Question

Ayoob Khan asked Dec 6, 2023

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2 Answers

Francoisxavier · Answer 1 · 2023-12-07T13:17:39+0000

Answer:

$\:$

Explanation:

A rectangle is a parallelogram with equal angles and the diagonals of a rectangle are of equal length.

$\:$

Therefore,

$\\ { \longrightarrow \qquad{ \sf{ \pmb {DF = EG}}}} \: \: \\ \\$

${ \longrightarrow \qquad{ \sf{ \pmb {7x - 3 = 5x + 9}}}} \: \: \\ \\$

Subtracting 5x from both sides we get :

$\\ { \longrightarrow \qquad{ \sf{ \pmb {7x - 5x - 3 = 5x - 5x + 9}}}} \: \: \\ \\$

${ \longrightarrow \qquad{ \sf{ \pmb {2x - 3 = 9}}}} \: \: \\ \\$

Adding 3 to both sides we get :

$\\ { \longrightarrow \qquad{ \sf{ \pmb {2x - 3 + 3 = 9 + 3}}}} \: \: \\ \\$

${ \longrightarrow \qquad{ \sf{ \pmb {2x = 12}}}} \: \: \\ \\$

Dividing 2 from both sides we get :

$\\ { \longrightarrow \qquad{ \sf{ \pmb { (2x)/(2) = (12)/(2) }}}} \: \: \\ \\$

${ \longrightarrow \qquad{ \frak{ \pmb {x = 6}}}} \: \: \\ \\$

Therefore,

Muruganandham K · Answer 2 · 2023-12-12T17:51:17+0000

Answer:

x=6

Explanation:

Using the given measurements of the angles and the lengths of the sides, we can determine that this figure must be a rectangle.

Diagonals of a rectangle are always equivalent/congruent.

We can use this information to set up an equation:

$DF=EG\\7x-3=5x+9$

Add 3 to both sides:

$7x-3+3=5x+9+3\\7x=5x+12$

Subtract 5x from both sides:

$7x-5x=5x-5x+12\\2x=12$

Divide both sides by 2

$(2x)/(2)=(12)/(2)\\x=6$

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