Alexis wants to make a paperweight at pottery class. He designs a pyramid-like model with a base area of 100square centimeters and a height of 6 centimeters. He wants the paperweight to weigh at least 300 grams. What is the lowest possible density of the material Alexis uses to make the paperweight?

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dribeiro dribeiro · Answer 1 · 2020-05-06T02:26:06+02:00

Answer:

The density of the material must be at least 1.5 g/cm³.

Step-by-step explanation:

The volume for a pyramid is given by the following formula:

V = (1/3)*Abase*h

Where V is the volume, Abase is the base area and h is the height. For Alexis's pyramid, we have:

V = (1/3)*100*6 = 200 cm³

Since he wants the paperweigth to have a mass of at least 300 grams, the density must be at least:

density = mass/volume = 300/200 = 1.5 g/cm³

oeerivona oeerivona · Answer 2 · 2020-05-06T02:44:52+02:00

Answer:

The lowest possible density of the material Alexis uses to make the paperweight is 1.5 g/cm³

Step-by-step explanation:

Here we have the volume of a pyramid given by the following relation;

[tex]Volume \ of \ pyramid = \frac{1}{3} \times Base \ Area \times Height[/tex]

Therefore the volume, V of the pyramid is equal to 1/3 × 100 cm × 6 cm = 200 cm³

The density of the paperweight is given by [tex]Density = \frac{Mass}{Volume}[/tex]

The required density is then [tex]Required \ Density = \frac{300 \, g}{200 \, cm^3} = 1.5 \, g/cm^3[/tex]

The lowest possible density of the material Alexis uses to make the paperweight is therefore 1.5 g/cm³.