Given two sets:

• Set $A$ has median $m_1 = 2$
• Set $B$ has median $m_2 = 4$

What can we say about the median of the combined set $A \cup B$?

✅ Answer:

The combined median depends on the size and values of both sets.

Without that information, we only know that:

So, the exact median cannot be determined with the given data.

Mean, Median, and Mode Relation

Given:

• Mean = 1
• Median = $3^x$
• Mode = $9^x$

Use empirical formula:

Let $y = 3^x$, then:

So, $y = 1 \text{ or } 2 \Rightarrow 9^x = y^2 = 1 \text{ or } 4$

✅ Final Answer: $\boxed{1 \text{ or } 4}$

Corrected Mean and Standard Deviation

Original Mean: 40, Standard Deviation: 15

Two scores were misread: 25 → 52 and 35 → 53

Corrected Mean:

$\mu' = \frac{3955}{100} = \boxed{39.55}$

Corrected Standard Deviation:

$\sigma' = \sqrt{\frac{178837}{100} - (39.55)^2} \approx \boxed{14.96}$

✅ Final Answer: Mean = 39.55, Standard Deviation ≈ 14.96

Median & Frequency Table

Given: Median = 42.6, Total Frequency = 685

Using Median Formula:

$\text{Median} = L + \left( \frac{N/2 - F}{f} \right) \cdot h$

• Median Class: 40–50
• Lower boundary $L = 40$
• Frequency $f = 180$
• Class width $h = 10$
• Cumulative freq before median class $F = 214 + f_1$

Substituting values:

$42.6 = 40 + \left( \frac{128.5 - f_1}{180} \right) \cdot 10 \Rightarrow f_1 = \boxed{82}$

Using total frequency:

$662 + f_2 = 685 \Rightarrow f_2 = \boxed{23}$

✅ Final Answer: $f_1 = 82,\quad f_2 = 23$