For parts (d), (e), and (f), convert the z intervals to x intervals. (For each answer, enter a number. Round your answers to one decimal place.) -2.17 < z (Fill in the blank. A blank is represented by (d) (e) z< 1.28 -1.99 < z< 1.44 (Fill in the blanks. A blank is represented by There are two answer blanks.) (f) first blank second blank (g) If a fawn weighs 14 kilograms, would you say it is an unusually small animal? Explain using z values and the figure above. O Yes. This weight is 3.21 standard deviations below the mean; 14 kg is an unusually low weight for a fawn. Yes. This weight is 1.61 standard deviations below the mean; 14 kg is an unusually low weight for a fawn. No. This weight is 3.21 standard deviations below the mean; 14 kg is a normal weight for a favwn. O No. This weight is 3.21 standard deviations above the mean; 14 kg is an unusually high weight for a fawn. No. This weight is 1.61 standard deviations above the mean; 14 kg is an unusually high weight for a fawn. (h) If a fawn is unusually large, would you say that the z value for the weight of the fawn will be close to 0, -2, or 3? Explain. O It would have a large positive z, such as 3. It would have a negative z, such as -2. It would have a z of 0. Fawns between 1 and 5 months old have a body weight that is approximately normally distributed vith mean u = 26.2 kilograms and standard deviation o = 3.8 kilograms. Let x be the weight of a fawn in kilograms. The Standard Normal Distribution (u = 0, o - 1) -2 -5 68% of area 95% of area 99.7% of area For parts (a), (b), and (c), convert the x intervals to z intervals. (For each answer, enter a number. Round your answers to two decimal places.) (a) x< 30 z<84 19 < x (Fill in the blank. A blank is represented by (Ь) |-1.89 32 < x < 35 (Fill in the blanks. A blank is represented by (c) There are two answer blanks.) first blank second blank
Unitary Method
The word “unitary” comes from the word “unit”, which means a single and complete entity. In this method, we find the value of a unit product from the given number of products, and then we solve for the other number of products.
Speed, Time, and Distance
Imagine you and 3 of your friends are planning to go to the playground at 6 in the evening. Your house is one mile away from the playground and one of your friends named Jim must start at 5 pm to reach the playground by walk. The other two friends are 3 miles away.
Profit and Loss
The amount earned or lost on the sale of one or more items is referred to as the profit or loss on that item.
Units and Measurements
Measurements and comparisons are the foundation of science and engineering. We, therefore, need rules that tell us how things are measured and compared. For these measurements and comparisons, we perform certain experiments, and we will need the experiments to set up the devices.
I'm having trouble figuring out how to solve this problem.
Trending now
This is a popular solution!
Step by step
Solved in 4 steps with 4 images