Use proportions to find the missing side length ( x ) in the two similar figures.

To find the missing side length (x), we can set up a proportion using the corresponding sides of the two similar figures:

\( \frac{4}{9.99} = \frac{x}{16.92} \)

Cross multiply to solve for x:
\( 4 * 16.92 = 9.99 * x \)
\( 67.68 = 9.99x \)
\( \frac{67.68}{9.99} = x \)
\( x = 6.773 \)

Therefore, the missing side length (x) is approximately 6.773 yards.

13 yds what does the x mean
9.99
4
1.92
1.05

To find the missing side length (x), we can set up a proportion using the corresponding sides of the two similar figures:

\( \frac{4}{9.99} = \frac{x}{13} \)

Cross multiply to solve for x:
\( 4 * 13 = 9.99 * x \)
\( 52 = 9.99x \)
\( \frac{52}{9.99} = x \)
\( x \approx 5.205 \)

Therefore, the missing side length (x) is approximately 5.205 yards.

A rectangle has a length of 25 cm and a width of 12.25 cm. A larger, similar rectangle has width 49 cm. What is the length of the larger rectangle?(1 point)
Responses

4 cm
4 cm

24.01 cm
24.01 cm

98 cm
98 cm

100 cm

To find the length of the larger rectangle, we can set up a proportion using the corresponding sides of the two similar rectangles:

\( \frac{25}{12.25} = \frac{x}{49} \)

Where x represents the length of the larger rectangle.

Cross multiply to solve for x:
\( 25 * 49 = 12.25 * x \)
\( 1225 = 12.25x \)
\( \frac{1225}{12.25} = x \)
\( x = 100 \)

Therefore, the length of the larger rectangle is 100 cm.

△CDE∼△PQR . CD=9 m , EC=15 m , PQ=15 m . What is the length of RP¯¯¯¯¯¯¯¯ ?(1 point)
Responses

0.6 m
0.6 m

25 m
25 m

30 m
30 m

9 m

To find the length of RP, we can set up a proportion using the corresponding sides of the two similar triangles:

\( \frac{CD}{PQ} = \frac{DE}{QR} \)

Given values:
CD = 9 m
PQ = 15 m

Now we can set up the proportion:
\( \frac{9}{15} = \frac{15}{x} \)

Cross multiply to solve for x:
\( 9 * x = 15 * 15 \)
\( 9x = 225 \)
\( x = \frac{225}{9} \)
\( x = 25 \)

Therefore, the length of RP is 25 m.

Which statement represents the similarity between the two figures?

(1 point)
Responses

quadrilateral DCBA ∼ quadrilateral GEFH
quadrilateral upper D upper C upper B upper A tilde quadrilateral upper G upper E upper F upper H

quadrilateral DCBA ∼ quadrilateral HGFE
quadrilateral upper D upper C upper B upper A tilde quadrilateral upper H upper G upper F upper E

quadrilateral ABCD ∼ quadrilateral EFGH
quadrilateral upper A upper B upper C upper D tilde quadrilateral upper E upper F upper G upper H

quadrilateral ABCD ∼ quadrilateral HGFE

The correct statement that represents the similarity between the two figures is:

quadrilateral ABCD ∼ quadrilateral EFGH
quadrilateral ABCD ~ quadrilateral EFGH

This statement indicates that the quadrilateral ABCD is similar to the quadrilateral EFGH.