Directions (Q. 57 to 60): Study the given information and answer the questions that follow:

In the given figure ABCD is a trapezium in which DC is parallel to AB. AB = 16 cm and DC = 8 cm, OD = 5 cm, OB = (y + 3) cm, OA = 11 cm and OC = (x − 1) cm.

57. From the given figure name the pair of similar triangles :

1. ΔAOD, ΔOBC

2. ΔCOD, ΔAOB

3. ΔADB, ΔACB

4. ΔCOD, ΔCOB

58. The corresponding proportional sides with respect to the pair of similar triangles obtained above is :

1. $\dfrac{CD}{AB} = \dfrac{OC}{OA} = \dfrac{OD}{OB}$

2. $\dfrac{AD}{BC} = \dfrac{OC}{OA} = \dfrac{OD}{OB}$

3. $\dfrac{AD}{BC} = \dfrac{BD}{AC} = \dfrac{AB}{DC}$

4. $\dfrac{OD}{OB} = \dfrac{CD}{CB} = \dfrac{OC}{OA}$

59. The ratio of the sides of the pair of similar triangles is:

1. 1 : 3

2. 1 : 2

3. 2 : 3

4. 3 : 1

60. Using the ratio of sides of the pair of similar triangles, the values of x and y are respectively :

1. x = 4.6, y = 7

2. x = 7, y = 7

3. x = 6.5, y = 7

4. x = 6.5, y = 2

Assertion (A): In the figure, if ∠EDB = ∠ACB, BE = 6 cm, EC = 4 cm and BD = 5 cm, then the length of AB is 12 cm.

Reason (R): If two triangles have two pairs of corresponding angles equal, then the triangles are similar.

1. A is true, R is false.

2. A is false, R is true.

3. Both A and R are true.

4. Both A and R are false.

Assertion (A): In the figure, ∠ABC = ∠BDC = 90°.
If AD = 4 cm, BD = 6 cm, then area of ΔABC is 40 cm².

Reason (R): Areas of two similar triangles are proportional to the squares of their corresponding sides.

1. A is true, R is false

2. A is false, R is true

3. Both A and R are true

4. Both A and R are false

Assertion (A): In ΔABC, if ∠ABC = ∠DAC, AB = 8 cm, AC = 4 cm, AD = 5 cm, then BC = 3.5 cm.

Reason (R): SAS and ASS both are valid criteria for similarity of two triangles.

1. A is true, R is false

2. A is false, R is true

3. Both A and R are true

4. Both A and R are false