Witch is a set of collinear points
A.G,H,J
B.H,L,G
C.G,I,K
D.K,J,G
Unit 2 lesson 11 6b please help :((((((((
The answer is C. G,I,K
thx
what are all the questions
whats the whole test
control w closes a window lol
i know that without trying it
I figured that out
OK but the test answer
To determine which set of points is collinear among A, B, C, and D, we can use the collinearity test.
The collinearity test states that if three points are collinear, then the slope of the line passing through any two of the points will be the same.
Let's apply this test to the given sets of points:
Set A: G, H, J
To check the collinearity of these points, we can find the slope between G and H, and between G and J.
Slope of GH = (H_y - G_y) / (H_x - G_x)
Slope of GJ = (J_y - G_y) / (J_x - G_x)
Set B: H, L, G
To check the collinearity of these points, we can find the slope between H and L, and between H and G.
Slope of HL = (L_y - H_y) / (L_x - H_x)
Slope of HG = (G_y - H_y) / (G_x - H_x)
Set C: G, I, K
To check the collinearity of these points, we can find the slope between G and I, and between G and K.
Slope of GI = (I_y - G_y) / (I_x - G_x)
Slope of GK = (K_y - G_y) / (K_x - G_x)
Set D: K, J, G
To check the collinearity of these points, we can find the slope between K and J, and between K and G.
Slope of KJ = (J_y - K_y) / (J_x - K_x)
Slope of KG = (G_y - K_y) / (G_x - K_x)
Compare the slopes of the lines formed by the pairs of points in each set. If the slopes are the same, then the points are collinear.
After calculating the slopes for each set, we can determine which set(s) of points have the same slope for both pairs. The set(s) with the same slopes in both pairs will be the collinear set(s).
Please provide the values of the coordinates (x, y) for each point in sets A, B, C, and D so that we can complete the calculations and determine the collinear set(s).