Diagonal = 17 cm and height = 8 cm so Length = sqrt[172 - 82] = sqrt(225) = 15 cm Then area = length*height = 15*8 = 120 cm2
Base = Area/Height = 7886.2/95.7 = 82.405 cm (to 3 dp)
94cm,
What is the density of a rectangular object with the height of 5 cm the length of 10 cm, the width of 2 cm and the mass of 50 g
5.5 cm
Diagonal = 17 cm and height = 8 cm so Length = sqrt[172 - 82] = sqrt(225) = 15 cm Then area = length*height = 15*8 = 120 cm2
The maximum area for a rhombus occurs when the rhombus is a square, as all sides are equal in length. Since the sides of the rhombus are 25 cm each, the area of the square rhombus would be calculated by squaring the length of one of the sides, which is 25 cm, resulting in an area of 625 square cm. Thus, the maximum area for a rhombus with sides of 25 cm is 625 square cm.
Rhombus Area = side x height = 6 cm x 4 cm = 24 cm2In the right triangle formed by the side and the height of the rhombus, we have:sin (angle opposite to the height) = height/side = 4 cm/6cm = 2/3, so thatthe angle measure = sin-1 (2/3) ≈ 41.8⁰.In the triangle formed by two adjacent sides and the required diagonal, which is opposite to the angle of 41.8⁰ of the rhombus, we have: (use the Law of Cosines)diagonal length = √[62 + 62 -2(6)(6)cos 41.8⁰] ≈ 4.3Thus, the length of the other diagonal of the rhombus is about 4.3 cm long.
always
Find the area of a rhombus whose side is 6 cm and whose altitude is 4 cm? . Area = base * height Altitude = height. Altitude = 4 cm . A rhombus has all 4 sides equal, so the base = 6 cm . Area = base * height . Area = ____sq. cm.
24 cm sq
Base = Area/Height = 7886.2/95.7 = 82.405 cm (to 3 dp)
volume = length x width x height height = volume / (length x width) height = 378 cm3 / (6cm x 7cm) = 9 cm
94cm,
A rectangular prism with length 7 cm, width 4 cm and height 6 cm has a volume of 168cm3
A rectangular prism that has a length of 7 cm, width of 8 cm and height of 14 cm has a volume of 784cm3
A rectangular prism with a length of 4 cm, a width of 2 cm and a height of 5 cm has a volume of 40cm3