Point A, inside an acute angle, is reflected on either side of the

Given triangle XYZ, YZ=5.0 and W is the midpoint of YZ. Also angle XWY=42 degrees and angle XZW=28 degrees. Explain how to find angle XWY, side XZ, and side XY and then

How should I solve this Trigonometry given b=5cm, A=45°, C=25 find the remaining side angle? - Quora

In the figure, the line segment DF intersects the side AC of a triangle ABC the point E such that E is the midpoint of CA and Box AEF=Box AFE, prove that

Given a point P inside angle ABC, how do you construct a segment XY with endpoints in AB and CB such that P is the midpoint of XY? - Quora

In the rectangle ABCD, the points A, B, E are collinear, E in the extension of AB beyond B, AC=BE and angle CAB=36°. What is the angle AED? - Quora

If the angles of a tower from two points at distant a and b (b > a) from its foot and in the same straight line from it are 60° and 30°

Given triangle XYZ, YZ=5.0 and W is the midpoint of YZ. Also angle XWY=42 degrees and angle XZW=28 degrees. Explain how to find angle XWY, side XZ, and side XY and then

How should I solve this Trigonometry given b=5cm, A=45°, C=25 find the remaining side angle? - Quora

Point A, inside an acute angle, is reflected on either side of the angle to obtain points B and C. Line segment BC intersects the sides of the angles at D and

Bisectors of angles A, B and C of a triangle ABC intersect its circumcircle D, E and F respectively. Prove that the angles of the triangles DEF are {90}^{o}-dfrac{1}{2}A, {90}^{o}-dfrac{1}{2}B and {90}^{o}-dfrac{1}{2}C.

How to prove that the acute angle between two conjugate diameter of an ellipse is minimum when they are equal - Quora

How to solve this question: Prove that the internal bisector of an angle of a triangle divides the opposite sides in the ratio of the sides containing the angle - Quora

If the angles of a tower from two points at distant a and b (b > a) from its foot and in the same straight line from it are 60° and 30°