in a rhombus of side 10cm, one of the diagonal is 12cm long. find the length of second diagonal
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Answered by
16
hey!here is your answer..
the sides of Rhombus are 10cm and one of the diagonal is 12cm
so,the other diagonal will be
=> 2[ √10^2 - √(12/2)^2]
= 2 [ √100 - √36 ]
=2×√64
= 2× 8
= 16 cm [ Answer]
if it is helpful then mark me as brainliest..pls
the sides of Rhombus are 10cm and one of the diagonal is 12cm
so,the other diagonal will be
=> 2[ √10^2 - √(12/2)^2]
= 2 [ √100 - √36 ]
=2×√64
= 2× 8
= 16 cm [ Answer]
if it is helpful then mark me as brainliest..pls
Answered by
15
Solution:-
let, Rhombus ABCD.
given:-
•The sides of a rhombus are 10cm and one diagonal is 12 cm .
let, DO = OB = ? , BD = ?
and AO = OC = 6cm, and AC = 12 cm
1) we know diagonal of rhombus are equally bisect each other and they are perpendicular to each other.
2) All sides of rhombus are equal.
so,
by Pythagoras theorem.
=> (AB)² = ( AO )² + ( OB )²
=> (10)² = (6)² + (OB)²
=> 100 = 36 + (OB)²
=> 100 - 36 = (OB)²
=> 64 = (OB)²
i.e.
=> (OB)² = 64
=> OB = √64
=> OB = 8 cm
so, we know
DO = OB = 8 cm
hence, BD = 16 cm
Area of rhombus = [(AC)×(BD)]/2
Area of rhombus = [ 12 × 16 ]/2
Area of rhombus = [192]/2
Area of rhombus= 96 cm²
Hence length of diagonal rhombus
is 16 cm and area of rhombus is
96 cm².
i hope it helps you.
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