Given: An isosceles triangle has side x and y, where x > y. As we don't know which one of them is the equal sides, we have two possibilities for the perimeter,ov25 wrote:An isocls triangle has side x and y, where x >y. what is the perimeter of the triangle, in terms of x and y
1) two of the int angles > the other angle
2) perimeter > 3y
- 1. (2x + y), if x is the equal side
1. (x + 2y), if y is the equal side
Statement 1: Two of the internal angles > the other angle
This means the angles opposite to the equal sides are greater than the angles opposite to the other side. Which also implies that the equal sides are greater than the third side.
Thus x is the equal side => Perimeter = (2x + y)
Sufficient.
Statement 2: Perimeter > 3y
Consider the two possible cases,
- 1. If x is the equal side, Perimeter = (2x + y) > (2y + y) = 3y
1. If y is the equal side, Perimeter = (x + 2y) > (y + 2y) = 3y
Not sufficient.
The correct answer is A.
PS: In case you have any query for the explanation of the statement 2, refer to the image below. The first and third one illustrates the case of x > y and y < x respectively, while the middle one is the transitional one, i.e. the equilateral triangle.
