Let ABC and ABC' be two non-congruent triangles with sides `AB = 4, AC = AC' = 2 sqrt2` and angle B`= 30^(@)`. The absolute value of the differnce between the area of these triangle is _______

Let ABC and ABC' be two non-congruent triangles with sides AB=4,AC=AC'=2sqrt(2) and angle B=30^(@) .The absolute value of the difference between the areas of these triangles is

Let A B Ca n dA B C ' be two non-congruent triangles with sides A B=4,A C=A C^(prime)=2sqrt(2) and angle B=30^0 . The absolute value of the difference between the areas of these triangles is

Let A B Ca n dA B C ' be two non-congruent triangles with sides A B=4,A C=A C^(prime)=2sqrt(2) and angle B=30^0 . The absolute value of the difference between the areas of these triangles is

Let A B Ca n dA B C ' be two non-congruent triangles with sides A B=4,A C=A C^(prime)=2sqrt(2) and angle B=30^0 . The absolute value of the difference between the areas of these triangles is

Let A B Ca n dA B C ' be two non-congruent triangles with sides A B=4,A C=A C^(prime)=2sqrt(2) and angle B=30^0 . The absolute value of the difference between the areas of these triangles is

Let ABC and AB'C be two non-congruent triangles with sides BC=B'C=5, AC=6, and angleA is fixed. If A_(1) and A_(2) are the area of the two triangles ABC and AB'C, then the value of (A_(1)^(2)+A_(2)^(2)-2A_(1)A_(2)cos 2A)/((A_(1)+A_(2))^(2)) is

Let ABC and AB'C be two non-congruent triangles with sides BC=B'C=5, AC=6, and angleA is fixed. If A_(1) and A_(2) are the area of the two triangles ABC and AB'C, then the value of (A_(1)^(2)+A_(2)^(2)-2A_(1)A_(2)cos 2A)/((A_(1)+A_(2))^(2)) is

Let ABC and AB'C be two non-congruent triangles with sides BC=B'C=5, AC=6, and angleA is fixed. If A_(1) and A_(2) are the area of the two triangles ABC and AB'C, then the value of (A_(1)^(2)+A_(2)^(2)-2A_(1)A_(2)cos 2A)/((A_(1)+A_(2))^(2)) is

ABC is a triangle, where BC = 2AB , angle B = 30^@ and angle A = 90^@ . The magnitude of the side AC is