The heights of a random sample of 1000 students were collected and recorded - Leaving Cert Mathematics - Question 9 - 2015

To find the mean height, we will calculate the midpoints for each height category and then determine the weighted average. The midpoints are:

• 145-150 cm: 147.5 cm
• 150-155 cm: 152.5 cm
• 155-160 cm: 157.5 cm
• 160-165 cm: 162.5 cm
• 165-170 cm: 167.5 cm
• 170-175 cm: 172.5 cm
• 175-180 cm: 177.5 cm
• 180-185 cm: 182.5 cm

Now calculating the mean:

$ext{Mean} = \frac{\sum (midpoint \times frequency)}{\text{Total frequency}} = \frac{(147.5 \times 15) + (152.5 \times 48) + (157.5 \times 80) + (162.5 \times 112) + (167.5 \times 125) + (172.5 \times 81) + (177.5 \times 29) + (182.5 \times 10)}{500} = \frac{82215}{500} = 164.43 \text{ cm}$

The largest possible value for the range can be calculated by subtracting the lowest height from the highest height. The lowest category is 145 cm and the highest is 185 cm. Thus, the range is:

$\text{Range} = 185 - 145 = 40 \text{ cm}$

The median height of 164.5 cm indicates that half of the 500 girls are shorter than or equal to 164.5 cm and the other half are taller than or equal to this height. This provides a useful measure of the central tendency of the girls' heights.

To find the percentage, we calculate:

• For 145-150 cm: (rac{15}{500} \times 100 = 3.0%)
• For 150-155 cm: (rac{48}{500} \times 100 = 9.6%)
• For 155-160 cm: (rac{80}{500} \times 100 = 16.0%)
• For 160-165 cm: (rac{112}{500} \times 100 = 22.4%)
• For 165-170 cm: (rac{125}{500} \times 100 = 25.0%)
• For 170-175 cm: (rac{81}{500} \times 100 = 16.2%)
• For 175-180 cm: (rac{29}{500} \times 100 = 5.8%)
• For 180-185 cm: (rac{10}{500} \times 100 = 2.0%)

The histogram would have height categories on the x-axis and percentage of girls on the y-axis. Each bar would correspond to the height ranges with the appropriate percentages calculated previously.

Yes, the histograms support John's claim. The area of the bar for the category 175-180 in the boys' histogram is approximately twice the area of the corresponding category in the girls' histogram.

No, the histograms do not support this claim. The combined areas of the height categories from 165 cm onwards show a greater number of boys compared to the number of girls, indicating that there are more boys than girls taller than 165 cm.

Using the Empirical Rule, approximately 95% of the boys' heights will fall within two standard deviations of the mean. Therefore, we calculate:

$166.7 \pm 2(8.9) = [166.7 - 17.8, 166.7 + 17.8] = [148.9, 184.5]$

The standard deviation indicates the variability of height within each group. A smaller standard deviation for girls (7.7 cm) suggests that the heights of the girls are more clustered around the mean compared to boys, who have a greater variability in their heights (8.9 cm). This indicates that there is more diversity in boys' heights than in girls' heights.