The average height of sunflowers in a field is 64 inches. With a standard deviation of 3.5 inches. On a piece of paper, draw a normal curve for the distribution, including the values on the horizontal axis at one, two, and three standard deviation from the mean. Describe your drawing in as much detail as possible and explain how you came up with each of your labels.

To draw the normal curve, we start by placing the mean at the center of the axis. In this case, the mean is 64 inches. Then, we draw a vertical line at the mean, which represents the highest point on the curve. We label this line "mean" or "μ".

Next, we add the standard deviations to the axis, which are represented as the number of units away from the mean. Since the standard deviation is 3.5 inches, we draw two lines, one at 60.5 inches (which is 1 standard deviation below the mean) and one at 67.5 inches (which is 1 standard deviation above the mean). We label these lines "+1σ" and "-1σ", respectively.

Next, we draw two more lines at 57 inches and 71 inches, which are 2 standard deviations below and above the mean, respectively. We label these lines "-2σ" and "+2σ". Finally, we draw two more lines at 53.5 inches and 74.5 inches, which are 3 standard deviations below and above the mean, respectively. We label these lines "-3σ" and "+3σ".

The resulting curve should be a bell-shaped curve that is symmetrical around the mean.

To estimate how many pants will be taller than 71 inches, we need to calculate the z-score for this value, which tells us how many standard deviations away from the mean 71 inches is. To do this, we use the formula:

z = (x - μ) / σ

where x is the value we're interested in (71 inches), μ is the mean (64 inches), and σ is the standard deviation (3.5 inches).

Plugging in the numbers, we get:

z = (71 - 64) / 3.5 = 2

This means that 71 inches is 2 standard deviations above the mean. Looking at our normal curve, we can see that the area to the right of +2σ represents the percentage of pants that are taller than 71 inches. Using a standard normal distribution table, we can find that this area is approximately 2.28%.

Therefore, out of 3000 pants, we can estimate that approximately 68.4 will be taller than 71 inches (2.28% of 3000).