In a regular hexagon `ABCDEF, bar(AB) + bar(AC)+bar(AD)+ bar(AE) + bar(AF)=k bar(AD)` then k is equal to

In a regular hexagon ABCDEF, prove that AB+AC+AD+AE+AF=3AD.

In the adjacent figure DeltaABC is isosceles as bar(AB) = bar(AC), bar(BA) and bar(CA) are produced to Q and P such that bar(AQ) = bar(AP) . . Show that bar(PB) = bar(QC) .

If |z+bar(z)|+|z-bar(z)|=8 then z lies on

In the following figure, if bar(AC)=bar(BD) , then prove that bar(AB)=bar(CD) .

If P(A)=0.05 the P(bar(A)) is

A and B are two events such that P(A) gt 0, P(B) != 1 then P(bar(A)//bar(B)) is equal to :

In the adjacent figure DeltaABC and DeltaDBC are two triangles such that bar(AB) = bar(BD) and bar(AC) = bar(CD) . Show that DeltaABC ~= DeltaDBC.

The non-zero vectors bar(a) , bar(b) , bar(c ) holds | (bar(a) .bar(b) ).bar( c) |=| bar(a) ||bar(b)|| bar( c) if

In the given figure three lines bar(AB) , bar(CD) and bar(EF) intersecting at O. Find the values of x, y and z it is being given that x : y : z = 2 : 3 : 5