Geometry Problem Solver
Parallelepiped and sphere together
Parallelepiped alone
Sphere alone
They give the tracks some problems can be solved automatically, the numerical values do not matter in the various examples. Only the problems already tested are reported. In fact, the problems solved by the geometric computer, but not tested, with a parallelepiped and sphere together, are about 2 x 200 problems on parallelepiped x 9 problems on sphere = 3,600
Track 1
A parallelepiped has a base area of 200 cm² and a height of 5 cm. Calculates the radius of a congruent sphere at the parallelepiped.
Track 2
A parallelepiped has a base area of 200 cm² and a height of 5 cm. Calculates the radius of a congruent sphere at 1/4 of the parallelepiped.
Track 3
A parallelepiped has a base area of 200 cm² and a volume of 1000 cm³. Calculates the volume of a sphere having a congruent radius to 3/5 of the height of the parallelepiped.
Track 4
A sphere has a volume of 36 π cm³. Calculates the volume of a parallelepiped having a congruent height to 2/3 of the sphere diameter and the base area of 500 cm².
Track 5
A sphere has a volume of 36 π cm³. Calculates the volume of a parallelepiped having a congruent height to 5/3 of the sphere radius and the base area of 500 cm².
Track 6
A sphere has a volume of 36 π cm³. Calculates the volume of a parallelepiped having the base area congruent to 2/4 of the total area of the sphere and the height of 20 cm.
The program for solving problems can give answers completely wrong.
prof. Pietro De Paolis
2017
problems solved
Electric School
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