Texas Education Agency
Texas Gateway: Using Models to Connect to and Understand Volume Formulas
[Accessible by TX Educators. Free Registration/Login Required] The student will use models to develop formulas and connect them to the volume of prisms, spheres, cylinders, pyramids, and cones.
Khan Academy
Khan Academy: Volume Formulas Review
Review the formulas for the volume of prisms, cylinders, pyramids, cones, and spheres.
Mr. Martini's Classroom
Mr. Martini's Classroom: Volume: Geometry Practice Solving Volumes
Students solve for the volume of three-dimensional figures such as cubes, prisms, and cylinders with these interactive flashcards.
Sophia Learning
Sophia: Prisms and Cylinders Tutorial
Explore the similarities between the volume of a cylinder and a prism.
Sophia Learning
Sophia: Volume of Composite Figures: Lesson 5
This lesson will present how to apply the volume formulas of prisms, cylinders, pyramids, cones, spheres, and hemispheres to find the volume of composite figures. It is 5 of 6 in the series titled "Volume of Composite Figures."
Khan Academy
Khan Academy: Solid Geometry
Find volumes and surface areas of boxes, cylinders, and triangular prisms. Students receive immediate feedback and have the opportunity to try questions repeatedly, watch a video or receive hints.
Sophia Learning
Sophia: Prisms and Cylinders Tutorial
Compare a prism and a cylinder in order to determine the similarities of calculating the volume.
ClassFlow
Class Flow: Surface Area and Volume Test
[Free Registration/Login Required] This test may be given in classes learning about volume and surface area of rectangular prisms, cylinders, and cones.
Alabama Learning Exchange
Alex: Popcorn Bucket or Box?
In this exploration, students will apply their knowledge of finding volume and surface area of cylinders and rectangular prisms. Students will make recommendations to the local movie theater after determining which package is cost...
Illustrative Mathematics
Illustrative Mathematics: 8.g Shipping Rolled Oats
For this task, 8th graders must determine the optimal dimensions of a cardboard box that will hold six cylinders of oats. To do this, they need to make surface area and volume calculations. Aligns with 8.G.C.9.