An informative illustration to complement a statistical query. The key component must be a standard normal distribution curve. It should exhibit distinct regions representing listings 1 - 8, delineated by z-scores from 0 to 1.63, 1.56 to 2.51, -0.76 to 1.35, -0.26 to -1.76, with areas to the left of 2.35, 0.35, 1.85, and to the right of -1.31. The secondary element of the illustration corresponds to requests 9 - 11; three distinct slices in the curve, located from 0.85 to 2.5, -2.10 to 2.10, and -1.10 to -2.43. They should each be visually differentiated. Ensure the categories do not overlap and the image is text-free.

Find the area under the normal curve in each of the following cases.

1. Between z = 0 and z = 1.63
2. Between z = 1.56 and = 2.51
3. Between z = -0.76 and z =1.35
4. Between z= -0.26 and z = -1.76
5. To the left of z = 2.35
6 To the right of z = -1.31
7. To the left of z = 0.35
8. To the left of z = 1.85
B. Find the indicated areas under the normal cueve, then convert it to percentage.
9. What percent of the area under the normal curve is between z=0.85 and x = 2.5?
10. What percent of the he area under the normal curve is between z = -2.10 and z = 2.10?
11. What percent of the area under the normal curve is between z = -1.10 and = -2.43?

Ddx

4. Between z= -0.26 and z = -1.76

To find the area under the normal curve for each of the given cases, you can use either statistical tables or a statistical calculator. I will explain how to find the areas using statistical tables.

1. Between z = 0 and z = 1.63:
First, find the area to the left of z = 1.63 from the z-table. The value is 0.9484. Then find the area to the left of z = 0, which is 0.5. Subtracting the two areas gives us the area between the two z-values, which is 0.9484 - 0.5 = 0.4484.

2. Between z = 1.56 and z = 2.51:
Similar to the previous case, find the area to the left of z = 2.51 from the z-table (0.9941) and the area to the left of z = 1.56 (0.9406). Subtracting these areas gives us 0.9941 - 0.9406 = 0.0535.

3. Between z = -0.76 and z = 1.35:
Find the area to the left of z = 1.35 (0.9115) and the area to the left of z = -0.76 (0.2236). Subtracting these gives us 0.9115 - 0.2236 = 0.6879.

4. Between z = -0.26 and z = -1.76:
Find the area to the left of z = -0.26 (0.3974) and the area to the left of z = -1.76 (0.0392). Subtracting these gives us 0.3974 - 0.0392 = 0.3582.

5. To the left of z = 2.35:
Simply find the area to the left of z = 2.35 from the z-table, which is 0.9900.

6. To the right of z = -1.31:
Subtract the area to the left of z = -1.31 (0.0968) from 1 to get the area to the right of z = -1.31, which is 1 - 0.0968 = 0.9032.

7. To the left of z = 0.35:
Find the area to the left of z = 0.35 from the z-table, which is 0.6368.

8. To the left of z = 1.85:
Find the area to the left of z = 1.85 from the z-table, which is 0.9671.

For the second part of the question:

9. What percent of the area under the normal curve is between z = 0.85 and z = 2.5?
Find the total area between these two z-values using the method explained above (let's say it's A). Then, convert it to a percentage by multiplying A by 100.

10. What percent of the area under the normal curve is between z = -2.10 and z = 2.10?
Similar to the previous question, find the total area between these two z-values (let's call it B). Convert B to a percentage by multiplying it by 100.

11. What percent of the area under the normal curve is between z = -1.10 and z = -2.43?
Again, find the total area between these two z-values (let's call it C). Convert C to a percentage by multiplying it by 100.

Between z=0 and z=1.62

Where is the answer key

✌️✌️❤️❤️

Use your stats tables to locate your answers : ) Remember that your tables read less than : )

Math

Give me good answer

Answer