WILL GIVE BRAINLIEST! LOTS OF POINTS! MULTIPLE CHOICE Triangle ABC is a right triangle. Point D is the midpoint of side AB, and point E is the midpoint of side AC. The measure of ∠ADE is 47°. The proof, with a missing reason, proves that the measure of ∠ECB is 43°. Statement Reason m∠ADE = 47° Given m∠DAE = 90° Definition of a right angle m∠AED = 43° ? segment DE joins the midpoints of segment AB and segment AC Given segment DE is parallel to segment BC Midsegment of a Triangle Theorem ∠ECB ≅ ∠AED Corresponding angles are congruent m∠ECB = 43° Substitution property Which theorem can be used to fill in the missing reason? A. Concurrency of Medians Theorem B. Isosceles Triangle Theorem C. Triangle Inequality Theorem D. Triangle Sum Theorem

I believe it is that since we are given two angles, D is 47 and A is 90. Using the Triangle Sum Theorem, we know that a triangle's angles equals to 180 degrees so, 90+47=137, then 180-137=43.

Hope this helps!!! PLZ MARK BRAINLIEST!!!

Answer Link

arshikhan8123 arshikhan8123 · Answer 2 · 2022-07-01T15:42:47+02:00

Triangle Sum Theorem is used to fill in the missing reason.

Do triangles add up to 180 or 360?

The angle sum of a triangle will constantly be equal to 180°. The attitude sum of a quadrilateral is the same as 360°, and a triangle can be created by way of reducing a quadrilateral in half from corner to corner. since a triangle is largely half of a quadrilateral, its angle measures should be half as properly. half of 360° is 180°.

Why is the sum of a triangle usually 180?

The angles of the triangle continually upload up to 1800 tiers due to the fact one outside attitude of the triangle is the same as the sum of the alternative two angles inside the triangle. when all of the angles are delivered up, the sum acquired should be a hundred and eighty ranges.

Learn more about Triangle Sum Theorem here https://brainly.com/question/7696843

#SPJ2