1. The problem is to produce more and include some conversion, which suggests increasing production and converting units or quantities. 2. To solve this, we first identify the current production quantity and the desired increase. 3. Suppose the current production is $P$ units and we want to increase it by a factor of $k$, then the new production is given by the formula: $$\text{New Production} = k \times P$$ 4. If conversion is needed, for example converting from one unit to another, use the conversion factor $c$ such that: $$\text{Converted Quantity} = \text{Quantity} \times c$$ 5. For example, if production is 100 units and we want to increase it by 50% (i.e., $k=1.5$), then: $$\text{New Production} = 1.5 \times 100 = 150$$ 6. If the units are in kilograms and we want to convert to grams, use the conversion factor $c=1000$ grams per kilogram: $$\text{Converted Quantity} = 150 \times 1000 = 150000$$ grams 7. This means after increasing production by 50%, the new production is 150 units or 150000 grams. 8. Always ensure to apply the correct conversion factor depending on the units involved.