Volume and Surface Area of Composite Solids

We have two brands of milk that are priced the same.

We want to decide which brand to choose for the best value, so we let's calculate the volumes of the cartons. The carton with the greater volume will be the better deal since they both cost the same.

Volume of DairyPlus

The DairyPlus carton is a composite solid made up of a rectangular prism and a triangular prism. Remember that the volume of a prism is calculated by multiplying its base area by its height. V=Bh Let's find the volume of the rectangular prism part, V_(rp). The base of the rectangular prism is a rectangle, so we find its area by multiplying its width of 5 centimeters by its length of 6 centimeters, then multiply this value by the height of the rectangular prism, 14. V_(rp)&= 6( 5)( 14) &=420 The rectangular prism part has a volume of 420 cubic centimeters. Now let's calculate the volume of the triangular prism part, V_(tp). Notice that the base of the triangular prism is a triangle with a height of 6 centimeters and a base of 5 centimeters.

We can use the area of a triangle formula to find the base area.

The base area of the triangular prism is 15 square centimeters. Let's multiply the base area by the height of the prism to find the volume of the triangular prism part.

The triangular prism part has a volume of 90 cubic centimeters. We can add the volumes of each part together to find the total volume of the carton of DairyPlus.

The volume of the carton of DairyPlus is 510 cubic centimeters.

Volume of MilkyMilk

The shape of the MilkyMilk carton is a rectangular prism, so let's multiply its width, length, and height together to find its volume.

The volume of the MilkyMilk carton is 600 cubic centimeters. Since the volume of the MilkyMilk carton is greater than the volume of the DairyPlus carton and they both cost the same, MilkyMilk is the better deal because it provides more milk for the same price.

Paulina and Kevin are painting wooden carvings. We want to determine who will finish painting their carving first if they both paint at the same speed. Paulina's carving is a prism with a pyramid on top, while Kevin's carving looks like a cylinder with a hemisphere mounted on top. Let's see who will be done first!

We will find the surface areas of the carvings. Since both Paulina and Kevin paint at the same speed, the carving with the lesser surface area will be painted first. Let's start by finding the surface area of Paulina's carving.

Surface Area of Paulina's Carving

Paulina's carving is a composite solid consisting of a pyramid and a prism. Notice that the base of the pyramid coincides with one of the bases of the prism, so we will not include these areas in the total surface area. Because of this, we only need to calculate the lateral area of the pyramid, not its entire surface area. \begin{gathered} LA_\text{pyramid}=\dfrac{1}{2}p\ell \end{gathered} To find the lateral area of a pyramid, we need to find the perimeter of the base and the slant height of the pyramid. The base of the pyramid is a rectangle, so we can calculate its perimeter by finding the sum of 2 times its length, 40 centimeters, and 2 times its width, 30 centimeters.

The perimeter of the pyramid is 140 centimeters. Now let's find the slant height of the pyramid. Notice that the height of the pyramid, half the length of the base, and the slant height form a right triangle.

We can use this information and the Pythagorean Theorem to find the slant height.

Let's substitute 25 for l and 140 for p in the formula of the lateral area of a pyramid.

The pyramid section has a lateral area of 1750 square centimeters. The bottom part of the carving is a prism with a 40 by 30 centimeter base and a height of 20 centimeters. As with the pyramid, we will exclude one base area from the surface area calculation. We can find the surface area of the prism by adding the base area to the product of the base perimeter and height. B+ph Since the base of the prism is a rectangle, we can multiply its width by its length to find the area of the base. B&=40(30) &=1200 The base area of the prism is 1200 square centimeters. The perimeter of the prism's base is 140 centimeters. Let's calculate the relevant surface areas of the prism.

The area of the prism to be painted is 4000 square centimeters. Now let's add this area to the lateral area of the pyramid with the relevant surface areas of the prism to determine the total surface area of Paulina's wooden object. Surface Area of Paulina's Carving 1750+4000=5750 Paulina will paint 5750 square centimeters. Now let's calculate the surface area to be painted for Kevin's carving.

Surface Area of Kevin's Carving

Kevin's carving is a composite solid consisting of a hemisphere and a cylinder. Let's calculate the surface areas of these two solids and then add them together to find the total surface area he needs to paint. The surface area of a hemisphere is half of the surface area of a sphere plus the area of the base. \begin{gathered} SA_\text{hemisphere}=2\pi r^2+B \end{gathered} However, the base of the hemisphere overlaps the one of the bases of the cylinder, so we will only include the lateral area of the hemisphere in the total area of the carving.

The lateral area of the hemisphere is 800π square centimeters. Again, since one of the bases of the cylinder overlaps with the base of the hemisphere, we will not include this base in the cylinder part of the surface area of the carving. This means that we can calculate the relevant surface area of the cylinder as follows. Relevant Surface Area of the Cylinder π r^2+2π r h Let's substitute 20 for r and 20 for h in this formula and simplify.

The surface area of the cylinder part of Kevin's wooden carving is 1200π square centimeters. Let's add the surface areas that we calculated to find the total surface area of the carving that Kevin needs to paint. Surface Area Kevin's Carving 800π+1200π = 2000π We can use a calculator to find the value of 2000π. Remember to round the result to the nearest whole number.

The surface area of Kevin's wooden carving is about 6283 square centimeters, which is greater than Paulina's 5750 square centimeters. Since Kevin and Paulina paint at the same speed, Paulina will finish painting sooner because she has a smaller area to paint.