Perimeter of a rhombus is 100 cm, its area is 600cm find the longer diagonal
Answers
Answer:
Step-by-step explanation:
Area of rhombus will be 600 cm^2.
Perimeter of a rhomus = 4 * side (which same as perimeter of a square)
100 = 4* side
Hence, each side of rhombus = 25cm
Now draw the rhombus. Let it be ABCD. Join the diagonals AC and BD. And label the intersection point as O. Take any one diagonal to be equal to 40cm (say BD).
Now rhombus has one property that its diagonals bisect each other at right angles.
Therefore, AO = OC and OB = OD = 20cm
Hence angle AOB = angle BOC = angle COD = angle AOD = 90 (making each triangle a right triangle)
Apply pythagorus theorem in triangle AOB where OB = 20cm and AB = 25 cm and angle O is 90
AB ^2 = OB^2 + AO^2
This will give you AO = 15cm = OC
Now you have both the diagonals AC = 30 cm (AO + OC) and BD = 40cm
Area of rhombus = (1/2) * (product of diagonals) = (1/2) * (AC * BD)
Solve this and you will get Area = 600 cm ^2