0
What else can I help you with?
Which two pieces of lab equipment would be most useful for measuring the mass and volume of a rectangular block?
Jenna Delaney Zeider
What is the density of a rectangular block?
It is the mass of the block divided by its volume.
What is the volume of block of ice measuring 3 meters long 1.5 meters wide and 2 meters high?
The equation for the volume of a rectangular prism (such as a block of ice) is height times width times depth. That would make the volume of this block of ice is 9 meters cubed.
How do you find the volume of a rectangular block?
Length by width by height
What is the mass of a rectangular block of aluminum measuring 11.1cm by 22.2cm by 35.1cm?
It is 23.353 kilograms.
What measurements do you need to determine the density of a rectangular block?
You need its mass and volume.
What is the volume of a rectangular block that is 4cm wide and 2 cm high?
You have omitted the dimension of 'length' Volume -= length X Width X Height.
How would you find the volume of blocks?
Volume of a rectangular block is: length*width*height. Use consistent units.
What has the same volume but different surface area?
This will usually be the case for objects that have different shapes: even if they have the same volume, it is unlikely that they have the same surface area. As an example, calculate the volume and surface area of the following two rectangular block shapes: 1) A 2 x 2 x 2 rectangular block 2) A 1 x 1 x 8 rectangular block
What measurements and what calculations would you make to find the density of the wood in a rectangular block?
Volume
What is the volume of a rectangular block that has sides of 3.0cm 5.2cm and 2.1cm?
32.76 centimeters
A solid rectangular block of metal 49cm by 44cm by 18cm is melted and formed into a solid sphere find the radius ofthe sphere?
To find the radius of the sphere, we need to know that the volume of the rectangular block is equal to the volume of the sphere. The volume of the rectangular block is 49 x 44 x 18 = 38,808 cm³. Equating this to the volume of a sphere (4/3πr³), we can solve for the radius which comes out to be approximately 22.18 cm.
