Answer:
Let d1 and d2 be the lengths of the two diagonals of the kite.
We know that the area of a kite is given by:
Area = (1/2) x d1 x d2
Substituting the given values, we get:
120 = (1/2) x 32 x d2
Simplifying and solving for d2, we get:
d2 = (2 x 120) / 32
d2 = 15
Therefore, the length of the other diagonal is 15 cm.
The area of a kite is given by the formula: A = (d1 x d2)/2, where d1 and d2 are the diagonals of the kite.
We are given the area of the kite as 120 sq.cm and the length of one diagonal as 32 cm.
Let the length of the other diagonal be x cm.
Using the formula for the area of a kite, we have:
120 = (32 x x)/2
Simplifying this equation, we get:
240 = 32x
x = 240/32
x = 7.5
Therefore, the length of the other diagonal is 7.5 cm.
Copyright © 2024 EHUB.TIPS team's - All rights reserved.
Answers & Comments
Answer:
Let d1 and d2 be the lengths of the two diagonals of the kite.
We know that the area of a kite is given by:
Area = (1/2) x d1 x d2
Substituting the given values, we get:
120 = (1/2) x 32 x d2
Simplifying and solving for d2, we get:
d2 = (2 x 120) / 32
d2 = 15
Therefore, the length of the other diagonal is 15 cm.
Answer:
The area of a kite is given by the formula: A = (d1 x d2)/2, where d1 and d2 are the diagonals of the kite.
We are given the area of the kite as 120 sq.cm and the length of one diagonal as 32 cm.
Let the length of the other diagonal be x cm.
Using the formula for the area of a kite, we have:
120 = (32 x x)/2
Simplifying this equation, we get:
240 = 32x
x = 240/32
x = 7.5
Therefore, the length of the other diagonal is 7.5 cm.