下面是一道关于几何方面的
If two sides of the triangle above have lengths and , the perimeter of the triangle could be which of the following?
Answer Choices
(A) only
(B) only
(C) only
(D) and only
(E) , , and
The correct answer is B
Explanation
Difficulty: Hard
In questions of this type, statements , , and should each be considered independently of the others. You must determine which of those statements could be true.
Statement cannot be true. The perimeter of the triangle cannot be , since the sum of the two given sides is without even considering the third side of the triangle.
Continuing to work the problem, you see that in , if the perimeter were , then the third side of the triangle would be , or . A triangle can have side lengths of , , and . So the perimeter of the triangle could be
Finally, consider whether it is possible for the triangle to have a perimeter of . In this case, the third side of the triangle would be . The third side of this triangle cannot be , since the sum of the other two sides is not greater than . By the Triangle Inequality, the sum of the lengths of any two sides of a triangle must be greater than the length of the third side. So the correct answer is only.
以上就是这道SAT数学题的详细解答方法的全部内容,对这道SAT数学题中的每一个可能的答案都进行了分析。大家在备考的时候可以按照上面所列的方法进行,这样在考试的时候就可以更加快速而且有效率的解答相关的SAT数学题目了。
