A B C is a triangle is which B E and C F...

`A B C` is a triangle is which `B E` and `C F` are, respectively, the perpendiculars to the sides `A C` and `A B` . If `B E=C F` , prove that ` A B C` is isosceles.

Similar Questions

Explore conceptually related problems

In Figure, D ,E and F are, respectively the mid-points of sides B C ,C A and A B of an equilateral triangle A B C . Prove that D E F is also an equilateral triangle.

A B C is an isosceles triangle in which A B=A C,B E\ a n d\ C F are its two medians. Show that B E=C Fdot

The bisectors of the angles B and C of a triangle A B C , meet the opposite sides in D and E respectively. If DE||BC , prove that the triangle is isosceles.

A D and B E are respectively altitudes of an isosceles triangle A B C with A C=B C . Prove that A E=B Ddot

If D and E are points on sides A B and A C respectively of a triangle A B C such that D E || B C and B D=C E . Prove that A B C is isosceles.

If A B C is an isosceles triangle with A B=A C . Prove that the perpendiculars from the vertices B and C to their opposite sides are equal.

In Figure, A B=A CdotB E and C F are respectively the bisectors of /_B and /_C . Prove that E B C=F C Bdot

In a triangle A B C , the angles at B and C are acute. If BE and CF be drawn perpendiculars on AC and AB respectively, prove that B C^2=A B*B F+A C*C Edot

In Figure, A B=A CdotB E\ a n d\ C F are respectively the bisectors of /_B and /_C . Prove that E C B \ ~=\ F C B

`A B C` is a triangle is which `B E` and `C F` are, respectively, the perpendiculars to the sides `A C` and `A B` . If `B E=C F` , prove that ` A B C` is isosceles.

Similar Questions

Recommended Questions