All GMAT Math Resources
Example Questions
Example Question #3 : Calculating The Length Of The Side Of A Rectangle
A rectangle with a perimeter of has a width times that of its length. Find its length.
The perimeter of a rectangle is found by . Since we are told , we can substitute this into our equation and solve for the length.
Example Question #8 : Calculating The Length Of The Side Of A Rectangle
The perimeter of a rectange equals The length of the rectange equals four less than three times the width. What are the measurements of the length and of this rectangle?
The perimeter of a rectangle can be found by the following formula: Let's substitute our values from the problem statement:
.
We also know from the second line that Let's substitute that back into the perimeter equation, and solve for width. Then, we plug that back into the other eqution to get the answer for length.
Example Question #1 : Calculating The Length Of The Diagonal Of A Rectangle
A rectangle has a length of and a width of . What is the length of the diagonal of the rectangle?
If the rectangle has a length of and a width of , we can imagine the diagonal as being the hypotenuse of a right triangle. The length and width are the other two sides to this triangle, so we can use the Pythagorean Theorem to calculate the length of the diagonal of the rectangle:
Example Question #1 : Calculating The Length Of The Diagonal Of A Rectangle
A rectangle has a length of and a width of . What is the length of the diagonal of the rectangle?
The diagonal of a rectangle can be thought of as the hypotenuse of a right triangle with the length and width of the rectangle as the other two sides. This means we can use the Pythagorean theorem to solve for the diagonal of a rectangle if we are given its length and its width:
Example Question #2 : Calculating The Length Of The Diagonal Of A Rectangle
is a rectangle, and . What is the length of the diagonal of the rectangle?
Here, we also have a triangle, indeed both ADC and ABD are triangles. We can see that by calculating the missing angles. in each triangle we find that this angle to be 30 degrees. Since , we also know that the other sides of the triangles will be and , since a triangle have its sides in ratio , where is a constant. In this case . Therefore the hypotenuse will be , which is also the length of the diagonal of the rectangle.
Example Question #3 : Calculating The Length Of The Diagonal Of A Rectangle
Rectangle has an area of and . What is the length of the diagonal ?
Firstly, before we try to set up an equation for the length of the sides and the area, we should notice that the area is a perfect square. Indeed . Now let's try to see whether 13 could be the length of two consecutive sides of the rectangle, Indeed, we are told that , therefore ABDC is a square with side 13 and with diagonal , where is the length of the side of the square. Therefore, the final answer is .
Example Question #4 : Calculating The Length Of The Diagonal Of A Rectangle
Rectangle , has area and . What is the length of diagonal ?
To find the length of the sides to calculate the length of the diagonal with the Pythagorean Theorem, we would need to set up two equations for our variables. However, trial and error, in my opinion in most GMAT problems is faster than trying to solve a quadratic equation. The way we should test values for our sides is firstly by finding the different possible factors of the area, that way we can see possible factors.
As follows has possible factors . From these values we should find the two that will give us 8, the length of the two consecutive sides.
We find that and are the values for the two sides.
Now we just need to apply the Pythagorean Theorem to find the length of the diagonal: , or .
Example Question #1 : Calculating The Length Of The Diagonal Of A Rectangle
Find the length of the diagonal of a rectangle whose sides are lengths .
To find the diagonal, you must use the pythaorean theorem. Thus:
Example Question #2 : Calculating The Length Of The Diagonal Of A Rectangle
Calculate the length of the diagonal of a rectangle whose width is and length is .
To solve, simply use the Pythagorean theorem.
Example Question #1 : Calculating The Length Of The Diagonal Of A Rectangle
If a garden bed will have side lengths of 9 meters and 12 meters, what will the distance be across its diagonal?
If a rectangular garden bed will have side lengths of 9 meters and 12 meters, what will the distance be across its diagonal?
This question is a rectangle question, but it could also be seen as a triangle question. If we have a rectangle with two side lengths, we can find the diagonal by using Pythagorean theorem:
If you are feeling really observant, you may have seen that we have a Pythagorean triple. In this case, a 3-4-5 triangle. You could have skipped using Pythagoran theorem and simply done three times five to get fifteen meters.