Ceva Theorem Proof Calculator

The Ceva Theorem states that in a given triangle ABC, in which the points F,E, and G lie on lines CB, BA, and AC respectively, the lines AF, CE and BG are concurrent iff (BE/EA)×(AG/GC)×(CF/FB) = 1.

Enter BE Value

Enter EA Value

Enter AG Value

Enter GC Value

Enter CF Value

Enter FB Value

Results...

BEEA × AGGC × CFFB

1.24.19 × 4.533.26 × 4.651.85

= 0.29 × 1.39 × 2.51

= 1

Hence,

BEEA × AGGC × CFFB = 1

Ceva's Theorem Formula:

The Ceva Theorem states that in a given triangle ABC, in which CE, BG and AF be a cevians that forms a concurrent point i.e. D.

Then according to Cevas theorem,

BEEA × AGGC × CFFB^{= 1}

Cevas theorem is a theorem regarding triangles in Euclidean Plane Geometry.

Download Ceva's Theorem pdf

Here is pdf document explained the proof of cevas theorem.

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