V = Length*Width*HeightSo 2058 = (3w)*w*(2w) = 6w^3 therefore w^3 = 2058/6 = 343 => w = 7 Then height = 2w = 14 units.
Assuming that the width is the same size as the height of the cuboid then let the length be 3x the width be x and the height be x. length*width*height = volume 3x*x*x = 2058 3x3 = 2058 Divide both sides by 3: x3 = 686 Cube root both sides: x = 8.819447349 length = 3x = 26.45834205 cm
2058=(3w) times (2w) times (w) or 2058=6w^3 divide both sides by 6 343=w^3 The cube root of 343 or 7 is the width. Let's check: 7 times 14 times 21 is 2058.
Yes, a square prism's height, length, and width are equal.
Find the area of one end of the prism, then multiply it by the length of the prism.
V = Length*Width*HeightSo 2058 = (3w)*w*(2w) = 6w^3 therefore w^3 = 2058/6 = 343 => w = 7 Then height = 2w = 14 units.
Let the length be 3x, the height be 2x and the width be x: length*height*width = volume 3x*2x*x = 2058 cubic cm 6x3 = 2058 Divide both sides by 6: x3 = 343 Cube root both sides: x = 7 cm Check: 21*14*7 = 2058
Let the width be "w" cm Length = 3w cm Height = 2wcm Hence w x 3w x 2w = 2058 cubic cm 6(w-cubed) = 2058 w-cubed = 2058/6 = 343 w = cube root of 343 = 7 cm
Assuming that the width is the same size as the height of the cuboid then let the length be 3x the width be x and the height be x. length*width*height = volume 3x*x*x = 2058 3x3 = 2058 Divide both sides by 3: x3 = 686 Cube root both sides: x = 8.819447349 length = 3x = 26.45834205 cm
2058=(3w) times (2w) times (w) or 2058=6w^3 divide both sides by 6 343=w^3 The cube root of 343 or 7 is the width. Let's check: 7 times 14 times 21 is 2058.
2,058/2,058= remander if 0 times 3 with the 0 and that will give you 0 and then you try to find the height of the length? The Answer is Fourteen or 14 cm for the height The Answer is twenty-one or 21 for the length
The length of the prism is at right angles to the bases.
Area of pentagon * length of prism.
Yes, a square prism's height, length, and width are equal.
Find the area of one end of the prism, then multiply it by the length of the prism.
Perimeter of base*Length of prism.
The formula for the volume of a parallelogram prism is V = Bh, where B is the base area of the parallelogram and h is the height of the prism. The formula for the surface area of a parallelogram prism is SA = 2B + Ph, where P is the perimeter of the base parallelogram. The base area of a parallelogram can be calculated as A = b * h, where b is the base length and h is the height of the parallelogram.