What is the greatest possible area of a triangular region with one vertex at the center of a circle of radius 1 and the other two vertices on the circle?
A) sqrt(3)/4
B) 1/2
C) pie/4
D) 1
E) sqrt(2)
OA is B
I know ans would be B, when the line segments connecting two points on the circle and the center of the circle are at right angles. But, I am not able to figure out such a triangle will have greatest possible area.
Help please ...
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fibbonnaci
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sreak1089, there is a concept that you need to know:
The area of the triangle is maximum in a semi circle only when the triangle is a right triangle.
Here you see that when one vertex is on the centre of the circle and the other 2 vertices arem on the circle, we are dealing with only a triangle inscribed into a semi circle.
Using the concept above, you can conclude it has to be a right triangle.
You can verify the concept by drawing a circle and trying different combinations of the triangles. you will find that the triangle is maximum when it is a right angled triangle.
Hope i have answered your doubts
The area of the triangle is maximum in a semi circle only when the triangle is a right triangle.
Here you see that when one vertex is on the centre of the circle and the other 2 vertices arem on the circle, we are dealing with only a triangle inscribed into a semi circle.
Using the concept above, you can conclude it has to be a right triangle.
You can verify the concept by drawing a circle and trying different combinations of the triangles. you will find that the triangle is maximum when it is a right angled triangle.
Hope i have answered your doubts
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Stuart@KaplanGMAT
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Hi,sreak1089 wrote:What is the greatest possible area of a triangular region with one vertex at the center of a circle of radius 1 and the other two vertices on the circle?
A) sqrt(3)/4
B) 1/2
C) pie/4
D) 1
E) sqrt(2)
OA is B
I know ans would be B, when the line segments connecting two points on the circle and the center of the circle are at right angles. But, I am not able to figure out such a triangle will have greatest possible area.
Help please ...
since the two sides inside the circle are radii, they'll both have length 1.
If we draw the triangle as a right triangle, both the base and the height will be 1. If we draw the triangle with any other angle, the base will still be 1 and the height will now be less than 1.
If you ask, "well, what if I make the non-radius side the base and make that really long?" (which is a good question to ask!), you'll note that the longer we make that side, the shorter the height becomes; you can play with the numbers, but you can never create a triangle with greater area than the 1/1/root2 right triangle.
Stuart Kovinsky | Kaplan GMAT Faculty | Toronto
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sreak1089
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That was a great explanation Stuart ! Yes, I was able to visualize about the really long non-radius side and that would make the height much shorter. Any height of such a triangle, would be less than radius..
Thank you !!
Thank you !!
