 Recent questions in Solid Geometry geduiwelh 2020-11-29 Answered

You want to find the values of x so that the volume of the rectangular prism is no more than 36 cubic units. 8x+4<36 $$\displaystyle{2}{x}+{9.5}≤{36}$$ 36x+18<36 $$\displaystyle{35}{x}+{18}≤{36}$$ Tyra 2020-11-27 Answered

Find the surface area of the prism. Isa Trevino 2020-11-27 Answered

A regular hexagon is dilated by a scale factor of $$\frac{4}{3}$$ to create a new hexagon. How does the perimeter of the new hexagon compare with the original perimeter? rocedwrp 2020-11-23 Answered

a cube-shaped cat hideaway is 8ft cubed. On 3 sides there is a 1 ft opening. What is the area in fractions of the surface area that is not an opening? glasskerfu 2020-11-09 Answered

A banner is made of a square and a semicircle. The square has side lengths of 26 inches. One side of the square is also the diameter of the semicircle. What is the total area of the banner? Use 3.14 for π. Tyra 2020-11-08 Answered

Find the volume of the prism. length=60cm, breadth=20cm, height =10cm BenoguigoliB 2020-11-05 Answered

A packing box is 3.5 feet by 1.4 feet by 1.8 feet. A box that is 3.1 feet by 1.1 feet by 1.4 feet is placed inside the first box. The rest of the box is filled with packing foam. How many cubic feet does the packing foam take up? BolkowN 2020-11-02 Answered

The perimeter of a rectangle is 56 in. The ratio of the length to the width is 6:1. Find the length and the width. tricotasu 2020-10-28 Answered

Foci: (0,0), (0,8), major axis of length 16 vestirme4 2020-10-26 Answered

The capacitance of a single isolated spherical conductor withradius R is proportional to a) $$\displaystyle{R}$$ b) $$\displaystyle{R}^{{{2}}}$$ c) $$\displaystyle{\frac{{{1}}}{{{R}}}}$$ d) $$\displaystyle{\frac{{{1}}}{{{R}^{{{2}}}}}}$$ BenoguigoliB 2020-10-26 Answered

[Pic of triangle] Find the volume of the pyramid. Write your answer as a fraction or mixed number.

In case Tetrahedron Snub dodecahedron is saying something to you, you are dealing with one of the solid geometry examples. The solid geometry problems will revolve around rectangular prisms, cones, pyramids, and cubes. Regardless of what questions you may have, the majority of equations here are quite easy if you turn to three-dimensional processing or approach help from our examples of various answers that are provided below. Start with the simplest shapes and proceed with more complex tasks as you apply formulas based on your objectives and examples. Remember to start with the visual examples before calculations and formulas.
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