GMAT Quantitative - Calculating the perimeter of a polygon

$\textup{QWERT}$ is a pentagon with two sets of congruent sides and one side that is longer than all the others.

The smallest pair of congruent sides are 5 inches long each.

The other two congruent sides are 1.5 times bigger than the smallest sides.

The last side is twice the length of the smallest sides.

What is the perimeter of $\textup{QWERT}$ ?

$35\ \textup{meters}$

$40\ \textup{meters}$

$30\ \textup{meters}$

$50\ \textup{meters}$

$45\ \textup{meters}$

Explanation

A pentagon is a 5 sided shape. We are given that two sides are 5 inches each.

Side 1 = 5inches

Side 2 = 5 inches

The next two sides are each 1.5 times bigger than the smallest two sides.

$\small 5*1.5=7.5$

Side 3 =Side 4= 7.5 inches

The last side is twice the size of the smallest side,

Side 5 =10 inches

Add them all up for our perimeter:

5+5+7.5+7.5+10=35 inches long

What is the perimeter of a hexagon?

Each side measures 10 cm
The hexagon is regular.

Statement 1 ALONE is sufficient, but Statement 2 alone is not sufficient.

Statement 2 ALONE is sufficient, but Statement 1 alone is not sufficient.

Statements 1 and 2 TOGETHER are not sufficient.

BOTH statements TOGETHER are sufficient, but neither statement ALONE is sufficient.

EACH statement ALONE is sufficient.

Explanation

The perimeter is the sum of the measures of the sidelengths.

Knowing that the hexagon is regular only tells you the six sides are congruent; without the measure of any side, this does not help you.

Knowing only that each of the six sides measures 10 cm is by itself enough to calculate the perimeter to be

$6\times 10=60\ cm$ .

The answer is that Statement 1 is sufficient, but not Statement 2.

One side of a regular dodecagon has a length of . What is the perimeter of the polygon?

Explanation

A regular dodecagon is a polygon with twelve sides of equal length, so if one side has a length of , then the perimeter will be equal to twelve times the length of that one side. This gives us:

Note: Figure NOT drawn to scale

What is the perimeter of the above figure?

Assume all angles shown in the figure are right angles.

$70\textrm{ ft}$

$35\textrm{ ft}$

$43\textrm{ ft}$

$98\textrm{ ft}$

Not enough information is given to answer the question.

Explanation

This figure can be seen as a smaller rectangle cut out of a larger one; refer to the diagram below.

We can fill in the missing sidelengths using the fact that a rectangle has congruent opposite sides. Once this is done, we can add the lengths of the sides to get the perimeter:

feet.

What is the perimeter of a rectangle with a length of and a width of ?

$50cm^{2}$

$25cm^{2}$

Explanation

The perimeter of any figure is the sum of the lengths of its sides. Since we have a rectangle with a length of and a width of , we know that there will be two sides of length and two sides of width . Therefore:

What is the perimeter of a right triangle with a base of and a height of ?

Not enough information provided

Explanation

In order to find the perimeter of the right triangle, we need to know the lengths of each of its sides. While we are given two sides - the base and the height - we do not know the hypotenuse . There are two ways that we can find , the first of which is the direct application of the Pythagorean Theorem:

$a^{2}+b^{2}=c^{2}$

$5^{2}+12^{2}=c^{2}$

$25+144=c^{2}$

We could have also noted that is a common Pythagorean Triple and deduced the value of that way.

Now that we have all three side lengths, we can calculate :

What is the perimeter of an octagon with equal side lengths of each?

Explanation

Starting with the knowledge that we are dealing with an octagon, an 8-sided figure, we calculate the perimeter by adding the lengths of all 8 sides. Since we also know that each side measures , we can use multiplication:

$P=8\times15cm$

Calculating the perimeter of a polygon

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