The area of a rectangle is 80. What is the angle between the

If all the sides of the triangle are known, the shape is fixed. If the shape is fixed the angles are fixed. I dont think gmat really cares the means you are going to use, to determine the solution. Whether you can determine is all that matters.

I got D as well cause I could figure out that both statements provided same info but I don't quite get the problem/ What are we asked for? The angle between the diagonals and its longest side, isn't it always 45? The diagonal should bisect the angle no?

Could anybody please clarify?
Thanks
Cheers!
J

Not necessarily. The diagonal of a square bisects the angle but not all rectangles are squares.
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I'm also interested to know the solution to this problem, because I had to rely on sin/cos to "prove" that the question could technically be solved. Plus, the fact that two statements gave the same piece of information, given that they couldn't contradict, I picked D.

Waiting for the solution from the experts.

You don't need to solve this question! It's a waste of time. You are asked not to calculate a value but to determine whether you are able to do so with the information supplied.
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Official Solution:


If the area of a rectangle is 80, what is the angle between the diagonal of the rectangle and its longer side?

Important piece of information that will help to solve this question:

In a “what is the value?” GMAT DS question, your primary goal is not to calculate the value, but to determine whether you can do so with the information provided. Therefore, obtaining a numerical answer is not always necessary for this type of question.

In a "yes/no” GMAT DS question, your primary goal is not to calculate a value, but to determine whether the information provided is sufficient to answer the question with a "yes" or "no" response. Therefore, obtaining a numerical answer is not always necessary for this type of question.

Let the length and width of the rectangle be \(a\) and \(b\), respectively. We are given that \(ab = 80\) and asked to find the angle between the diagonal of the rectangle and its longer side.

(1) The perimeter of the rectangle is 84.

This statement tells us that \(2(a + b) = 84\), or that \(a + b = 42\). We can solve the system of equations \(ab = 80\) and \(a + b = 42\) to get unique values of \(a\) and \(b\). This means that the rectangle is fixed at a unique configuration, and we can answer any question regarding that rectangle. Therefore, statement (1) is sufficient.

(2) The shorter side of the rectangle is 2.

This statement implies that the longer side is 40. Again, the rectangle is fixed at a unique configuration, and we can answer any question regarding that rectangle. Therefore, statement (2) is also sufficient.


Answer: D
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