Answer:
3
Step-by-step explanation:
The boxes are stacked 5 boxes deep by 4 boxes high by 4 boxes across, then there are [tex]5\cdot 4\cdot 4=80[/tex] boxes in total.
The mass of 1 box of paper is 22.5 kilograms, so 80 boxes weigh [tex]22.5\cdot 80=1800[/tex] kilograms.
When the driver is in the truck, the mass is 2948.35 kilograms, then the total mass is
[tex]2948.35+1800=4748.35\ kg.[/tex]
Let n be the number of boxes of paper the driver must deliver at the first stop. Their weigth is 22.5n kg and the weight of the truck without n boxes is
[tex]4748.35-22.5n\ kg.[/tex]
Trucks with a mass greater than 4700 kilograms are not allowed over the bridge, thus
[tex]4748.35-22.5n<4700,\\ \\22.5n>48.35,\\ \\n>\dfrac{967}{450}=2\dfrac{67}{450}.[/tex]
Hence, the driver must deliver at least 3 boxes at the first shop.
