Points a b and c are collinear so therefore they are noncoplanar it's number 7 help
2 answers:
Answer:
The figure 1 shows the counter example.
Step-by-step explanation:
Consider the provided information.
It is given that the points a b and c are noncollinear and we need to give a counter example
Noncollinear Points: Points not lying in the same straight line are called Noncollinear Points.
Noncoplanar Points: Points not lying in the same plane are called Noncoplanar Points.
we need to give a counter example;
Consider the figure 1:
The point A, B, and C are noncollinear points and drawn in a same plane
through all three points.
Hence the figure 1 shows the counter example.
You might be interested in
Answer:
a) P(three tails) =
b) P(two tails followed by one head) =
Step-by-step explanation:
coin is tossed three times so, outcome is
HHH, TTT, HTH, THH, HHT, THT, TTH, HTT.
Hence sample space will be
S = {HHH, TTT, HTH, THH, HHT, THT, TTH, HTT}
chance of getting three tails is '1' i.e. TTT
hence,
P(three tails) =
two tails followed by one head is TTH
so, chance of getting that outcome is also '1'
hence,
P(two tails followed by one head) =