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HELP!!! PLEASE ANSWER QUICK!!
If ∠S ≅ ∠I, ∠G ≅ ∠A, T − midpoint of SI, prove SG ≅ IA

Angle S ≅ Angle I | Given
Line ST ≅ Line TI | Def. of midpoint
Angle G ≅ Angle A | Given
Triangle STG ≅ Triangle (put the answer here)
Line SG ≅ Line IA | Corresponding parts of congruent triangles are congruent

HELP PLEASE ANSWER QUICK If S I G A T midpoint of SI prove SG IA Angle S Angle I Given Line ST Line TI Def of midpoint Angle G Angle A Given Triangle STG Triang class=

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Eureka1Fa

Answer:

Triangle ITA is the answer.

Step-by-step explanation:

<S = <I means that the triangle IRS is an isoscles.

The midpoint (T) cutting both congruent side length sides at the same angle means that Line TG and Line TA are equal.

Also T being the midpoint means Line TI = Line TS.

Given that angles <G and <A are same.

You can use SSA (side-side-angle) to prove triangles are congruent so line SG is equal to Line IA.

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