The question seems to be missing some information or is not properly formatted, making it difficult to understand. However, if ABCD and PQRS are similar quadrilaterals, it means their corresponding sides are proportional.

If we assume that AD corresponds to PS, BC to QR, and so on, we can set up the following proportion to solve for x:

AD/PS = BC/QR

Substituting the given values:

5324/3.52 = 2.11/x

Cross-multiplying gives:

5324*x = 3.52*2.11

Solving for x gives:

x = (3.52*2.11) / 5324

Please check the question and provide the correct and complete details.

Question

The question seems to be missing some information or is not properly formatted, making it difficult to understand. However, if ABCD and PQRS are similar quadrilaterals, it means their corresponding sides are proportional.

If we assume that AD corresponds to PS, BC to QR, and so on, we can set up the following proportion to solve for x:

AD/PS = BC/QR

Substituting the given values:

5324/3.52 = 2.11/x

Cross-multiplying gives:

5324*x = 3.52*2.11

Solving for x gives:

x = (3.52*2.11) / 5324

Please check the question and provide the correct and complete details.

Knowee AI · Accepted Answer

The question seems to be missing some information or is not properly formatted, making it difficult to understand. However, if ABCD and PQRS are similar quadrilaterals, it means their corresponding sides are proportional.

If we assume that AD corresponds to PS, BC to QR, and so on, we can set up the following proportion to solve for x:

AD/PS = BC/QR

Substituting the given values:

5324/3.52 = 2.11/x

Cross-multiplying gives:

5324*x = 3.52*2.11

Solving for x gives:

x = (3.52*2.11) / 5324

Please check the question and provide the correct and complete details.

The quadrilaterals ABCD and PQRS are similar.Find the length x of SP.AD5324BCPS3.52.11.4xQR

Question

The quadrilaterals ABCD and PQRS are similar.

Solution

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