1. The problem states Anuar has 80 toy vehicles in total. 2. It says \frac{3}{5} of the vehicles are cars. To find the number of cars, multiply 80 by \frac{3}{5}: $$80 \times \frac{3}{5} = 80 \times 0.6 = 48$$ So, Anuar has 48 cars. 3. The rest of the vehicles are motorcycles and buses. To find how many are motorcycles and buses combined, subtract the number of cars from the total: $$80 - 48 = 32$$ So, there are 32 motorcycles and buses together. 4. The problem says the number of motorcycles is 3 times the number of buses. Let the number of buses be $b$. Then the number of motorcycles is $3b$. 5. Since motorcycles and buses together are 32, we write the equation: $$b + 3b = 32$$ $$4b = 32$$ 6. Solve for $b$: $$b = \frac{32}{4} = 8$$ So, there are 8 buses. 7. The number of motorcycles is 3 times the number of buses: $$3 \times 8 = 24$$ So, Anuar has 24 toy motorcycles. **Final answer:** Anuar has 24 toy motorcycles.