Put the steps in order to find the distance between these 2 points.
(-2, 1)
(4, 3)
(7 points)
there are seven steps here are the answer which order do they go in
use the Pythagorean theorem for right triangles to determine the diagonal length 2^2 + 6^2 = c^2
40 = c^2
draw a right triangle by dropping a vertical side and a horizontal side.
squared 40 = squared c^2
squared 40 is between squared 36 and squared 49 so between 6 and 7 - closer to 6 so about 6.3 units
determine the vertical side (2 units) and horizontal side (6 units) lengths by counting on the grid (be careful of the scale), or using the vertical coordinates (3 to 1) and horizontal coordinates (-2 to 4).
4 + 36 = c^2
1. Determine the horizontal and vertical side lengths by counting or using coordinates.
2. Use the Pythagorean theorem to determine the diagonal length squared (a^2 + b^2 = c^2).
3. Square the values for both the horizontal and vertical side lengths.
4. Add the squared values for the horizontal and vertical side lengths.
5. Determine the square root of the sum from step 4 to find the exact distance between the two points.
6. Use the squared values to estimate the approximate distance between the two points.
7. Draw a right triangle to visualize the points and distances.
out of all the answers tell me step 1 thourgh 7 where should they go
1. Determine the horizontal and vertical side lengths by counting or using coordinates.
2. Use the Pythagorean theorem to determine the diagonal length squared (a^2 + b^2 = c^2).
3. Square the values for both the horizontal and vertical side lengths.
4. Add the squared values for the horizontal and vertical side lengths.
5. Determine the square root of the sum from step 4 to find the exact distance between the two points.
6. Use the squared values to estimate the approximate distance between the two points.
7. Draw a right triangle to visualize the points and distances.
use the answers i provided not your own answers i do not understand
1. use the Pythagorean theorem for right triangles to determine the diagonal length 2^2 + 6^2 = c^2
2. squared 40 = squared c^2
3. squared 40 is between squared 36 and squared 49 so between 6 and 7 - closer to 6 so about 6.3 units
4. determine the vertical side (2 units) and horizontal side (6 units) lengths by counting on the grid (be careful of the scale), or using the vertical coordinates (3 to 1) and horizontal coordinates (-2 to 4).
5. 4 + 36 = c^2
what about the other two steps there are 7 steps not 5 and use the answers i provided
1. use the Pythagorean theorem for right triangles to determine the diagonal length 2^2 + 6^2 = c^2
2. squared 40 = squared c^2
3. squared 40 is between squared 36 and squared 49 so between 6 and 7 - closer to 6 so about 6.3 units
4. determine the vertical side (2 units) and horizontal side (6 units) lengths by counting on the grid (be careful of the scale), or using the vertical coordinates (3 to 1) and horizontal coordinates (-2 to 4).
5. 4 + 36 = c^2
6. squared 40 is between squared 36 and squared 49
7. so about 6.3 units
use these answers there a 7 steps
there are seven steps here are the answer which order do they go in
use the Pythagorean theorem for right triangles to determine the diagonal length 2^2 + 6^2 = c^2
40 = c^2
draw a right triangle by dropping a vertical side and a horizontal side.
squared 40 = squared c^2
squared 40 is between squared 36 and squared 49 so between 6 and 7 - closer to 6 so about 6.3 units
determine the vertical side (2 units) and horizontal side (6 units) lengths by counting on the grid (be careful of the scale), or using the vertical coordinates (3 to 1) and horizontal coordinates (-2 to 4).
4 + 36 = c^2
1. Use the Pythagorean theorem for right triangles to determine the diagonal length 2^2 + 6^2 = c^2
2. Draw a right triangle by dropping a vertical side and a horizontal side.
3. Determine the vertical side (2 units) and horizontal side (6 units) lengths by counting on the grid (be careful of the scale), or using the vertical coordinates (3 to 1) and horizontal coordinates (-2 to 4).
4. 4 + 36 = c^2
5. squared 40 = squared c^2
6. squared 40 is between squared 36 and squared 49 so between 6 and 7 - closer to 6 so about 6.3 units