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Q: What is the area and perimeter of a rhombus?

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it is impossible for a diagonal of a rhombus to be the same length as its perimeter

Perimeter = 4*Side so that Side = Perimeter/4 Area of a rhombus = Side * Altitude so Altitude = Area/Side = Area/(Perimeter/4) = 4*Area/Perimeter

Its perimeter is the sum of its 4 sides Its area is 0.5 times the product of its diagonals

28

30

The answer depends on what information is given to you.

P = 4*a (a is side length) Area = p*q/2 (p=perimeter, q=diagonal

Units, because the perimeter is just the edge. The area is square units.

That rhombus has a perimeter of 18.88 feet.

The perimeter of a rhombus with side 7 is 28 units.

The perimeter of a rhombus is the sum of its 4 sides

There is no relationship between the perimeter and the area of a rhombus. Take a rhombus with all 4 sides = 2 units. Therefore the perimeter is 8 units. There are an infinite number of possible areas for this rhombus. The largest possible area will be when the rhombus approaches the shape of a square = 4 square units. The smallest area will be when the one diagonal approaches 0 units and the other diagonal approaches 4 units (squashed almost flat). So two very extreme areas can have the same perimeter, including all those areas in-between.

The perimeter of a rhombus does not provide enough information to determine angles.

The perimeter of a rhombus is the sum of its 4 equal sides

Perimeter of rhombus = 4*side = 9.6 cm

Answer63cm2. False

123

With perimeter 10 and all sides equal fora rhombus, each side (base) is 10/4 = 2.5 inch Area = base times altitude = 2.5 x 12 = 30

Perimeter of a rhombus = 4 x (length of one side)(Notice how closely the formula resemblesthe one for the perimeter of a square.)

The unit of measurement for an angle in a rhombus is a radian.

From the given information and by using trigonometry the perimeter in cm of the rhombus works out as 15 times the square root of 2

All the sides of a rhombus are equal and perimeter of a rhombus is equal to four times the side. Perimeter = 4 x 17 units = 68 units

Constructing the figure, we find the other diagonal to have length 10.The area of the rhombus would thus be 10x8x0.5=40

the answer is 20

The are different formulae for its perimeter, area, lengths of diagonals, angle and these depend on what information is provided.