Help with Math Traingle Problem

[patogzz]

For the triangle shown above, where A, B and C are all points on a circle, and line segment AB has length 18, what is the area of triangle ABC?

(1) Angle ABC measures 30°.

(2) The circumference of the circle is 18pi.



The answer is C and I don't understand why solution is assuming that segment AB is equal to the diameter.

For why understand, the rule says that an angle inscribed in a semicircle is a right angle, but points A and B could be anywhere (not necessarily in the middle forming a semicircle).

The problem doesn't specifically say that angle ACB = 90 or that points A and B are exactly at opposite sides therefore I think the answer should be E.

Could anyone share some light on why this problem should be C?

[malikrulzz]

Ans is C for sure

[qniego]

Must be a mistake.... Answer C is prob right, but statement
2 needed to say Circ is 18pi (instead of just 18) it also contradicts
the diagram radically which is odd-

[patogzz]

sorry, the pi didn't copy correctly. statement two has been modified.

any explication why is C?

[esledge]

Yes, the answer is C. (2) tells us indirectly that the triangle is a right triangle, and (2) tells us the non-right angles of the triangle.

For why understand, the rule says that an angle inscribed in a semicircle is a right angle, but points A and B could be anywhere (not necessarily in the middle forming a semicircle).

The problem doesn't specifically say that angle ACB = 90 or that points A and B are exactly at opposite sides therefore I think the answer should be E.

You are right, the problem doesn't say outright that A and B are exactly at opposite sides of the circle. However, we know that for all circles, Circumference = pi*d = 2*pi*r. Since statement (2) says that Circumference = 18pi, that is indirectly telling us that diameter = 18. From the picture, if AB is 18, then it is a diameter. That implies that angle ACB is 90 degrees.

This is typical of GMAT geometry problems--you often have to use a couple rules. the first rule lets you infer something, so label the diagram with that new inference. Then, you'll see something else that can be inferred from that new label with yet another rule. This is why drawing the picture on your own paper and adding dimensions, angles, labels, etc. as you go is so important.

[dannylim]

Realize this is an old question, but I'm not quite sure why choice A is not sufficient itself.

If we are given that the triangle is inscribed in the circle (establishing that the angle ACB is 90 degrees) and 1. tells us that ABC is 30 degrees, doesn't that give us sufficient data?

If we have a 30/60/90 degree triangle and one side, we can solve for the base and height with the x : x root3 : 2x ratio?

[tim]

You don't know it's a 30-60-90 triangle. That's why we need to know that the 18 is a diameter - it's the crucial step in getting to a right angle..