the two quadrilaterals are similar. what is the value of x

To determine the value of x, we can set up a proportion between the corresponding sides of the two similar quadrilaterals.
The ratio of corresponding sides in similar shapes is equal. Therefore:
2/3.6 = 5/x
Cross multiplying, we have:
2x = 3.6 * 5
2x = 18
Dividing both sides by 2:
x = 9

Therefore, the value of x is 9.

a rectangle has a length of 3.4 ft. and a width of 5.7 ft. a larger similar rectangle has a length of 17 ft. what is the width of the larger rectanger

To find the width of the larger similar rectangle, we can set up a proportion between the lengths and widths of the two rectangles.

Let's set up the proportion:

Length of smaller rectangle / Length of larger rectangle = Width of smaller rectangle / Width of larger rectangle

3.4 ft / 17 ft = 5.7 ft / x

Cross multiplying, we have:

3.4x = 17 * 5.7

3.4x = 96.9

Dividing both sides by 3.4:

x = 96.9 / 3.4

x ≈ 28.5

Therefore, the width of the larger rectangle is approximately 28.5 ft.

a right isosceles triangle has side lengths of 13.2, 13.2, and 18.6 meters. what is the hypotenuse of a similar triangle with legs 4.4 meters in length

To find the hypotenuse of the similar triangle, we can set up a proportion between the corresponding sides of the two triangles.

Let's set up the proportion:

Leg of the smaller triangle / Leg of the larger triangle = Hypotenuse of the smaller triangle / Hypotenuse of the larger triangle

4.4 m / x = 13.2 m / 18.6 m

Cross multiplying, we have:

4.4 * 18.6 = 13.2 * x

81.84 = 13.2 * x

Dividing both sides by 13.2:

x = 81.84 / 13.2

x ≈ 6.2

Therefore, the hypotenuse of the similar triangle with legs 4.4 meters in length is approximately 6.2 meters.