BTGmoderatorLU wrote:Source: GMAT Club Tests
If the vertices of a triangle have coordinates (x, 1), (5, 1), and (5, y) where x < 5 and y > 1, what is the area of the triangle?
(1) x = y.
(2) The angle at the vertex (x, 1) is equal to the angle at the vertex (5, y).
The OA is C.
On a coordinate plane, put the point (5, 1). Since we cannot fix the other two points (x, 1) and (5, y), we can draw the straight line passing through the vertex (5, 1).
Somewhere on the line parallel to X-axis the vertex (x, 1) would lie and somewhere on the line parallel to Y-axis the vertex (5, y) would lie. This implies that it is a right-angled triangle.
Thus, the area of the triangle = 1/2*(5 - x)*(y - 1)
Let's take each statement one by one.
(1) x = y.
Can't get the value of 1/2*(5 - x)*(y - 1). Insufficient.
(2) The angle at the vertex (x, 1) is equal to the angle at the vertex (5, y).
=> This implies that it is an isosceles right-angled triangle.
=> (5 - x) = (y - 1)
Can't get the value of 1/2*(5 - x)*(y - 1). Insufficient.
(1) and (2) together
From x = y and (5 - x) = (y - 1), we get that x = y = 2
Thus, the area of the triangle = 1/2*(5 - x)*(y - 1) = 1/2*(5 - 2)*(2 - 1) = 3 unit
Sufficient.
The correct answer:
C
Hope this helps!
-Jay
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