The conditional, <span>If four points are non-coplanar, then they are non-collinear, </span>is true:
This is, coplanarity is a necessary condition to be collinear.
The converse, <span>If four points are non-collinear, then they are non-coplanar, is false.
A counterexample that disproves this statement is the 4 vertices of a paralelogram, of course they are in a same plane and are not collinear.
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Hundreds and tens....
I hope this helped
Answer:
65
Step-by-step explanation:
Answer:
YES: All four conditions in BINS have been satisfied.
Step-by-step explanation:
Check out the BINS conditions:
1. Is the number of trials a positive integer? YES
2. Is the experiment binary: either PASS or FAIL? YES
3. Is the probability of success given and in the range 0<p<1? YES
4. Are the outcomes independent? YES
YES: All four conditions in BINS have been satisfied.
