1 Answer

Sixthsense · Answer 1 · 2022-01-01T22:37:52+0000

Answer:

Area of the rhombus ABCD = 16 square units

Explanation:

Area of a rhombus =
$(1)/(2)(\text{Diagonal 1})(\text{Diagonal 2})$

From the graph attached,

Diagonal 1 = Distance between the points A and C

Diagonal 2 = Distance between the points B and D

Length of a segment between (x₁, y₁) and (x₂, y₂) =
$\sqrt{(x_2-x_1)^(2)+(y_2-y_1)^2 }$

Diagonal 1 (AC) =
√((4-0)^2+(-1+1)^2) = 4 units

Diagonal 2(BD) =
√((2-2)^2+(3+5)^2) = 8 units

Now area of the rhombus ABCD =
$(1)/(2)(\text{AC})(\text{BD})$

=
(1)/(2)* 4* 8

= 16 units²

Therefore, area of the given rhombus is 16 units².

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