Ask a New Question

Question

Given triangle ABC with vertices A(-6, -2), B(2,8), and C(6, -2). Line AB has midpoint D, line BC has midpoint E, and line AC has midpoint F.
Which of the following statements is true?
1. ADEF is only a parallelogram
2. ADEF is a rhombus
3. ADEF is a rectable but not a parallelogram
4. ADEF is not a parallelogram
13 years ago

Answers

Steve
(1) because while AD || EF, AD=6 and AF = √41
13 years ago

Related Questions

Given triangle XYZ with vertices X(-2,0),Y(6,0), and Z(4,8), find the number of square units in its... graph triangle rst with vertices r(-1,3),s(4,-2), t(2,-5) Draw the image triangle r's't' formed by... given triangle PQR with vertices P(0,-8), Q(4,-9) and R(-2,-3), find the length of the midsegment co... a parallelogram has the vertices (0,3), (3,0), (o,-3), and (-3,0). determine what type of parallelog... let a and b be opposite vertices of a unit cube (i.e. , the distance between a and b is the square... Given triangle DEF with vertices D(-3;6) ,E(-2;-3) and F(x;1) with DE=DF, determine the value of x How to get the foci and vertices of an ellipse with the equation of (x+3)^2/24 + (y-5)^2/49=1? Triangle ABC A B C has vertices point A (−2,4) A ( − 2 , 4 ) , point B (−6,8) B ( − 6 , 8 ) , a...
Ask a New Question
Archives Contact Us Privacy Policy Terms of Use