The mean age of nine boys is 28 years and if one new boy joins them the mean age increases by one.

Assertion(A): The age of new boy is (29 x 10 - 28 x 9) years.

Reason(R): The age of new boy is (29 - 28) x 10 years.

1. A is true, R is false.

2. A is false, R is true.

3. Both A and R are true and R is correct reason for A.

4. Both A and R are true and R is incorrect reason for A.

Data = 37, 41, 56, 62, 70, 74, 81, 89, 95 and 90.

Assertion(A): Median = 72.

Reason(R): If number of data(n) is odd, the median = $\Big(\dfrac{n + 1}{2}\Big)^{th}$ term.

1. A is true, R is false.

2. A is false, R is true.

3. Both A and R are true and R is correct reason for A.

4. Both A and R are true and R is incorrect reason for A.

Data : 9, 11, 15, 19, 17, 13 and 7

Statement (1): For the given data, lower quantile is 11.

Statement (2): For data with n terms, the lower quantile is $\Big(\dfrac{n + 1}{4}\Big)^{th}$ term, if n is odd.

1. Both the statements are true.

2. Both the statements are false.

3. Statement 1 is true, and statement 2 is false.

4. Statement 1 is false, and statement 2 is true.

The mean of given data is 26.

Statement (1): x = 26.

Statement (2): 26 = $\dfrac{10 \times 20 + 30 \times x + 50 \times 10}{30 + x}$.

1. Both the statement are true.

2. Both the statement are false.

3. Statement 1 is true, and statement 2 is false.

4. Statement 1 is false, and statement 2 is true.