if O is a point in the exterior of triangle ABC show that 2 + OB + OC is greater than a b + BC + CA
Answers
Answer:
Hi there,
I think that the question above has some missing part in it. So I am considering that we have to prove
2[OA+OB+OC] > AB+BC+CA
Given data:
O is a point in the exterior of triangle ABC
To prove: 2 [OA + OB + OC] > AB + BC + CA
We know that the sum of any two sides of a triangle is greater than the third side. Therefore, from the figure attached below, let us consider :
1. In ∆ OAB,
OA + OB > AB …… (i)
2. In ∆ OCB,
OB + OC > BC ….. (ii)
3. In ∆ OAC,
OA + OC > CA …. (iii)
Now, adding equation (i), (ii) & (iii), we get
[OA + OB + OB + OC + OA + OC] > [AB + BC + CA]
Or, [(2*OA) + (2*OB) + (2*OC)] > [AB + BC + CA]
Or, 2 [OA + OB + OC] > [AB + BC + CA]
Hence proved
Hope this helps!!!!!
Answer:
O is a point in the exterior of triangle ABC
To prove: 2 [OA + OB + OC] > AB + BC + CA
We know that the sum of any two sides of a triangle is greater than the third side. Therefore, from the figure attached below, let us consider :
1. In ∆ OAB,
OA + OB > AB …… (i)
2. In ∆ OCB,
OB + OC > BC ….. (ii)
3. In ∆ OAC,
OA + OC > CA …. (iii)
Now, adding equation (i), (ii) & (iii), we get
[OA + OB + OB + OC + OA + OC] > [AB + BC + CA]
Or, [(2*OA) + (2*OB) + (2*OC)] > [AB + BC + CA]
Or, 2 [OA + OB + OC] > [AB + BC + CA]
Hence proved
Step-by-step explanation: