Posted by **Michele** on Wednesday, November 10, 2010 at 5:50pm.

You have isosceles triangle WXY and segment WZ is the perpendicular bisector of segment XY. You have to prove triangle WXY isosceles in only three steps using the theorem: If a point is on the perpendicular bisector of a segment, then it is equidistant from the endpoints of that segment. Can someone please help me?

## Answer This Question

## Related Questions

- another geometry question - BD is a perpendicular bisector of triangle ABC. XZ ...
- geometry - BD is a perpendicular bisector of triangle ABC. XZ is a perpendicular...
- Geometry - BD is a perpendicular bisector of triangle ABC. XZ is a perpendicular...
- geometry - I need to figure out this proof, the figure is two triangles forming ...
- geometry - Prove that you have constructed point C on segment EF such that angle...
- 8th grade geometry - segment AC is congruent to segment AD by the ______ of the ...
- geometry - If two medians of a triangle are equal, prove that the triangle ...
- geometry - Triangle ABC with an area of 243 cm2 is similar to WXY. If BD...
- Geometry - Triangle XYZ below is an isosceles triangle with legs XY and ZY. QR ...
- corollary to isosceles triangle theorem - how to prove 1)the measure of each ...

More Related Questions