An employee at a company that assembles chandeliers is packing boxes for shipping. In the first box, he packed 4 small chandeliers and 4 large chandeliers, which weighed a total of 148 kilograms. In the second box, he packed 1 large chandelier, SmartScor which had a weight of 28 kilograms. Assuming the weight of the box isn't included in the shipping weight, how much does each size of chandelier weigh? Each small chandelier weighs \( \square \) kilograms and each large one weighs \( \square \) kilograms. Submit

Let's break down the problem with some fun logic! In the first box, we have 4 small chandeliers and 4 large chandeliers adding up to 148 kilograms. This gives us the equation: 4s + 4l = 148, which simplifies to s + l = 37 (where "s" is the weight of a small chandelier and "l" is for a large one). Now, in the second box, there’s 1 large chandelier weighing 28 kilograms. So we can say: l = 28. Plugging this back into our first equation gives us: s + 28 = 37. Thus, we find that s = 9. Therefore, each small chandelier weighs 9 kilograms, and each large chandelier weighs 28 kilograms! So, to wrap it up: Each small chandelier weighs **9 kilograms** and each large chandelier weighs **28 kilograms**. Happy packing!