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8 Cards in this Set
- Front
- Back
postulate 1.1
Ruler postulate |
The points on any line can be paired with the real numbers so that, given any 2 points P and Q on the line, P corresponds to zero, and Q corresponds to a positive number.
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postulate 1.2
Segment Addition Postulate |
If Q is between P and R, then PQ + QR = PR. If PQ + QR =PR, then Q is between P and R.
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Postulate 1.3
Protractor postulate |
Given ray AB and a number r between zero and 180, there is exactly one ray with endpoint A, extending on each side of ray AB, such that the measure of the angle formed is r.
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Postulate 1.4
Angle addition postulate |
If R is in the interior of <PQS, then m<PQR + m<QRS = m<PQS. If m<PQR + m<QRS = m<PQS, then R is in the interior of <PQS.
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postulate 1.1
Ruler postulate |
The points on any line can be paired with the real numbers so that, given any 2 points P and Q on the line, P corresponds to zero, and Q corresponds to a positive number.
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postulate 1.2
Segment Addition Postulate |
If Q is between P and R, then PQ + QR = PR. If PQ + QR =PR, then Q is between P and R.
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Postulate 1.3
Protractor postulate |
Given ray AB and a number r between zero and 180, there is exactly one ray with endpoint A, extending on each side of ray AB, such that the measure of the angle formed is r.
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Postulate 1.4
Angle addition postulate |
If R is in the interior of <PQS, then m<PQR + m<QRS = m<PQS. If m<PQR + m<QRS = m<PQS, then R is in the interior of <PQS.
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