1 Answer

Peter Tao · Answer 1 · 2023-06-01T13:19:50+0000

Answer:

Sum of diagonals = 20 units

Explanation:

$A(rectangle)=25\sqrt 3\: units^2\\w(rectangle) =5\: units$

To find: Sum of diagonals

A(rectangle)=l(rectangle)* w(rectangle)

$\implies l(rectangle)=(A(rectangle))/(w(rectangle))$

$\implies l(rectangle)=(25\sqrt 3)/(5)$

$\implies l(rectangle)={5\sqrt 3}\: units$

Let the diagonals of the rectangle be
$d_1\:\&\:d_2\: units$

Diagonals of a rectangle are equal in measure.

$\implies d_1=d_2=√(l(rectangle)^2+w(rectangle)^2)$

(By Pythagoras Theorem)

$\implies d_1=d_2=√((5\sqrt 3)^2+(5)^2)$

$\implies d_1=d_2=√(75+25)$

$\implies d_1=d_2=√(100)$

$\implies d_1=d_2=10\: units$

$Sum \:of \:diagonals = d_1+d_2$

$\implies Sum \:of \:diagonals = 10+10$

$\implies Sum \:of \:diagonals = 20\: units$

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