QUESTION IMAGE
Question
complete the proof by choosing the correct
eason\.
given: ( cf = eg )
( df = fg )
prove: ( cd = ef )
| statement | reason |
|---|---|
| 2 ( eg = ef + fg ) | reason |
| 3 ( cf = eg ) | given, reflexive property, transitive property, addition and subtraction properties, multiplication and division properties, substitution property, definition of congruent segments, segment addition property, definition of congruent angles, angle addition property |
| 4 ( cd + df = ef + fg ) | given, reflexive property, transitive property, addition and subtraction properties, multiplication and division properties, substitution property, definition of congruent segments, segment addition property, definition of congruent angles, angle addition property |
| 5 ( df = fg ) | given, reflexive property, transitive property, addition and subtraction properties, multiplication and division properties, substitution property, definition of congruent segments, segment addition property, definition of congruent angles, angle addition property |
| 6 ( cd + fg = ef + fg ) | given, reflexive property, transitive property, addition and subtraction properties, multiplication and division properties, substitution property, definition of congruent segments, segment addition property, definition of congruent angles, angle addition property |
| 7 ( cd = ef ) | given, reflexive property, transitive property, addition and subtraction properties, multiplication and division properties, substitution property, definition of congruent segments, segment addition property, definition of congruent angles, angle addition property |
Step1: Match statement 1 to reason
The statement $CF = CD + DF$ states that a segment is equal to the sum of its two adjacent sub-segments, which fits the Segment Addition Property.
Step2: Match statement 2 to reason
The statement $EG = EF + FG$ follows the same logic as step 1, so it also uses the Segment Addition Property.
Step3: Match statement 3 to reason
The statement $CF = EG$ is explicitly provided as a given condition, so the reason is Given.
Step4: Match statement 4 to reason
Substitute $CF=CD+DF$ and $EG=EF+FG$ into $CF=EG$, so this uses the Substitution Property.
Step5: Match statement 5 to reason
The statement $DF = FG$ is explicitly provided as a given condition, so the reason is Given.
Step6: Match statement 6 to reason
Substitute $DF=FG$ into $CD + DF = EF + FG$, so this uses the Substitution Property.
Step7: Match statement 7 to reason
Subtract $FG$ from both sides of $CD + FG = EF + FG$, which uses the Addition and Subtraction Properties.
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- Segment Addition Property
- Segment Addition Property
- Given
- Substitution Property
- Given
- Substitution Property
- Addition and Subtraction Properties