11. Find the area of a rhombus whose side is 6 cm and whose altitude is 4 cm. If one of its
diagonals is 8 cm long, find the length of the other diagonal.
Answers
Answered by
3
Answer:
Area of rhombus = 24 cm²
Length of the other diagonal = 6 cm.
Step-by-step explanation:
Hi,
Given the side of the rhombus, b = 6 cm
Also, Given the altitude of rhombus , h = 4 cm,
Area of the rhombus when base(side) and altitude(h)
are given is given by A = base * height
Thus, Area of rhombus = 6 * 4 cm²
Area of rhombus = 24 cm².
Given one of the diagonal is of length 8 cm,
Let d₁ = 8 cm.
Let the length of the other diagonal be d₂.
If d₁, d₂ length of the diagonals are known, then
Area of rhombus is given by A = 1/2*d₁*d₂,
But we know, A = 24
Hence, 1/2*d₁*d₂ = 24
1/2*8*d₂ = 24
d₂ = 6 cm.
Hence, length of the other diagonal of rhombus
is 6 cm.
Hope, it helps !
Answered by
0
Answer:
Area of rhombus = 24 cm²
Length of the other diagonal = 6 cm.
Step-by-step explanation:
Hi,
Given the side of the rhombus, b = 6 cm
Also, Given the altitude of rhombus , h = 4 cm,
Area of the rhombus when base(side) and altitude(h)
are given is given by A = base * height
Thus, Area of rhombus = 6 * 4 cm²
Area of rhombus = 24 cm².
Given one of the diagonal is of length 8 cm,
Let d₁ = 8 cm.
Let the length of the other diagonal be d₂.
If d₁, d₂ length of the diagonals are known, then
Area of rhombus is given by A = 1/2*d₁*d₂,
But we know, A = 24
Hence, 1/2*d₁*d₂ = 24
1/2*8*d₂ = 24
d₂ = 6 cm.
Hence, length of the other diagonal of rhombus
is 6 cm.
Hope, it helps !
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