 km downstream? It will take \( \square \) hours. (Round to the nearest tenth.)

When kayaking downstream, the speed of the kayak is increased by the speed of the current. So, you add the speeds: \( 15 \mathrm{~km/h} + 3 \mathrm{~km/h} = 18 \mathrm{~km/h} \). To find the time it takes to travel 33 km downstream, you can use the formula \( \text{time} = \frac{\text{distance}}{\text{speed}} \). Plugging in the numbers gives you \( \text{time} = \frac{33 \mathrm{~km}}{18 \mathrm{~km/h}} \approx 1.8333 \) hours. Rounding to the nearest tenth, it will take approximately \( 1.8 \) hours.