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20 Cards in this Set
- Front
- Back
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Points a & b form line h. |
Points first- Through any two points, there is exactly one line. |
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Points a, b, and c make up plane f. |
Points first-through any three noncollinear points, there is exactly one plane. |
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Line h is made out of points a & b. |
Line first- a line contains atleast two points. |
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Plane f contains points a b and c. |
Plane first- a plane contains atleast threw noncollinear points. |
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Point a& c are in plane f. Point A & c make up line h. |
If two points lie in a plane then the entire line containing those points lies in the plane. |
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Point a intersects point b at point g. |
If two lines intersect then their intersection is exactly one point. |
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Plane f and plane t intersect at line h. |
If two planes intercect then their intersection is a line. |
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Converse |
Switch |
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Inverse |
Negate-negative |
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Contrapositive |
Switch and negate |
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Conditional |
Can be written in if-then form |
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Hypothesis |
If portion of conditional statement |
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Conclusion |
Then part of conditional statement |
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Bioconditional |
A statement that contains the phrase if and only if(its like writing a conditional and its converse) |
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Deductive reasoning |
Uses facts..definitions and accepted properties in a logical order to write a logical document.(uses rules of logic to reach a conclusion) |
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Inductive reasoning |
Uses previous examples and patterns to form a conjecture(conclusions arrived at by inductive reasoning abd lack in logic) |
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Law of detachment |
If p->q is a true conditional statement and p is true then q is true(need hypothesis information) |
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Law of sullogism |
Is p->q and q->r are true conditional statementst hen p->r is true. |
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Angle addition postulate |
Is p is in the interior of <rst then m<rsp + m<pst = m<rst. |
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Line segmant postulate |
If m is between p and q then pm+mq = pq |
