Put the steps in order to find the distance between these 2 points.(7 points)Put responses in the correct input to answer the question. Select a response, navigate to the desired input and insert the response. Responses can be selected and inserted using the space bar, enter key, left mouse button or touchpad. Responses can also be moved by dragging with a mouse.Step 1Step 2Step 3Step 4Step 5Step 6Step 7Use the Pythagorean Theorem for right triangles to determine the diagonal length: 22+62=c222+62=c2 40=c240=c2Draw a right triangle by dropping a vertical side and a horizontal side.40−−√=c2−−√40=c240−−√40is between 36−−√36 and 49−−√49, so between 6 and 7 - closer to 6, so about 6.3 unitsDetermine 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=c2.
Step 1
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).
-2,6
Step 2
Use the Pythagorean Theorem for right triangles to determine the diagonal length: 22+62=c^2
40=c^2
Step 3
Calculate c
√40=6.3
Step 4
Draw a right triangle by dropping a vertical side and a horizontal side.
Drop a vertical side and horizontal side
Step 5
40=c^2
Step 6
40=c^2
Step 7
40=c^2
wrong
Step 1
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).
Step 2
Use the Pythagorean Theorem for right triangles to determine the diagonal length: 2^2 + 6^2 = c^2
c = sqrt(40)
Step 3
Calculate c:
√40 ≈ 6.32
Step 4
Draw a right triangle by dropping a vertical side and a horizontal side.
Step 5
40 = c^2
Step 6
c ≈ 6.32 units
Step 7
The approximate distance between the two points is 6.32 units.