Three.
If points A, B, and C are not on the same line, they determine a single plane.
In a set of seven points labeled A, B, C, D, E, F, and G, the number of segments that can be formed by connecting any two points is given by the combination formula ( C(n, 2) ), where ( n ) is the total number of points. For 7 points, this is ( C(7, 2) = \frac{7!}{2!(7-2)!} = 21 ). Therefore, 21 segments can be named using the points A, B, C, D, E, F, and G.
In the given scenario, points A, B, C, and D are reflected across a line or point to coincide with points G, J, I, and H, respectively. This reflection implies that each original point and its corresponding reflected point are equidistant from the line of reflection. Therefore, the positions of points A, B, C, and D are symmetrically opposite to points G, J, I, and H concerning the line of reflection. This geometric relationship highlights the properties of reflection in a coordinate plane.
Without access to Figure 135 or specific details about the mutations represented by A, B, C, and D, I cannot provide the exact term describing the type of mutations. However, common mutation types include point mutations, insertions, deletions, and duplications. If you can provide more context or describe the mutations, I would be happy to help identify the appropriate term.
(b b b)( b b b )(b d g a)(b....)(c c c c)(c b b b)(a a a b)(a...d)(b b b)(b b b)(b d g a)(b....)(c c c c)(c b b b)(d d c a)(g.....)
Three noncollinear points A, B, and C determine exactly three lines. Each pair of points can be connected to form a line: line AB between points A and B, line AC between points A and C, and line BC between points B and C. Thus, the total number of lines determined by points A, B, and C is three.
LEG!
If points B and C are collinear, it means that they lie on the same straight line. To determine if points B and C are collinear, you would need to know the coordinates or have a visual representation of the points.
exactly one
term c
A-B-C
# 1
Probably an arc, but it is not possible to be certain because there is no information on where or what point b and c are..
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a,b b,d c,c, d,a
Three noncollinear points ( A ), ( B ), and ( C ) determine exactly three lines: line ( AB ), line ( BC ), and line ( AC ). Each pair of points defines a unique line, and since the points are noncollinear, no two lines coincide. Thus, the total number of lines determined by points ( A ), ( B ), and ( C ) is three.
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