Category | Theorem | % Correct |
---|---|---|
6-3 | If one {angle} of a {triangle} is larger than a {second} {angle}, then the {side} {opposite} the {first} {angle} is longer than the {side} opposite the {second} {angle}. | 50%
|
6-2 | If one {side} of a {triangle} is longer than a {second} {side}, then the {angle} {opposite} the {first} {side} is larger than the {angle} {opposite} the {second} {side}. | 50%
|
6-1 | The {measure} of an {exterior} {angle} of a {triangle} is greater than the {measure} of either {remote} {interior} {angle}. | 50%
|
6-5 | If {two} {sides} of {one} {triangle} are {congruent} to {two} {sides} of {another} {triangle}, but the {included} {angle} of the {first} {triangle} is {larger} than the {included} {angle} of the {second},then the {third} {side} of the {first} {triangle} is {longer} than the {third} {side} of the {second} {triangle}. | 0%
|
6-6 | If {two} {sides} of {one} {triangle} are {congruent} to {two} {sides} of {another} {triangle}, but the {third} {side} of the {first} {triangle} is {longer} than the {third} {side} of the {second},then the {included} {angle} of the {first} {triangle} is {larger} than the {included} {angle} of the {second}. | 0%
|
Corollaries | The {perpendicular} {segment} from a {point} to a {line} is the {shortest} {segment} from the {point} to the {line}. | 0%
|
Corollaries | The {perpendicular} {segment} from a {point} to a {plane} is the {shortest} {segment} from the {point} to the {plane}. | 0%
|
6-4 | The {sum} of the {lengths} of any {two} {sides} of a {triangle} is {greater} than the {length} of the {third} {side}. | 0%
|
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